fond
Model Checking Contest @ Petri Nets 2015
Bruxelles, Belgium, June 23, 2015
Execution of r036kn-qhx2-143214464100093
Last Updated
August 19, 2015

About the Execution of Marcie for DrinkVendingMachine-PT-02

Execution Summary
Max Memory
Used (MB)
Time wait (ms) CPU Usage (ms) I/O Wait (ms) Computed Result Execution
Status
3958.350 15676.00 15773.00 20.40 FFTFFFTTFTTTTTFT normal

Execution Chart

We display below the execution chart for this examination (boot time has been removed).

Trace from the execution

Waiting for the VM to be ready (probing ssh)
.................
=====================================================================
Generated by BenchKit 2-2265
Executing tool marcie
Input is DrinkVendingMachine-PT-02, examination is CTLCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 1
Run identifier is r036kn-qhx2-143214464100093
=====================================================================


--------------------
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 DrinkVendingMachine-COL-02-CTLCardinality-0
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-1
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-10
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-11
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-12
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-13
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-14
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-15
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-2
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-3
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-4
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-5
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-6
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-7
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-8
FORMULA_NAME DrinkVendingMachine-COL-02-CTLCardinality-9

=== Now, execution of the tool begins

BK_START 1432543845127

Model: DrinkVendingMachine-PT-02
reachability algorithm:
Saturation-based algorithm
variable ordering algorithm:
Calculated like in [Noa99]
--memory=6 --suppress --rs-algorithm=3 --place-order=5

Marcie rev. 1429:1432M (built: crohr on 2014-10-22)
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: marcie --net-file=model.pnml --mcc-file=CTLCardinality.xml --memory=6 --suppress --rs-algorithm=3 --place-order=5

parse successfull
net created successfully

(NrP: 24 NrTr: 72 NrArc: 440)

net check time: 0m0sec

parse formulas successfull
formulas created successfully
place and transition orderings generation:0m0sec

init dd package: 0m12sec


RS generation: 0m0sec


-> reachability set: #nodes 34 (3.4e+01) #states 1,024 (3)



starting MCC model checker
--------------------------

checking: ~ [[AX [[sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(productSlots_2, productSlots_1) | 3<=sum(optionSlots_2, optionSlots_1)]] | [[[sum(productSlots_2, productSlots_1)<=sum(theOptions_2, theOptions_1) | sum(theProducts_2, theProducts_1)<=sum(optionSlots_2, optionSlots_1)] | [sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1) & sum(theProducts_2, theProducts_1)<=sum(productSlots_2, productSlots_1)]] & AG [sum(optionSlots_2, optionSlots_1)<=sum(optionSlots_2, optionSlots_1)]]]]
normalized: ~ [[~ [EX [~ [[sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(productSlots_2, productSlots_1) | 3<=sum(optionSlots_2, optionSlots_1)]]]] | [[[sum(productSlots_2, productSlots_1)<=sum(theOptions_2, theOptions_1) | sum(theProducts_2, theProducts_1)<=sum(optionSlots_2, optionSlots_1)] | [sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1) & sum(theProducts_2, theProducts_1)<=sum(productSlots_2, productSlots_1)]] & ~ [E [true U ~ [sum(optionSlots_2, optionSlots_1)<=sum(optionSlots_2, optionSlots_1)]]]]]]

abstracting: (sum(optionSlots_2, optionSlots_1)<=sum(optionSlots_2, optionSlots_1)) states: 1,024 (3)
abstracting: (sum(theProducts_2, theProducts_1)<=sum(productSlots_2, productSlots_1)) states: 768
abstracting: (sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 1,024 (3)
abstracting: (sum(theProducts_2, theProducts_1)<=sum(optionSlots_2, optionSlots_1)) states: 704
abstracting: (sum(productSlots_2, productSlots_1)<=sum(theOptions_2, theOptions_1)) states: 704
abstracting: (3<=sum(optionSlots_2, optionSlots_1)) states: 0
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(productSlots_2, productSlots_1)) states: 4
.-> the formula is FALSE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-0 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: ~ [[[[sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1) & ~ [2<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]] | EF [1<=sum(theProducts_2, theProducts_1)]] & [[1<=sum(productSlots_2, productSlots_1) | [sum(optionSlots_2, optionSlots_1)<=sum(theProducts_2, theProducts_1) | sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]] & AG [sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]]]]
normalized: ~ [[[[1<=sum(productSlots_2, productSlots_1) | [sum(optionSlots_2, optionSlots_1)<=sum(theProducts_2, theProducts_1) | sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]] & ~ [E [true U ~ [sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]]]] & [[sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1) & ~ [2<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]] | E [true U 1<=sum(theProducts_2, theProducts_1)]]]]

abstracting: (1<=sum(theProducts_2, theProducts_1)) states: 768
abstracting: (2<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 912
abstracting: (sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1)) states: 768
abstracting: (sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 1,024 (3)
abstracting: (sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 1,024 (3)
abstracting: (sum(optionSlots_2, optionSlots_1)<=sum(theProducts_2, theProducts_1)) states: 704
abstracting: (1<=sum(productSlots_2, productSlots_1)) states: 768
-> the formula is FALSE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-1 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: E [[1<=sum(theOptions_2, theOptions_1) | [1<=sum(optionSlots_2, optionSlots_1) | sum(theProducts_2, theProducts_1)<=sum(productSlots_2, productSlots_1)]] U 3<=sum(theProducts_2, theProducts_1)]
normalized: E [[1<=sum(theOptions_2, theOptions_1) | [1<=sum(optionSlots_2, optionSlots_1) | sum(theProducts_2, theProducts_1)<=sum(productSlots_2, productSlots_1)]] U 3<=sum(theProducts_2, theProducts_1)]

abstracting: (3<=sum(theProducts_2, theProducts_1)) states: 0
abstracting: (sum(theProducts_2, theProducts_1)<=sum(productSlots_2, productSlots_1)) states: 768
abstracting: (1<=sum(optionSlots_2, optionSlots_1)) states: 768
abstracting: (1<=sum(theOptions_2, theOptions_1)) states: 768
-> the formula is FALSE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-2 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: [EX [AG [sum(theProducts_2, theProducts_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]] & [AG [~ [3<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]] | EX [[sum(theProducts_2, theProducts_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1) & 2<=sum(optionSlots_2, optionSlots_1)]]]]
normalized: [[~ [E [true U 3<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]] | EX [[sum(theProducts_2, theProducts_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1) & 2<=sum(optionSlots_2, optionSlots_1)]]] & EX [~ [E [true U ~ [sum(theProducts_2, theProducts_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]]]]]

abstracting: (sum(theProducts_2, theProducts_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 1,024 (3)
.abstracting: (2<=sum(optionSlots_2, optionSlots_1)) states: 256
abstracting: (sum(theProducts_2, theProducts_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 988
.abstracting: (3<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 1,008 (3)
-> the formula is TRUE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-3 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: AG [sum(theProducts_2, theProducts_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]
normalized: ~ [E [true U ~ [sum(theProducts_2, theProducts_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]]]

abstracting: (sum(theProducts_2, theProducts_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 1,024 (3)
-> the formula is TRUE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-4 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: AX [AG [sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]]
normalized: ~ [EX [E [true U ~ [sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]]]]

abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 1,024 (3)
.-> the formula is TRUE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-5 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: [AG [~ [3<=sum(productSlots_2, productSlots_1)]] & [[~ [3<=sum(theProducts_2, theProducts_1)] & EF [2<=sum(optionSlots_2, optionSlots_1)]] & EF [[sum(theProducts_2, theProducts_1)<=sum(theProducts_2, theProducts_1) & 1<=sum(theProducts_2, theProducts_1)]]]]
normalized: [~ [E [true U 3<=sum(productSlots_2, productSlots_1)]] & [[E [true U 2<=sum(optionSlots_2, optionSlots_1)] & ~ [3<=sum(theProducts_2, theProducts_1)]] & E [true U [sum(theProducts_2, theProducts_1)<=sum(theProducts_2, theProducts_1) & 1<=sum(theProducts_2, theProducts_1)]]]]

abstracting: (1<=sum(theProducts_2, theProducts_1)) states: 768
abstracting: (sum(theProducts_2, theProducts_1)<=sum(theProducts_2, theProducts_1)) states: 1,024 (3)
abstracting: (3<=sum(theProducts_2, theProducts_1)) states: 0
abstracting: (2<=sum(optionSlots_2, optionSlots_1)) states: 256
abstracting: (3<=sum(productSlots_2, productSlots_1)) states: 0
-> the formula is TRUE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-6 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: AG [sum(theOptions_2, theOptions_1)<=sum(theOptions_2, theOptions_1)]
normalized: ~ [E [true U ~ [sum(theOptions_2, theOptions_1)<=sum(theOptions_2, theOptions_1)]]]

abstracting: (sum(theOptions_2, theOptions_1)<=sum(theOptions_2, theOptions_1)) states: 1,024 (3)
-> the formula is TRUE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-7 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: EF [~ [~ [[sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(productSlots_2, productSlots_1) & sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(theProducts_2, theProducts_1)]]]]
normalized: E [true U [sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(productSlots_2, productSlots_1) & sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(theProducts_2, theProducts_1)]]

abstracting: (sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(theProducts_2, theProducts_1)) states: 148
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(productSlots_2, productSlots_1)) states: 4
-> the formula is FALSE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-8 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: ~ [E [sum(theOptions_2, theOptions_1)<=sum(theProducts_2, theProducts_1) U [3<=sum(optionSlots_2, optionSlots_1) & 2<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]]]
normalized: ~ [E [sum(theOptions_2, theOptions_1)<=sum(theProducts_2, theProducts_1) U [3<=sum(optionSlots_2, optionSlots_1) & 2<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]]]

abstracting: (2<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 1,024 (3)
abstracting: (3<=sum(optionSlots_2, optionSlots_1)) states: 0
abstracting: (sum(theOptions_2, theOptions_1)<=sum(theProducts_2, theProducts_1)) states: 704
-> the formula is TRUE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-9 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: [[EG [1<=sum(theProducts_2, theProducts_1)] | [EF [sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)] & [[sum(optionSlots_2, optionSlots_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1) | sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(theProducts_2, theProducts_1)] | [sum(theProducts_2, theProducts_1)<=sum(optionSlots_2, optionSlots_1) & sum(theOptions_2, theOptions_1)<=sum(theProducts_2, theProducts_1)]]]] & [~ [[sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(theOptions_2, theOptions_1) | ~ [sum(theOptions_2, theOptions_1)<=sum(theOptions_2, theOptions_1)]]] | [~ [3<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)] | ~ [[sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(optionSlots_2, optionSlots_1) & sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(theProducts_2, theProducts_1)]]]]]
normalized: [[[~ [3<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)] | ~ [[sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(optionSlots_2, optionSlots_1) & sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(theProducts_2, theProducts_1)]]] | ~ [[sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(theOptions_2, theOptions_1) | ~ [sum(theOptions_2, theOptions_1)<=sum(theOptions_2, theOptions_1)]]]] & [[E [true U sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)] & [[sum(theProducts_2, theProducts_1)<=sum(optionSlots_2, optionSlots_1) & sum(theOptions_2, theOptions_1)<=sum(theProducts_2, theProducts_1)] | [sum(optionSlots_2, optionSlots_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1) | sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(theProducts_2, theProducts_1)]]] | EG [1<=sum(theProducts_2, theProducts_1)]]]

abstracting: (1<=sum(theProducts_2, theProducts_1)) states: 768
.
EG iterations: 1
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(theProducts_2, theProducts_1)) states: 4
abstracting: (sum(optionSlots_2, optionSlots_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 988
abstracting: (sum(theOptions_2, theOptions_1)<=sum(theProducts_2, theProducts_1)) states: 704
abstracting: (sum(theProducts_2, theProducts_1)<=sum(optionSlots_2, optionSlots_1)) states: 704
abstracting: (sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 912
abstracting: (sum(theOptions_2, theOptions_1)<=sum(theOptions_2, theOptions_1)) states: 1,024 (3)
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(theOptions_2, theOptions_1)) states: 4
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(theProducts_2, theProducts_1)) states: 4
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(optionSlots_2, optionSlots_1)) states: 4
abstracting: (3<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 672
-> the formula is TRUE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-10 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: AF [[AX [3<=sum(productSlots_2, productSlots_1)] | ~ [1<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]]]
normalized: ~ [EG [~ [[~ [1<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)] | ~ [EX [~ [3<=sum(productSlots_2, productSlots_1)]]]]]]]

abstracting: (3<=sum(productSlots_2, productSlots_1)) states: 0
.abstracting: (1<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 1,024 (3)

EG iterations: 0
-> the formula is FALSE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-11 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: [~ [[~ [[2<=sum(optionSlots_2, optionSlots_1) | 3<=sum(optionSlots_2, optionSlots_1)]] & [[sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(productSlots_2, productSlots_1) & sum(optionSlots_2, optionSlots_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)] | [sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(optionSlots_2, optionSlots_1) & 3<=sum(theProducts_2, theProducts_1)]]]] & ~ [[sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1) & 1<=sum(theOptions_2, theOptions_1)]]]
normalized: [~ [[sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1) & 1<=sum(theOptions_2, theOptions_1)]] & ~ [[~ [[2<=sum(optionSlots_2, optionSlots_1) | 3<=sum(optionSlots_2, optionSlots_1)]] & [[sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(productSlots_2, productSlots_1) & sum(optionSlots_2, optionSlots_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)] | [sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(optionSlots_2, optionSlots_1) & 3<=sum(theProducts_2, theProducts_1)]]]]]

abstracting: (3<=sum(theProducts_2, theProducts_1)) states: 0
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(optionSlots_2, optionSlots_1)) states: 4
abstracting: (sum(optionSlots_2, optionSlots_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 1,024 (3)
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(productSlots_2, productSlots_1)) states: 4
abstracting: (3<=sum(optionSlots_2, optionSlots_1)) states: 0
abstracting: (2<=sum(optionSlots_2, optionSlots_1)) states: 256
abstracting: (1<=sum(theOptions_2, theOptions_1)) states: 768
abstracting: (sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1)) states: 768
-> the formula is FALSE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-12 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: [[EG [sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)] & sum(optionSlots_2, optionSlots_1)<=sum(optionSlots_2, optionSlots_1)] & [~ [[~ [sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)] | [3<=sum(theProducts_2, theProducts_1) & sum(productSlots_2, productSlots_1)<=sum(theOptions_2, theOptions_1)]]] & EX [[sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(optionSlots_2, optionSlots_1) & sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]]]]
normalized: [[sum(optionSlots_2, optionSlots_1)<=sum(optionSlots_2, optionSlots_1) & EG [sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)]] & [EX [[sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(optionSlots_2, optionSlots_1) & sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]] & ~ [[~ [sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)] | [3<=sum(theProducts_2, theProducts_1) & sum(productSlots_2, productSlots_1)<=sum(theOptions_2, theOptions_1)]]]]]

abstracting: (sum(productSlots_2, productSlots_1)<=sum(theOptions_2, theOptions_1)) states: 704
abstracting: (3<=sum(theProducts_2, theProducts_1)) states: 0
abstracting: (sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 912
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 352
abstracting: (sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)<=sum(optionSlots_2, optionSlots_1)) states: 148
.abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 1,024 (3)

EG iterations: 0
abstracting: (sum(optionSlots_2, optionSlots_1)<=sum(optionSlots_2, optionSlots_1)) states: 1,024 (3)
-> the formula is FALSE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-13 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: [EX [EF [1<=sum(theProducts_2, theProducts_1)]] & A [[1<=sum(theProducts_2, theProducts_1) & sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1)] U [1<=sum(theOptions_2, theOptions_1) | 1<=sum(productSlots_2, productSlots_1)]]]
normalized: [[~ [E [~ [[1<=sum(theProducts_2, theProducts_1) & sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1)]] U [~ [[1<=sum(theProducts_2, theProducts_1) & sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1)]] & ~ [[1<=sum(theOptions_2, theOptions_1) | 1<=sum(productSlots_2, productSlots_1)]]]]] & ~ [EG [~ [[1<=sum(theOptions_2, theOptions_1) | 1<=sum(productSlots_2, productSlots_1)]]]]] & EX [E [true U 1<=sum(theProducts_2, theProducts_1)]]]

abstracting: (1<=sum(theProducts_2, theProducts_1)) states: 768
.abstracting: (1<=sum(productSlots_2, productSlots_1)) states: 768
abstracting: (1<=sum(theOptions_2, theOptions_1)) states: 768
........
EG iterations: 8
abstracting: (1<=sum(productSlots_2, productSlots_1)) states: 768
abstracting: (1<=sum(theOptions_2, theOptions_1)) states: 768
abstracting: (sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1)) states: 768
abstracting: (1<=sum(theProducts_2, theProducts_1)) states: 768
abstracting: (sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1)) states: 768
abstracting: (1<=sum(theProducts_2, theProducts_1)) states: 768
-> the formula is TRUE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-14 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec

checking: [[AX [~ [sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]] | EG [[3<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1) | sum(theOptions_2, theOptions_1)<=sum(theProducts_2, theProducts_1)]]] | AF [[[sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1) | 3<=sum(theProducts_2, theProducts_1)] & [sum(optionSlots_2, optionSlots_1)<=sum(theOptions_2, theOptions_1) | 3<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]]]]
normalized: [~ [EG [~ [[[sum(optionSlots_2, optionSlots_1)<=sum(theOptions_2, theOptions_1) | 3<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)] & [sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1) | 3<=sum(theProducts_2, theProducts_1)]]]]] | [~ [EX [sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)]] | EG [[3<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1) | sum(theOptions_2, theOptions_1)<=sum(theProducts_2, theProducts_1)]]]]

abstracting: (sum(theOptions_2, theOptions_1)<=sum(theProducts_2, theProducts_1)) states: 704
abstracting: (3<=sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)) states: 1,008 (3)
.
EG iterations: 1
abstracting: (sum(wait_8, wait_7, wait_6, wait_5, wait_4, wait_3, wait_2, wait_1)<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 352
.abstracting: (3<=sum(theProducts_2, theProducts_1)) states: 0
abstracting: (sum(productSlots_2, productSlots_1)<=sum(theProducts_2, theProducts_1)) states: 768
abstracting: (3<=sum(ready_8, ready_6, ready_7, ready_4, ready_5, ready_2, ready_3, ready_1)) states: 672
abstracting: (sum(optionSlots_2, optionSlots_1)<=sum(theOptions_2, theOptions_1)) states: 768
.........
EG iterations: 9
-> the formula is TRUE

FORMULA DrinkVendingMachine-COL-02-CTLCardinality-15 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m0sec


Total processing time: 0m15sec


BK_STOP 1432543860803

--------------------
content from stderr:

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: 0m0sec


iterations count:328 (4), effective:28 (0)

initing FirstDep: 0m0sec


iterations count:75 (1), effective:1 (0)

iterations count:73 (1), effective:1 (0)

iterations count:75 (1), effective:1 (0)

iterations count:104 (1), effective:6 (0)

iterations count:74 (1), effective:2 (0)

iterations count:75 (1), effective:1 (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="DrinkVendingMachine-PT-02"
export BK_EXAMINATION="CTLCardinality"
export BK_TOOL="marcie"
export BK_RESULT_DIR="/home/fko/BK_RESULTS/OUTPUTS"
export BK_TIME_CONFINEMENT="3600"
export BK_MEMORY_CONFINEMENT="16384"

# 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

tar xzf /home/mcc/BenchKit/INPUTS/DrinkVendingMachine-PT-02.tgz
mv DrinkVendingMachine-PT-02 execution

# this is for BenchKit: explicit launching of the test

cd execution
echo "====================================================================="
echo " Generated by BenchKit 2-2265"
echo " Executing tool marcie"
echo " Input is DrinkVendingMachine-PT-02, 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 r036kn-qhx2-143214464100093"
echo "====================================================================="
echo
echo "--------------------"
echo "content from stdout:"
echo
echo "=== Data for post analysis generated by BenchKit (invocation template)"
echo
if [ "CTLCardinality" = "ReachabilityComputeBounds" ] ; 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 '' CTLCardinality.xml | cut -d '>' -f 2 | cut -d '<' -f 1 | sort -u) ; do
echo "FORMULA_NAME $x"
done
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 ;