About the Execution of Marcie for Sudoku-PT-AN02
| Execution Summary | |||||
| Max Memory Used (MB) |
Time wait (ms) | CPU Usage (ms) | I/O Wait (ms) | Computed Result | Execution Status |
| 5449.123 | 5183.00 | 5021.00 | 530.00 | TFTTTTTTTTTFFFTT | normal |
Execution Chart
We display below the execution chart for this examination (boot time has been removed).
Trace from the execution
Formatting '/data/fkordon/mcc2023-input.r481-tall-167912691600169.qcow2', fmt=qcow2 size=4294967296 backing_file=/data/fkordon/mcc2023-input.qcow2 cluster_size=65536 lazy_refcounts=off refcount_bits=16
Waiting for the VM to be ready (probing ssh)
....................................................................................................................
=====================================================================
Generated by BenchKit 2-5348
Executing tool marcie
Input is Sudoku-PT-AN02, examination is CTLCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 1
Run identifier is r481-tall-167912691600169
=====================================================================
--------------------
preparation of the directory to be used:
/home/mcc/execution
total 780K
-rw-r--r-- 1 mcc users 12K Feb 26 09:02 CTLCardinality.txt
-rw-r--r-- 1 mcc users 93K Feb 26 09:02 CTLCardinality.xml
-rw-r--r-- 1 mcc users 14K Feb 26 09:02 CTLFireability.txt
-rw-r--r-- 1 mcc users 89K Feb 26 09:02 CTLFireability.xml
-rw-r--r-- 1 mcc users 4.2K Jan 29 11:41 GenericPropertiesDefinition.xml
-rw-r--r-- 1 mcc users 6.6K Jan 29 11:41 GenericPropertiesVerdict.xml
-rw-r--r-- 1 mcc users 6.7K Feb 25 17:16 LTLCardinality.txt
-rw-r--r-- 1 mcc users 34K Feb 25 17:16 LTLCardinality.xml
-rw-r--r-- 1 mcc users 5.7K Feb 25 17:16 LTLFireability.txt
-rw-r--r-- 1 mcc users 29K Feb 25 17:16 LTLFireability.xml
-rw-r--r-- 1 mcc users 22K Feb 26 09:02 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 175K Feb 26 09:02 ReachabilityCardinality.xml
-rw-r--r-- 1 mcc users 34K Feb 26 09:02 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 194K Feb 26 09:02 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 2.1K Feb 25 17:16 UpperBounds.txt
-rw-r--r-- 1 mcc users 4.9K Feb 25 17:16 UpperBounds.xml
-rw-r--r-- 1 mcc users 5 Mar 5 18:23 equiv_col
-rw-r--r-- 1 mcc users 5 Mar 5 18:23 instance
-rw-r--r-- 1 mcc users 6 Mar 5 18:23 iscolored
-rw-r--r-- 1 mcc users 7.4K Mar 5 18:23 model.pnml
--------------------
content from stdout:
=== Data for post analysis generated by BenchKit (invocation template)
The expected result is a vector of booleans
BOOL_VECTOR
here is the order used to build the result vector(from text file)
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-00
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-01
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-02
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-03
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-04
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-05
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-06
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-07
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-08
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-09
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-10
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-11
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-12
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-13
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-14
FORMULA_NAME Sudoku-PT-AN02-CTLCardinality-15
=== Now, execution of the tool begins
BK_START 1679146293139
bash -c /home/mcc/BenchKit/BenchKit_head.sh 2> STDERR ; echo ; echo -n "BK_STOP " ; date -u +%s%3N
Invoking MCC driver with
BK_TOOL=marcie
BK_EXAMINATION=CTLCardinality
BK_BIN_PATH=/home/mcc/BenchKit/bin/
BK_TIME_CONFINEMENT=3600
BK_INPUT=Sudoku-PT-AN02
Not applying reductions.
Model is PT
CTLCardinality PT
timeout --kill-after=10s --signal=SIGINT 1m for testing only
Marcie built on Linux at 2019-11-18.
A model checker for Generalized Stochastic Petri nets
authors: Alex Tovchigrechko (IDD package and CTL model checking)
Martin Schwarick (Symbolic numerical analysis and CSL model checking)
Christian Rohr (Simulative and approximative numerical model checking)
marcie@informatik.tu-cottbus.de
called as: /home/mcc/BenchKit/bin//../marcie/bin/marcie --net-file=model.pnml --mcc-file=CTLCardinality.xml --memory=6 --mcc-mode
parse successfull
net created successfully
Net: Sudoku_PT_AN02
(NrP: 20 NrTr: 8 NrArc: 32)
parse formulas
formulas created successfully
place and transition orderings generation:0m 0.000sec
net check time: 0m 0.000sec
init dd package: 0m 2.880sec
RS generation: 0m 0.000sec
-> reachability set: #nodes 123 (1.2e+02) #states 35
starting MCC model checker
--------------------------
checking: EG [~ [Rows_1_0<=0]]
normalized: EG [~ [Rows_1_0<=0]]
abstracting: (Rows_1_0<=0)
states: 18
....
EG iterations: 4
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-10 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.001sec
checking: EG [Board_0_0_1<=Columns_1_1]
normalized: EG [Board_0_0_1<=Columns_1_1]
abstracting: (Board_0_0_1<=Columns_1_1)
states: 31
...
EG iterations: 3
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-09 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.000sec
checking: EG [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)]
normalized: EG [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)]
abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0))
states: 35
EG iterations: 0
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-07 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.000sec
checking: [[[~ [AG [Board_1_0_1<=Cells_0_1]] & EF [EX [AF [Board_1_1_0<=0]]]] & EG [Cells_0_1<=1]] & ~ [[[AG [~ [[AF [Board_0_0_1<=1] & Rows_1_0<=0]]] | EG [AG [1<=Cells_1_0]]] | AG [EF [AF [1<=Cells_0_1]]]]]]
normalized: [~ [[[~ [E [true U [~ [EG [~ [Board_0_0_1<=1]]] & Rows_1_0<=0]]] | EG [~ [E [true U ~ [1<=Cells_1_0]]]]] | ~ [E [true U ~ [E [true U ~ [EG [~ [1<=Cells_0_1]]]]]]]]] & [[E [true U EX [~ [EG [~ [Board_1_1_0<=0]]]]] & E [true U ~ [Board_1_0_1<=Cells_0_1]]] & EG [Cells_0_1<=1]]]
abstracting: (Cells_0_1<=1)
states: 35
EG iterations: 0
abstracting: (Board_1_0_1<=Cells_0_1)
states: 30
abstracting: (Board_1_1_0<=0)
states: 26
.
EG iterations: 1
.abstracting: (1<=Cells_0_1)
states: 17
.
EG iterations: 1
abstracting: (1<=Cells_1_0)
states: 17
.
EG iterations: 1
abstracting: (Rows_1_0<=0)
states: 18
abstracting: (Board_0_0_1<=1)
states: 35
.
EG iterations: 1
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-15 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.002sec
checking: A [[A [EG [[[Board_0_1_1<=Board_0_1_0 | 1<=Board_0_0_0] | EG [1<=Columns_0_0]]] U [EG [Board_0_0_0<=1] & EF [[Cells_1_0<=1 & 1<=Rows_0_1]]]] | ~ [1<=Cells_0_1]] U 1<=Board_1_1_1]
normalized: [~ [EG [~ [1<=Board_1_1_1]]] & ~ [E [~ [1<=Board_1_1_1] U [~ [[~ [1<=Cells_0_1] | [~ [EG [~ [[EG [Board_0_0_0<=1] & E [true U [Cells_1_0<=1 & 1<=Rows_0_1]]]]]] & ~ [E [~ [[EG [Board_0_0_0<=1] & E [true U [Cells_1_0<=1 & 1<=Rows_0_1]]]] U [~ [EG [[EG [1<=Columns_0_0] | [Board_0_1_1<=Board_0_1_0 | 1<=Board_0_0_0]]]] & ~ [[EG [Board_0_0_0<=1] & E [true U [Cells_1_0<=1 & 1<=Rows_0_1]]]]]]]]]] & ~ [1<=Board_1_1_1]]]]]
abstracting: (1<=Board_1_1_1)
states: 9
abstracting: (1<=Rows_0_1)
states: 17
abstracting: (Cells_1_0<=1)
states: 35
abstracting: (Board_0_0_0<=1)
states: 35
EG iterations: 0
abstracting: (1<=Board_0_0_0)
states: 9
abstracting: (Board_0_1_1<=Board_0_1_0)
states: 26
abstracting: (1<=Columns_0_0)
states: 17
....
EG iterations: 4
.
EG iterations: 1
abstracting: (1<=Rows_0_1)
states: 17
abstracting: (Cells_1_0<=1)
states: 35
abstracting: (Board_0_0_0<=1)
states: 35
EG iterations: 0
abstracting: (1<=Rows_0_1)
states: 17
abstracting: (Cells_1_0<=1)
states: 35
abstracting: (Board_0_0_0<=1)
states: 35
EG iterations: 0
.
EG iterations: 1
abstracting: (1<=Cells_0_1)
states: 17
abstracting: (1<=Board_1_1_1)
states: 9
abstracting: (1<=Board_1_1_1)
states: 9
...
EG iterations: 3
-> the formula is FALSE
FORMULA Sudoku-PT-AN02-CTLCardinality-11 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.002sec
checking: AF [EG [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)]]
normalized: ~ [EG [~ [EG [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)]]]]
abstracting: (sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 25
..
EG iterations: 2
.
EG iterations: 1
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-02 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.031sec
checking: ~ [AF [~ [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)]]]
normalized: EG [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)]
abstracting: (sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 25
..
EG iterations: 2
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-04 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.000sec
checking: ~ [[~ [AF [AG [[Columns_0_0<=Rows_0_1 & Columns_0_0<=Cells_0_1]]]] | E [AF [~ [E [1<=Columns_1_1 U Columns_0_0<=0]]] U ~ [[[~ [A [1<=Columns_1_0 U Board_1_1_1<=0]] | [~ [Rows_0_1<=Rows_0_1] | [Columns_0_0<=1 | Board_1_1_1<=1]]] | [1<=Columns_1_1 | ~ [EF [Board_0_0_0<=Cells_1_0]]]]]]]]
normalized: ~ [[E [~ [EG [E [1<=Columns_1_1 U Columns_0_0<=0]]] U ~ [[[~ [E [true U Board_0_0_0<=Cells_1_0]] | 1<=Columns_1_1] | [[[Columns_0_0<=1 | Board_1_1_1<=1] | ~ [Rows_0_1<=Rows_0_1]] | ~ [[~ [EG [~ [Board_1_1_1<=0]]] & ~ [E [~ [Board_1_1_1<=0] U [~ [1<=Columns_1_0] & ~ [Board_1_1_1<=0]]]]]]]]]] | EG [E [true U ~ [[Columns_0_0<=Rows_0_1 & Columns_0_0<=Cells_0_1]]]]]]
abstracting: (Columns_0_0<=Cells_0_1)
states: 26
abstracting: (Columns_0_0<=Rows_0_1)
states: 26
....
EG iterations: 4
abstracting: (Board_1_1_1<=0)
states: 26
abstracting: (1<=Columns_1_0)
states: 17
abstracting: (Board_1_1_1<=0)
states: 26
abstracting: (Board_1_1_1<=0)
states: 26
.
EG iterations: 1
abstracting: (Rows_0_1<=Rows_0_1)
states: 35
abstracting: (Board_1_1_1<=1)
states: 35
abstracting: (Columns_0_0<=1)
states: 35
abstracting: (1<=Columns_1_1)
states: 17
abstracting: (Board_0_0_0<=Cells_1_0)
states: 31
abstracting: (Columns_0_0<=0)
states: 18
abstracting: (1<=Columns_1_1)
states: 17
.
EG iterations: 1
-> the formula is FALSE
FORMULA Sudoku-PT-AN02-CTLCardinality-13 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.002sec
checking: A [[E [~ [Columns_1_0<=Rows_0_1] U 1<=Cells_1_0] | [E [[A [Board_1_0_1<=0 U 1<=Columns_1_0] & [~ [Rows_0_0<=Cells_1_0] & [Columns_1_1<=Board_1_1_0 | Board_1_0_1<=0]]] U AG [E [1<=Board_1_0_0 U 1<=Board_1_1_0]]] & [EX [~ [EX [Rows_1_1<=Board_0_1_0]]] & EG [EF [1<=Rows_1_1]]]]] U [EG [E [Board_1_0_0<=1 U [[Board_1_0_1<=Columns_0_1 & Columns_1_1<=1] & [1<=Board_1_0_0 & 1<=Rows_1_1]]]] & 1<=Columns_0_0]]
normalized: [~ [EG [~ [[EG [E [Board_1_0_0<=1 U [[1<=Board_1_0_0 & 1<=Rows_1_1] & [Board_1_0_1<=Columns_0_1 & Columns_1_1<=1]]]] & 1<=Columns_0_0]]]] & ~ [E [~ [[EG [E [Board_1_0_0<=1 U [[1<=Board_1_0_0 & 1<=Rows_1_1] & [Board_1_0_1<=Columns_0_1 & Columns_1_1<=1]]]] & 1<=Columns_0_0]] U [~ [[EG [E [Board_1_0_0<=1 U [[1<=Board_1_0_0 & 1<=Rows_1_1] & [Board_1_0_1<=Columns_0_1 & Columns_1_1<=1]]]] & 1<=Columns_0_0]] & ~ [[[E [[[~ [E [~ [1<=Columns_1_0] U [~ [Board_1_0_1<=0] & ~ [1<=Columns_1_0]]]] & ~ [EG [~ [1<=Columns_1_0]]]] & [[Columns_1_1<=Board_1_1_0 | Board_1_0_1<=0] & ~ [Rows_0_0<=Cells_1_0]]] U ~ [E [true U ~ [E [1<=Board_1_0_0 U 1<=Board_1_1_0]]]]] & [EX [~ [EX [Rows_1_1<=Board_0_1_0]]] & EG [E [true U 1<=Rows_1_1]]]] | E [~ [Columns_1_0<=Rows_0_1] U 1<=Cells_1_0]]]]]]]
abstracting: (1<=Cells_1_0)
states: 17
abstracting: (Columns_1_0<=Rows_0_1)
states: 26
abstracting: (1<=Rows_1_1)
states: 17
....
EG iterations: 4
abstracting: (Rows_1_1<=Board_0_1_0)
states: 22
..abstracting: (1<=Board_1_1_0)
states: 9
abstracting: (1<=Board_1_0_0)
states: 9
abstracting: (Rows_0_0<=Cells_1_0)
states: 26
abstracting: (Board_1_0_1<=0)
states: 26
abstracting: (Columns_1_1<=Board_1_1_0)
states: 23
abstracting: (1<=Columns_1_0)
states: 17
.
EG iterations: 1
abstracting: (1<=Columns_1_0)
states: 17
abstracting: (Board_1_0_1<=0)
states: 26
abstracting: (1<=Columns_1_0)
states: 17
abstracting: (1<=Columns_0_0)
states: 17
abstracting: (Columns_1_1<=1)
states: 35
abstracting: (Board_1_0_1<=Columns_0_1)
states: 26
abstracting: (1<=Rows_1_1)
states: 17
abstracting: (1<=Board_1_0_0)
states: 9
abstracting: (Board_1_0_0<=1)
states: 35
....
EG iterations: 4
abstracting: (1<=Columns_0_0)
states: 17
abstracting: (Columns_1_1<=1)
states: 35
abstracting: (Board_1_0_1<=Columns_0_1)
states: 26
abstracting: (1<=Rows_1_1)
states: 17
abstracting: (1<=Board_1_0_0)
states: 9
abstracting: (Board_1_0_0<=1)
states: 35
....
EG iterations: 4
abstracting: (1<=Columns_0_0)
states: 17
abstracting: (Columns_1_1<=1)
states: 35
abstracting: (Board_1_0_1<=Columns_0_1)
states: 26
abstracting: (1<=Rows_1_1)
states: 17
abstracting: (1<=Board_1_0_0)
states: 9
abstracting: (Board_1_0_0<=1)
states: 35
....
EG iterations: 4
.
EG iterations: 1
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-14 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.003sec
checking: EG [EF [AG [[sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0) | EX [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)]]]]]
normalized: EG [E [true U ~ [E [true U ~ [[EX [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)] | sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]]]]]
abstracting: (sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 35
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 35
.
EG iterations: 0
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-05 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.000sec
checking: [[[AG [[AG [1<=Board_1_1_1] & [Board_1_0_1<=Cells_1_0 & [A [Board_1_0_1<=Columns_0_0 U Columns_0_1<=Columns_0_1] & 1<=Cells_0_1]]]] & AX [E [[[Board_0_0_1<=0 | Rows_1_0<=Board_0_0_1] | ~ [Cells_1_1<=Cells_1_1]] U [[1<=Columns_0_1 | 1<=Cells_0_0] | [Board_1_1_0<=0 & Columns_1_0<=0]]]]] | ~ [A [~ [EF [Board_1_1_0<=1]] U [Cells_0_0<=1 | [Columns_1_0<=Board_1_0_1 & ~ [Board_0_1_0<=Board_0_1_0]]]]]] | ~ [AX [AF [[EX [1<=Board_0_0_0] & A [Board_1_0_0<=1 U Columns_1_1<=Cells_1_1]]]]]]
normalized: [EX [EG [~ [[[~ [EG [~ [Columns_1_1<=Cells_1_1]]] & ~ [E [~ [Columns_1_1<=Cells_1_1] U [~ [Board_1_0_0<=1] & ~ [Columns_1_1<=Cells_1_1]]]]] & EX [1<=Board_0_0_0]]]]] | [~ [[~ [EG [~ [[[~ [Board_0_1_0<=Board_0_1_0] & Columns_1_0<=Board_1_0_1] | Cells_0_0<=1]]]] & ~ [E [~ [[[~ [Board_0_1_0<=Board_0_1_0] & Columns_1_0<=Board_1_0_1] | Cells_0_0<=1]] U [E [true U Board_1_1_0<=1] & ~ [[[~ [Board_0_1_0<=Board_0_1_0] & Columns_1_0<=Board_1_0_1] | Cells_0_0<=1]]]]]]] | [~ [EX [~ [E [[~ [Cells_1_1<=Cells_1_1] | [Board_0_0_1<=0 | Rows_1_0<=Board_0_0_1]] U [[Board_1_1_0<=0 & Columns_1_0<=0] | [1<=Columns_0_1 | 1<=Cells_0_0]]]]]] & ~ [E [true U ~ [[[[[~ [EG [~ [Columns_0_1<=Columns_0_1]]] & ~ [E [~ [Columns_0_1<=Columns_0_1] U [~ [Board_1_0_1<=Columns_0_0] & ~ [Columns_0_1<=Columns_0_1]]]]] & 1<=Cells_0_1] & Board_1_0_1<=Cells_1_0] & ~ [E [true U ~ [1<=Board_1_1_1]]]]]]]]]]
abstracting: (1<=Board_1_1_1)
states: 9
abstracting: (Board_1_0_1<=Cells_1_0)
states: 26
abstracting: (1<=Cells_0_1)
states: 17
abstracting: (Columns_0_1<=Columns_0_1)
states: 35
abstracting: (Board_1_0_1<=Columns_0_0)
states: 31
abstracting: (Columns_0_1<=Columns_0_1)
states: 35
abstracting: (Columns_0_1<=Columns_0_1)
states: 35
.
EG iterations: 1
abstracting: (1<=Cells_0_0)
states: 17
abstracting: (1<=Columns_0_1)
states: 17
abstracting: (Columns_1_0<=0)
states: 18
abstracting: (Board_1_1_0<=0)
states: 26
abstracting: (Rows_1_0<=Board_0_0_1)
states: 22
abstracting: (Board_0_0_1<=0)
states: 26
abstracting: (Cells_1_1<=Cells_1_1)
states: 35
.abstracting: (Cells_0_0<=1)
states: 35
abstracting: (Columns_1_0<=Board_1_0_1)
states: 22
abstracting: (Board_0_1_0<=Board_0_1_0)
states: 35
abstracting: (Board_1_1_0<=1)
states: 35
abstracting: (Cells_0_0<=1)
states: 35
abstracting: (Columns_1_0<=Board_1_0_1)
states: 22
abstracting: (Board_0_1_0<=Board_0_1_0)
states: 35
abstracting: (Cells_0_0<=1)
states: 35
abstracting: (Columns_1_0<=Board_1_0_1)
states: 22
abstracting: (Board_0_1_0<=Board_0_1_0)
states: 35
.
EG iterations: 1
abstracting: (1<=Board_0_0_0)
states: 9
.abstracting: (Columns_1_1<=Cells_1_1)
states: 30
abstracting: (Board_1_0_0<=1)
states: 35
abstracting: (Columns_1_1<=Cells_1_1)
states: 30
abstracting: (Columns_1_1<=Cells_1_1)
states: 30
...
EG iterations: 3
.
EG iterations: 1
.-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-08 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.002sec
checking: [AX [E [~ [[[[Cells_1_1<=1 | Board_0_0_1<=0] | [1<=Board_0_1_1 | Board_0_1_0<=Board_0_1_0]] & EG [Board_0_0_1<=0]]] U [A [Board_1_0_1<=0 U [Rows_1_0<=Board_1_0_0 | Board_0_1_0<=Cells_1_1]] | Columns_0_1<=1]]] & [A [[Rows_1_0<=1 | ~ [[EF [Cells_0_0<=0] & [~ [Cells_1_0<=1] & [Rows_0_0<=0 | 1<=Columns_1_0]]]]] U [A [Columns_1_0<=Cells_1_0 U EF [Board_0_0_1<=Cells_0_0]] & ~ [[EF [Cells_0_1<=Rows_0_1] | Board_0_1_0<=Rows_0_0]]]] & EX [~ [Rows_1_0<=Board_0_0_1]]]]
normalized: [[EX [~ [Rows_1_0<=Board_0_0_1]] & [~ [EG [~ [[[~ [EG [~ [E [true U Board_0_0_1<=Cells_0_0]]]] & ~ [E [~ [E [true U Board_0_0_1<=Cells_0_0]] U [~ [Columns_1_0<=Cells_1_0] & ~ [E [true U Board_0_0_1<=Cells_0_0]]]]]] & ~ [[E [true U Cells_0_1<=Rows_0_1] | Board_0_1_0<=Rows_0_0]]]]]] & ~ [E [~ [[[~ [EG [~ [E [true U Board_0_0_1<=Cells_0_0]]]] & ~ [E [~ [E [true U Board_0_0_1<=Cells_0_0]] U [~ [Columns_1_0<=Cells_1_0] & ~ [E [true U Board_0_0_1<=Cells_0_0]]]]]] & ~ [[E [true U Cells_0_1<=Rows_0_1] | Board_0_1_0<=Rows_0_0]]]] U [~ [[~ [[[[Rows_0_0<=0 | 1<=Columns_1_0] & ~ [Cells_1_0<=1]] & E [true U Cells_0_0<=0]]] | Rows_1_0<=1]] & ~ [[[~ [EG [~ [E [true U Board_0_0_1<=Cells_0_0]]]] & ~ [E [~ [E [true U Board_0_0_1<=Cells_0_0]] U [~ [Columns_1_0<=Cells_1_0] & ~ [E [true U Board_0_0_1<=Cells_0_0]]]]]] & ~ [[E [true U Cells_0_1<=Rows_0_1] | Board_0_1_0<=Rows_0_0]]]]]]]]] & ~ [EX [~ [E [~ [[EG [Board_0_0_1<=0] & [[1<=Board_0_1_1 | Board_0_1_0<=Board_0_1_0] | [Cells_1_1<=1 | Board_0_0_1<=0]]]] U [[~ [E [~ [[Rows_1_0<=Board_1_0_0 | Board_0_1_0<=Cells_1_1]] U [~ [Board_1_0_1<=0] & ~ [[Rows_1_0<=Board_1_0_0 | Board_0_1_0<=Cells_1_1]]]]] & ~ [EG [~ [[Rows_1_0<=Board_1_0_0 | Board_0_1_0<=Cells_1_1]]]]] | Columns_0_1<=1]]]]]]
abstracting: (Columns_0_1<=1)
states: 35
abstracting: (Board_0_1_0<=Cells_1_1)
states: 31
abstracting: (Rows_1_0<=Board_1_0_0)
states: 18
...
EG iterations: 3
abstracting: (Board_0_1_0<=Cells_1_1)
states: 31
abstracting: (Rows_1_0<=Board_1_0_0)
states: 18
abstracting: (Board_1_0_1<=0)
states: 26
abstracting: (Board_0_1_0<=Cells_1_1)
states: 31
abstracting: (Rows_1_0<=Board_1_0_0)
states: 18
abstracting: (Board_0_0_1<=0)
states: 26
abstracting: (Cells_1_1<=1)
states: 35
abstracting: (Board_0_1_0<=Board_0_1_0)
states: 35
abstracting: (1<=Board_0_1_1)
states: 9
abstracting: (Board_0_0_1<=0)
states: 26
...
EG iterations: 3
.abstracting: (Board_0_1_0<=Rows_0_0)
states: 26
abstracting: (Cells_0_1<=Rows_0_1)
states: 30
abstracting: (Board_0_0_1<=Cells_0_0)
states: 26
abstracting: (Columns_1_0<=Cells_1_0)
states: 26
abstracting: (Board_0_0_1<=Cells_0_0)
states: 26
abstracting: (Board_0_0_1<=Cells_0_0)
states: 26
.
EG iterations: 1
abstracting: (Rows_1_0<=1)
states: 35
abstracting: (Cells_0_0<=0)
states: 18
abstracting: (Cells_1_0<=1)
states: 35
abstracting: (1<=Columns_1_0)
states: 17
abstracting: (Rows_0_0<=0)
states: 18
abstracting: (Board_0_1_0<=Rows_0_0)
states: 26
abstracting: (Cells_0_1<=Rows_0_1)
states: 30
abstracting: (Board_0_0_1<=Cells_0_0)
states: 26
abstracting: (Columns_1_0<=Cells_1_0)
states: 26
abstracting: (Board_0_0_1<=Cells_0_0)
states: 26
abstracting: (Board_0_0_1<=Cells_0_0)
states: 26
.
EG iterations: 1
abstracting: (Board_0_1_0<=Rows_0_0)
states: 26
abstracting: (Cells_0_1<=Rows_0_1)
states: 30
abstracting: (Board_0_0_1<=Cells_0_0)
states: 26
abstracting: (Columns_1_0<=Cells_1_0)
states: 26
abstracting: (Board_0_0_1<=Cells_0_0)
states: 26
abstracting: (Board_0_0_1<=Cells_0_0)
states: 26
.
EG iterations: 1
EG iterations: 0
abstracting: (Rows_1_0<=Board_0_0_1)
states: 22
.-> the formula is FALSE
FORMULA Sudoku-PT-AN02-CTLCardinality-12 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.004sec
checking: AX [EX [EG [[[[sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0) & sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=4] | 52<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)] | [AX [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)] & sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=40]]]]]
normalized: ~ [EX [~ [EX [EG [[[~ [EX [~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)]]] & sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=40] | [[sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0) & sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=4] | 52<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]]]]]]
abstracting: (52<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=4)
states: 35
abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 35
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=40)
states: 35
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 35
.
EG iterations: 0
..-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-03 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.087sec
checking: [AX [AX [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)]] & EG [[EG [[EF [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)] | EG [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=88]]] | E [~ [AG [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=59]] U sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=9]]]]
normalized: [EG [[E [E [true U ~ [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=59]] U sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=9] | EG [[EG [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=88] | E [true U sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)]]]]] & ~ [EX [EX [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)]]]]]
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0))
states: 35
..abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0))
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=88)
states: 35
EG iterations: 0
EG iterations: 0
abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=9)
states: 35
abstracting: (sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=59)
states: 35
EG iterations: 0
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-06 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.066sec
checking: AF [EF [[~ [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=68] & [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=21 & [[EX [74<=sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)] | AX [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=93]] & [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)] | E [66<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0) U sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)]]]]]]]
normalized: ~ [EG [~ [E [true U [[[[~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)] | E [66<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0) U sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)]] & [~ [EX [~ [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=93]]] | EX [74<=sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)]]] & sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=21] & ~ [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=68]]]]]]
abstracting: (sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=68)
states: 35
abstracting: (sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=21)
states: 35
abstracting: (74<=sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0))
states: 0
.abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=93)
states: 35
.abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0))
states: 35
abstracting: (66<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 0
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 35
EG iterations: 0
-> the formula is FALSE
FORMULA Sudoku-PT-AN02-CTLCardinality-01 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.155sec
checking: [EF [A [[~ [[[sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=56 | sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=95] & [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=46 & sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]] | [[[74<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0) & sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)] & [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=71 & sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)]] & [EG [5<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)] & sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=2]]] U A [A [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0) U 89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)] U A [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65 U sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]]] & AF [[[19<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0) | EG [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=72]] & [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0) | ~ [[AF [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)] & 16<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]]]]]
normalized: [~ [EG [~ [[[EG [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=72] | 19<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)] & [~ [[~ [EG [~ [sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]] & 16<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]] | sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)]]]]] & E [true U [~ [EG [~ [[~ [EG [~ [[~ [EG [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]] & ~ [E [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] U [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] & ~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65]]]]]]]] & ~ [E [~ [[~ [EG [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]] & ~ [E [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] U [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] & ~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65]]]]]] U [~ [[~ [EG [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]] & ~ [E [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] U [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] & ~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65]]]]]] & ~ [[~ [EG [~ [89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]] & ~ [E [~ [89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)] U [~ [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)] & ~ [89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]]]]]]]]]]]] & ~ [E [~ [[~ [EG [~ [[~ [EG [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]] & ~ [E [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] U [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] & ~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65]]]]]]]] & ~ [E [~ [[~ [EG [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]] & ~ [E [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] U [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] & ~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65]]]]]] U [~ [[~ [EG [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]] & ~ [E [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] U [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] & ~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65]]]]]] & ~ [[~ [EG [~ [89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]] & ~ [E [~ [89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)] U [~ [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)] & ~ [89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]]]]]]]]]] U [~ [[~ [EG [~ [[~ [EG [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]] & ~ [E [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] U [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] & ~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65]]]]]]]] & ~ [E [~ [[~ [EG [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]] & ~ [E [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] U [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] & ~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65]]]]]] U [~ [[~ [EG [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49]]] & ~ [E [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] U [~ [sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49] & ~ [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65]]]]]] & ~ [[~ [EG [~ [89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]] & ~ [E [~ [89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)] U [~ [sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)] & ~ [89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)]]]]]]]]]]] & ~ [[[[EG [5<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)] & sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=2] & [[sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=71 & sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)] & [74<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0) & sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)]]] | ~ [[[sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=46 & sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)] & [sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=56 | sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=95]]]]]]]]]]]
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=95)
states: 35
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=56)
states: 35
abstracting: (sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 35
abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=46)
states: 35
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 35
abstracting: (74<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
abstracting: (sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 25
abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=71)
states: 35
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=2)
states: 26
abstracting: (5<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
.
EG iterations: 1
abstracting: (89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0))
states: 35
abstracting: (89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
abstracting: (89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
EG iterations: 0
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
.
EG iterations: 1
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
.
EG iterations: 1
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
.
EG iterations: 1
.
EG iterations: 1
abstracting: (89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0))
states: 35
abstracting: (89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
abstracting: (89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
EG iterations: 0
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
.
EG iterations: 1
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
.
EG iterations: 1
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
.
EG iterations: 1
.
EG iterations: 1
abstracting: (89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
abstracting: (sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0)<=sum(Columns_1_1, Columns_1_0, Columns_0_1, Columns_0_0))
states: 35
abstracting: (89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
abstracting: (89<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
EG iterations: 0
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
.
EG iterations: 1
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
.
EG iterations: 1
abstracting: (sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0)<=65)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=49)
states: 35
.
EG iterations: 1
.
EG iterations: 1
.
EG iterations: 1
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0))
states: 35
abstracting: (16<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 0
abstracting: (sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0)<=sum(Board_1_1_1, Board_1_1_0, Board_1_0_1, Board_1_0_0, Board_0_1_1, Board_0_1_0, Board_0_0_1, Board_0_0_0))
states: 35
.
EG iterations: 1
abstracting: (19<=sum(Cells_1_1, Cells_1_0, Cells_0_1, Cells_0_0))
states: 0
abstracting: (sum(Rows_1_1, Rows_1_0, Rows_0_1, Rows_0_0)<=72)
states: 35
EG iterations: 0
.
EG iterations: 1
-> the formula is TRUE
FORMULA Sudoku-PT-AN02-CTLCardinality-00 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT
MC time: 0m 0.288sec
totally nodes used: 3194 (3.2e+03)
number of garbage collections: 0
fire ops cache: hits/miss/sum: 2517 10127 12644
used/not used/entry size/cache size: 11985 67096879 16 1024MB
basic ops cache: hits/miss/sum: 2199 9247 11446
used/not used/entry size/cache size: 14902 16762314 12 192MB
unary ops cache: hits/miss/sum: 0 0 0
used/not used/entry size/cache size: 0 16777216 8 128MB
abstract ops cache: hits/miss/sum: 0 7140 7140
used/not used/entry size/cache size: 1 16777215 12 192MB
state nr cache: hits/miss/sum: 416 869 1285
used/not used/entry size/cache size: 869 8387739 32 256MB
max state cache: hits/miss/sum: 0 0 0
used/not used/entry size/cache size: 0 8388608 32 256MB
uniqueHash elements/entry size/size: 67108864 4 256MB
0 67105697
1 3140
2 27
3 0
4 0
5 0
6 0
7 0
8 0
9 0
>= 10 0
Total processing time: 0m 5.137sec
BK_STOP 1679146298322
--------------------
content from stderr:
check for maximal unmarked siphon
ok
check for constant places
ok
check if there are places and transitions
ok
check if there are transitions without pre-places
ok
check if at least one transition is enabled in m0
ok
check if there are transitions that can never fire
ok
initing FirstDep: 0m 0.000sec
iterations count:37 (4), effective:8 (1)
initing FirstDep: 0m 0.000sec
iterations count:19 (2), effective:3 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:14 (1), effective:2 (0)
iterations count:18 (2), effective:2 (0)
iterations count:18 (2), effective:2 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:10 (1), effective:1 (0)
iterations count:16 (2), effective:3 (0)
iterations count:11 (1), effective:1 (0)
iterations count:8 (1), effective:0 (0)
iterations count:14 (1), effective:2 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:13 (1), effective:1 (0)
iterations count:13 (1), effective:1 (0)
iterations count:13 (1), effective:1 (0)
iterations count:13 (1), effective:1 (0)
iterations count:18 (2), effective:2 (0)
iterations count:13 (1), effective:1 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:11 (1), effective:1 (0)
iterations count:11 (1), effective:1 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:11 (1), effective:1 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:13 (1), effective:1 (0)
iterations count:8 (1), effective:0 (0)
iterations count:11 (1), effective:2 (0)
iterations count:11 (1), effective:1 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:13 (1), effective:1 (0)
iterations count:8 (1), effective:0 (0)
iterations count:11 (1), effective:1 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:13 (1), effective:1 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
iterations count:8 (1), effective:0 (0)
Sequence of Actions to be Executed by the VM
This is useful if one wants to reexecute the tool in the VM from the submitted image disk.
set -x
# this is for BenchKit: configuration of major elements for the test
export BK_INPUT="Sudoku-PT-AN02"
export BK_EXAMINATION="CTLCardinality"
export BK_TOOL="marcie"
export BK_RESULT_DIR="/tmp/BK_RESULTS/OUTPUTS"
export BK_TIME_CONFINEMENT="3600"
export BK_MEMORY_CONFINEMENT="16384"
export BK_BIN_PATH="/home/mcc/BenchKit/bin/"
# this is specific to your benchmark or test
export BIN_DIR="$HOME/BenchKit/bin"
# remove the execution directoty if it exists (to avoid increse of .vmdk images)
if [ -d execution ] ; then
rm -rf execution
fi
# this is for BenchKit: explicit launching of the test
echo "====================================================================="
echo " Generated by BenchKit 2-5348"
echo " Executing tool marcie"
echo " Input is Sudoku-PT-AN02, examination is CTLCardinality"
echo " Time confinement is $BK_TIME_CONFINEMENT seconds"
echo " Memory confinement is 16384 MBytes"
echo " Number of cores is 1"
echo " Run identifier is r481-tall-167912691600169"
echo "====================================================================="
echo
echo "--------------------"
echo "preparation of the directory to be used:"
tar xzf /home/mcc/BenchKit/INPUTS/Sudoku-PT-AN02.tgz
mv Sudoku-PT-AN02 execution
cd execution
if [ "CTLCardinality" = "ReachabilityDeadlock" ] || [ "CTLCardinality" = "UpperBounds" ] || [ "CTLCardinality" = "QuasiLiveness" ] || [ "CTLCardinality" = "StableMarking" ] || [ "CTLCardinality" = "Liveness" ] || [ "CTLCardinality" = "OneSafe" ] || [ "CTLCardinality" = "StateSpace" ]; then
rm -f GenericPropertiesVerdict.xml
fi
pwd
ls -lh
echo
echo "--------------------"
echo "content from stdout:"
echo
echo "=== Data for post analysis generated by BenchKit (invocation template)"
echo
if [ "CTLCardinality" = "UpperBounds" ] ; then
echo "The expected result is a vector of positive values"
echo NUM_VECTOR
elif [ "CTLCardinality" != "StateSpace" ] ; then
echo "The expected result is a vector of booleans"
echo BOOL_VECTOR
else
echo "no data necessary for post analysis"
fi
echo
if [ -f "CTLCardinality.txt" ] ; then
echo "here is the order used to build the result vector(from text file)"
for x in $(grep Property CTLCardinality.txt | cut -d ' ' -f 2 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ -f "CTLCardinality.xml" ] ; then # for cunf (txt files deleted;-)
echo echo "here is the order used to build the result vector(from xml file)"
for x in $(grep '
echo "FORMULA_NAME $x"
done
elif [ "CTLCardinality" = "ReachabilityDeadlock" ] || [ "CTLCardinality" = "QuasiLiveness" ] || [ "CTLCardinality" = "StableMarking" ] || [ "CTLCardinality" = "Liveness" ] || [ "CTLCardinality" = "OneSafe" ] ; then
echo "FORMULA_NAME CTLCardinality"
fi
echo
echo "=== Now, execution of the tool begins"
echo
echo -n "BK_START "
date -u +%s%3N
echo
timeout -s 9 $BK_TIME_CONFINEMENT bash -c "/home/mcc/BenchKit/BenchKit_head.sh 2> STDERR ; echo ; echo -n \"BK_STOP \" ; date -u +%s%3N"
if [ $? -eq 137 ] ; then
echo
echo "BK_TIME_CONFINEMENT_REACHED"
fi
echo
echo "--------------------"
echo "content from stderr:"
echo
cat STDERR ;