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Using Abduction and Induction for Operational Requirements Elaboration Dalal Alrajeh Oliver Ray Alessandra RussoSebastian Uchitel AIAI 2007 Sept. 15 th 2007
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2 System Development Cycle Requirements Design Testing Implementation Requirements
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3 Requirements Elaboration Operationalization Techniques Goals:BookRequestSatisfied Operations: checkOut,issueReminder,.. Agents:System, borrower,.. Objects: book(found,borrowed, … ) Operation: checkOut Operation: IssueReminder Precondition: Book Available Trigger condition:has been borrowed for at least 2wks and there hasn’t been a reminder within the last week
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4 Drawbacks Patterns become too complex Restricted to pattern catalog Size of specification becomes too large (some may be irrelevant) Lacks automated support
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5 Approach Overview Partial System Specification (LTL) Scenarios (LTL) Operational Requirements(LTL) (1)Transform into a logic program (2) Run ILP system (3) Transform into Requirement Using Abduction & Induction
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6 Mine Pump Controller
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7 Linear Temporal Logic A propositional logic for modeling event- based systems over a linear temporal structure The language is composed of –Boolean Propositions (P) –Boolean operators( , , , ) –Temporal Operators ( , , , U,W) *Propositions divided into two disjoint sets (event propositions and fluent propositions). P f ={pumpOn, criticalMethane, highWater} P e ={switchPumpOn, switchPumpOff, signalCriticalMethane, signalNoCriticalMethane, signalHighWater, signalNoHighWater}
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8 LTL Model s0s0 s1s1 s3s3 s2s2 signalNoHighWater switchPumpOn switchPumpOff signalNoHighWater signalHighWater Composed of a Labeled Transition System and a valuation function. labels Initial state states Transition Relation ={(s 0,signalHighWater.s 1 ),(s 1, switchPumpOn,s 2 ),…}
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9 LTL Model -2 The truth value of an event fluent at state s i depends on the i th transition label. The truth value of a fluent proposition depends on the path and position in a path of a labeled transition system. LTL formulae are interpreted over paths of a Labeled Transition System LTS HighWater U signalNotHighWater s0s0 s1s1 s3s3 s2s2 signalNoHighWater switchPumpOn switchPumpOff signalNoHighWater signalHighWater HighWater HighWater PumpOn HighWater
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10 Partial System Specification-1 Partial System Specification (LTL) Scenarios (LTL) System Requirements(LTL) Using Abduction & Induction Partial System Specification Initial state (0 i n) f i (0 j m) f j Effect Axioms: (e f ) (e f ) Persistence Axioms: (f f W E T ) ( f f W E I )
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11 Partial System Specification- 2 Mine Pump Partial System Specification Initial state: e.g. pumpOn criticalMethane highWater Effect Axioms: e.g. (switchPumpOn pumpOn ) (switchPumpOff pumpOn ) Persistence Axioms: e.g. (pumpOn pumpOn W switchPumpOn) ( pumpOn pumpOn W switchPumpOff)
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12 Scenario Properties -1 Partial System Specification (LTL) Scenarios (LTL) System Requirements(LTL) Using Abduction & Induction Scenario Properties Universal scenario Property: satisfied by all possible system behavior. ( i<n) i e i n ( )e n Existential scenario Property: satisfied by at least one. (1 j<m) j e j m ( )e m
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13 Scenario Properties-2 Mine Pump Scenario Properties Universal scenario Property: – signalCriticalMethane 2 signalHighWater 3 switchPumpOn Existential scenario Property: – signalHighWater 2 switchPumpOn – switchPumpOn
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14 A Model of the Mine Pump switchPumpOn u 1 = signalCriticalMethane 2 signalHighWater 3 switchPumpOn e 1 = signalHighWater 2 switchPumpOn e 2 = switchPumpOn
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15 Operational Requirements -1 Partial System Specification (LTL) Scenarios (LTL) System Requirements(LTL) Using Abduction & Induction Precondition Axioms: ( (1 j n) ( )f j e ) Trigger-Condition Axioms: ( (1 k m) ( )f k e)
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16 Opertational Requirements -2 Mine Pump Operational Requirements: Precondition Axioms: (criticalMethane switchPumpOn ) Trigger-Condition Axioms: ((highWater ¬ criticalMethene) switchPumpOn)
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17 The Task Given Partial System Specification Spec and a set of Universal and existential scenario properties SP u and Sp e, find a set of pre- and trigger conditions (Pre U Trig) such that: Spec U (Pre U Trig) |= sp u Spec U (Pre U Trig) |=/= ¬sp e *Pre U Trig are called a correct extension of Spec
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18 Approach Overview Partial System Specification (LTL) Scenarios (LTL) Operational Requirements(LTL) (1)Transform into a logic program (2) Run ILP system (3) Transform into Requirement Using Abduction & Induction
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19 Event Calculus Logic Program Domain dependent axioms –Initial State: initially(F,S) –Effect Axioms: initiates(E,F,T,S), terminates(E,F,T,S), –Event Axioms: impossible(E,T,S):-(not) holdsAt(F 1,T,S),.. triggered(E,T,S):- (not) holdsAt(F 1,T,S),.. Narrative: –attempt(E,T,S). Domain independent axioms –holdsAt(F,T2,S):- initially(F,S), not clipped(0,F,T2,S) –holdsAt(F,T2,S):- happens(E,T1,S), initiates(E,F,S,T1),T1<T2, not clipped(T1,F,T2,S). –clipped(T1,F,T2,S):- happens(E,T,S), terminates(E,F,T,S), T1<T, T < T2. –happens(E,T,S):- attempt(E,T,S), not impossible(E,T,S) –happens(E,T,S):- attempt(E,T,S), triggered(E,T,S). –:- triggered(E,T,S), impossible(E,T,S).
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20 Learning Event Calculus Programs Given Partial Set of Domain dependant axioms Domain Independent axioms Narrative Event facts Find Additional Domain Dependant Axioms that explain the event facts. B E H B U H |= E
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21 Sound Translation For any fluent f and position i , i |= f For any event e and position i , i |= e Obtaining program composed of – (Spec) –Nar ={ attempt(e i,i-1,s)| e i is the i th label in } Given –System Specification Spec –A finite path =e 1,e 2,… |= holdsAt(f,i, ) |= happens(e,i-1, )
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22 Step 1: Transform Specification into Logic Program -1 LTL Initial State Axioms Initial state facts pumpOn criticalMethane highWater not initially(pumpOn,S). not initially(criticalMethane,S). not initially(highWater,S).
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23 Step 1: Transform Specification into Logic Program -2 LTL Effect Axioms EC effect Axioms (switchPumpOn pumpOn ) (switchPumpOff pumpOn ) initiates(switchPumpOn,pumpOn,T,S). terminates(switchPumpOff,pumpOn,T,S).
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24 Step 1: Transform Specification into Logic Program -3 Scenario Properties signalCriticalMethane 2 signalHighWater 3 switchPumpOn Narrative attempt(signalCriticalMethane,0,u1). attempt(signalHighWater,1,u1). attempt(switchPumpOn,2,u1). Event facts happens(signalCriticalMethane,0,u1). happens(signalHighWater,1,u1). not happens(switchPumpOn,2,u1).
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25 Step 1: Transform Specification into Logic Program -4 Universal Scenario Prporties signalHighWater switchPumpumpOn Narrative attempt(signalHighWater,0,e1). attempt(switchPumpOn,1,e1). Action facts happens(signalHighWater,0,e1). happens(switchPumpOn,1,e1).
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26 Approach Overview Partial System Specification (LTL) Scenarios (LTL) Operational Requirements(LTL) (1)Transform into a logic program (2) Run ILP system (3) Transform into Requirement Using Abduction & Induction
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27 XHAIL: Extended Hybrid Abductive Inductive Learning Three phases –Abductive: Produce a set of ground atoms such that B U |= E –Deductive: Produce a set of ground clauses K ={k = :- b } –Inductive: Produces a hypothesis H subsumes K
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28 Step 2: Using XHAIL modeh(*,impossible(#event, +time,+scenario)) modeh(*,triggered(#event, +time, +scenario)) modeb(*,holdsAt(#fluent,+time,+scenario)) modeb(*,not holdsAt(#fluent, +time,+scenario)) % initiates(switchPumpOn,pumpOn,T,S). terminates(switchPumpOff,pumpOn,T,S). % attempt(signalCriticalMethane,0,u1). attempt(signalHighWater,1,u1). attempt(switchPumpOn,2,u1). % happens(signalCriticalMethane,0,u1). happens(signalHighWater,1,u1). not happens(switchPumpOn,2,u1). % initiates happens(E,T,S) :- attempts (E,T,S), not impossible (E,T,S) holdsAt(F,T2,S) :- initiates (E,F,T,S), happens (E,T,S), not clipped(T1,F,T2,S). ={triggered(switchPumpOn, 1, e2), impossible(switchPumpOn, 2,u1), impossible(tswitchPumpOn, 0,e1)} K={triggered(switchPumpOn, 1, e2):- holdsAt(highWater,1,e2). not holdsAt(pumpOn,2,e2), not holdsAt(criticalMethane,2,e2). impossible(switchPumpOn, 2,u1):- holdsAt(highWater,2,u1). not holdsAt(pumpOn,2,u1), holdsAt(criticalMethane,2,u1). impossible(switchPumpOn, 0,e1) :- not holdsAt(highWater,0, e1), not holdsAt(pumpOn,0,e1), not holdsAt(criticalMethane,0, e1). H={triggered(switchPumpOn, X, Y):- holdsAt(highWater,X,Y). not holdsAt(criticalMethane,X,Y). impossible(switchPumpOn, X,Y):-holdsAt(criticalMethane,X,Y). impossible(switchPumpOn, X,Y) :- not holdsAt(highWater,X, Y)}
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29 Approach Overview Partial System Specification (LTL) Scenarios (LTL) Operational Requirements(LTL) (1)Transform into a logic program (2) Run ILP system (3) Transform into Requirement Using Abduction & Induction
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30 Step 3: Transform into Requirements Hypothesis LTL Operational requirements triggered(turnPumpOn, X, Y):- holdsAt(highWater,X,Y). not holdsAt(methane,X,Y). ( (highWater criticalMethane) switchPumpOn) impossible(turnPumpOn, X,Y):-holdsAt(methane,X,Y). ( criticalMethane switchPumpOn)
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31 A Correct Extension with respect to an Inductive solution Obtaining the corresponding: –Partial System Description –Set of Scenario properties Find: –A a correct extension with respect to Spec and SP u U SP e Given Partial Set of Domain dependant axioms Domain Independent axioms Narrative Event facts Find Additional Domain dependant Axioms that explain the event facts B U H |= E Spec U -1 (H) |= sp u Spec U -1 (H) |=\= sp e B E H
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32 Extended Specification Model SpecSpec U Pre U Trig switchPumpOn
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33 Conclusion Novel application of Abduction and Induction in the requirements elaboration process. The need for non-monotonic Learning systems. The Framework provides a back-end computational approach for the operationalization process.
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34 Current and Future Work -1 Including Information about goals and agents in the partial specification Learning other types of requirements such as post-conditions. Learning requirements from discrete- time based models (goal driven models).
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35 Current and Future Work -2 Handling incomplete scenarios Representing system Goals and assumptions as Integrity constraints. Integrating ILP and model checking techniques such that scenarios are generated automatically using model checking tools. Thorough comparison of results obtained from other non monotonic approaches.
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36 Thank You
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37 An LTS of the Mine Pump
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38 Theorem 2 Given –a partial specification –set of consistent scenario properties –the EC theory (B,E)=Tr(Spec,SPu,SPe) –S be the set of EC event axioms. Then, –For any inductive generalisation H of E wrt. B and S, the corresponding set Tr(Pre U Trig)=(H) of LTL pre-condition and trigger-condition axioms is a correct extension of Spec with respect to SPu and SPe.
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