Presentation is loading. Please wait.

Presentation is loading. Please wait.

SymDiff: Leveraging Program Verification for Comparing Programs Shuvendu Lahiri Research in Software Engineering (RiSE), Microsoft Research, Redmond Jointly.

Similar presentations


Presentation on theme: "SymDiff: Leveraging Program Verification for Comparing Programs Shuvendu Lahiri Research in Software Engineering (RiSE), Microsoft Research, Redmond Jointly."— Presentation transcript:

1 SymDiff: Leveraging Program Verification for Comparing Programs Shuvendu Lahiri Research in Software Engineering (RiSE), Microsoft Research, Redmond Jointly with Chris Hawblitzel (Microsoft Research, Redmond), Ming Kawaguchi (UCSD), Henrique Rebelo (UPFE) VSSE Workshop, 2012

2 Motivation

3 Ensuring compatibility – Programmers spend a large fraction of their time ensuring (read praying) compatibility after changes Microsoft Confidential Does my bug-fix introduce a regression? Does the refactoring change any observable behavior? How does the feature addition impact existing features?

4 Compatibility: applications f() { Print(foo); g(); } g() {... Print(foo); } f() { Print(foo); g(); } g() {... Print(foo); } g() {... Print(foo); Print(bar); } g() {... Print(foo); Print(bar); } New features Refactoring Compilers Library API changes Bug fixes Version Control

5 Compatibility: Microsoft Products – Windows APIs (Win32, ntdll) – Driver development kits –.NET frameworks, Base class library – Compilers (C#, JIT,…) – ….. Windows updates – Security patches – Bug fixes Every developer/tester /auditor

6 Problem Use static analysis to – Improve the productivity of users trying to ensure compatibility across program changes Potential benefits – Agility: fewer regressions, higher confidence in changes, smarter code review,..

7 Challenge Equivalence checking is too strong a spec – Most changes modify behavior Hard to formalize (separate expected changes from unexpected changes) – Refactoring  behaviors intact – Bug fix  non-buggy behaviors intact – Feature add  existing feature behaviors intact – API change  ?? – Data change  ?? – Config changes  ?? – …

8 Challenge  Opportunity Hard to formalize (separate expected changes from unexpected changes) – Refactoring  behaviors intact – Bug fix  non-buggy behaviors intact – Feature add  existing feature behaviors intact – ……. Highlight “unexpected” changes

9 Our approach – Provide a tool for performing semantic diff (diff over behaviors) Microsoft Confidential Semantic Diff Does my bug-fix introduce a regression? Does the refactoring change any observable behavior? How does the feature addition impact existing features?

10 Our approach – Provide a tool for performing semantic diff (diff over behaviors) Microsoft Confidential Semantic Diff Does my bug-fix introduce a regression? Does the refactoring change any observable behavior? How does the feature addition impact existing features?

11 What is SymDiff? A framework to – Leverage and extend program verification for providing relative correctness

12 Overview Demo Semantic diff – Tool (in current form) An application – Compiler compatibility Making SymDiff extensible with contracts – Users can express “expected” changes – Mutual summaries and relative termination

13 Demo 1.Eval (bug1) 2.Eval (func) 3.StringCopy (bug fix) 4.Recursive example

14 SymDiff tool

15 SymDiff – Apply and extend program verification techniques towards comparing programs – Current form: Checks input/output partial equivalence [CAV ’12 tool paper]

16 SymDiff tool: language independent SymDiff (Boogie+ Z3) P1 P2 ≠ P1 = P2 Works at Boogie intermediate language S1 C/.NET/ x86/ARM  Boogie S2 C/.NET/ x86/ARM  Boogie

17 Simple intermediate verification language – [Barnett et al. FMCO’05] Commands – x := E //assign – havoc x //change x to an arbitrary value – assert E //if E holds, skip; otherwise, go wrong – assume E // if E holds, skip; otherwise, block – S ; T //execute S, then T – goto L1, L2, … Ln //non-deterministic jump to labels – call x := Foo(e1,e2,..) //procedure call

18 Boogie (contd.) Two types of expressions – Scalars (bool, int, ref,..) – Arrays ([int]int, [ref]ref, …) Array expression sugar for SMT array theory – x[i] := y  x := upd(x, i, y) – y := x[i]  y := sel(x,i) Procedure calls sugar for modular specification call Foo(); assert pre; havoc V; assume post; procedure Foo(); requires pre; ensures post; modifies V;

19 Basic equivalence checking void swap1(ref int x, ref int y){ int z = x; x = y; y = z; } void swap2(ref int x, ref int y){ x = x + y; y = x - y; x = x - y; } z0 == x0 && x1 == y0 && y1 == z0 && swap1.x == x1 && swap1.y == y1 && x1' == x0 + y0 && y1' == x1' – y0 && x2' == x1' – y1' && swap2.x == x2' && swap2.y == y1' && ~ (swap1.x == swap2.x && swap1.y == swap2.y) Z3 theorem prover UNSAT (Equivalent) SAT (Counterexample)

20 Handling procedure calls Modular checking – Assume “matched” callees are deterministic and have the same I/O behaviors – Modeled by uninterpreted functions [Necula ‘00, …, Godlin & Strichman ‘08, …..] Addition of postcondition for Foo, Foo’ modifies g; free ensures g == UF_Foo_g(x, old(g)); free ensures ret == UF_Foo_ret(x, old(g)); procedure Foo(x) returns (ret); modifies g; free ensures g == UF_Foo_g(x, old(g)); free ensures ret == UF_Foo_ret(x, old(g)); procedure Foo’(x) returns (ret);

21 Modeling C/Java/C#/x86  Boogie Separation of concerns – Front end can be developed independently – Quite a few already exists HAVOC/VCC for C, Spec#/BCT for.NET, ?? for Java, … Heap usually modeled by arrays – x.f := y  Heap_f[x] := y Challenges – Deterministic modeling of I/O, malloc, ….. – The entire heap is passed around

22 Application: Compiler compatibility

23 Compiler validation Microsoft Confidential X86 ARM ARM+opt Source v1v2v3 Versions X86+opt v4

24 Compatibility: x86 vs. x86 example G01: mov EAX, EDX G02: and EAX, 255 push EAX mov EDX, 0x call WriteInternalFlag2(int,bool) __epilog: ret G01: mov EAX, EDX G02: and EAX, 255 push EAX mov EDX, 0x call WriteInternalFlag2(int,bool) __epilog: ret G01: push ESI mov ESI, EDX G02: and ESI, 255 push ESI mov EDX, 0x call WriteInternalFlag2(int,bool) G03: pop ESI ret G01: push ESI mov ESI, EDX G02: and ESI, 255 push ESI mov EDX, 0x call WriteInternalFlag2(int,bool) G03: pop ESI ret v2v3 X86+opt 254

25 Large x86 vs. ARM example

26 Beyond equivalence

27 Type of changeCheck Refactoring/OptimizationsIn1 = In2  Out1’ = Out2’ Bug fixIn1 = In2  (Fail1’ || Out1’ = Out2’) Feature additionIn1 = In2  (UnImplemented1’ || Out1’ = Out2’) Performance optimizationIn1 = In2  (Measure2’ <= Measure1’) Differential assertion checking (DAC) (see POPL’12 on “Interleaved Bugs ….”) In1 = In2  (Fail1’ || ~Fail2’)

28 Contracts over two programs Need an extensible contract mechanism for comparing two programs – Generalization of pre/post conditions Why – Allow users to express relative correctness specifications (e.g. conditional equivalence) – Automated methods may not always suffice (even for equivalence checking) Challenge – Should be able to leverage SMT-based program verifiers

29 Mutual summaries – A extensible framework for interprocedural program comparison Prior work (mostly automated): – Intraprocedural Translation validation [Pnueli et al. ‘98, Necula ‘00, Zuck et al. ’05,…] – Coarse intraprocedural (only track equalities) Regression verification [Strichman et al. ‘08]

30 Mutual summaries – [MSR-TR ] Mutual summaries (MS) Relative termination (RT) Dealing with loops and unstructured goto

31 Example: Feature addition int f1(int x1){ a1 = A1[x2]; a2 = A2[x2]; if (Op[x1] == 0) return Val[x1]; else if (Op[x1] == 1) return f1(a1) + f1(a2); else if (Op[x1] == 2) return f1(a1) - f1(a2); else return 0; } int f2(int x2, bool isU){ a1 = A1[x2]; a2 = A2[x2]; if (Op[x2] == 0) return Val[x2]; else if (Op[x2] == 1){ if (isU) return uAdd(f2(a1, T), f2(a2, T)); else return f2(a1, F) + f2(a2, F); } else if (Op[x2] == 2){ if (isU) return uSub(f2(a1, T), f2(a2, T)); else return f2(a1, F) – f2(a2, F); } else return 0; } The programs are equivalent when isU == False

32 Mutual summaries What is a mutual summary MS(F1, F2)? – An formula over two copies of parameters, globals (g), returns and next state of globals (g’) void F1(int x1){ if(x1 < 100){ g1 := g1 + x1; F1(x1 + 1); } void F2(int x2){ if(x2 < 100){ g2 := g2 + 2*x2; F2(x2 + 1); } MS(F1, F2): (x1 = x2 && g1 = 0) ==> g1’ <= g2’

33 Mutual summaries What does a mutual summary MS(F1, F2) mean? – For any pre/post state pairs (s1,t1) of F1, and (s2,t2) of F2, (s1,t1,s2,t2) satisfy MS(F1,F2) void F1(int x1){ if(x1 < 100){ g1 := g1 + x1; F1(x1 + 1); } void F2(int x2){ if(x2 < 100){ g2 := g2 + 2*x2; F2(x2 + 1); } MS(F1, F2): (x1 = x2 && g1 = 0) ==> g1’ <= g2’

34 Example int f1(int x1){ a1 = A1[x2]; a2 = A2[x2]; if (Op[x1] == 0) return Val[x1]; else if (Op[x1] == 1) return f1(a1) + f1(a2); else if (Op[x1] == 2) return f1(a1) - f1(a2); else return 0; } int f2(int x2, bool isU){ a1 = A1[x2]; a2 = A2[x2]; if (Op[x2] == 0) return Val[x2]; else if (Op[x2] == 1){ if (isU) return uAdd(f2(a1, T), f2(a2, T)); else return f2(a1, F) + f2(a2, F); } else if (Op[x2] == 2){ if (isU) return uSub(f2(a1, T), f2(a2, T)); else return f2(a1, F) – f2(a2, F); } else return 0; } MS(f1, f2) = (x1 == x2 && !isU) ==> ret1 == ret2

35 Checking mutual summaries Given F1, F2, MS(F1, F2), define the following procedure: void CheckMS_F1_F2(int x1, int x2){ inline F1(x1); inline F2(x2); assert MS(F1,F2); }

36 Modular checking: Instrumentation 1. Add “summary relations” R_F1, and R_F2 void F1(int x1); ensures R_F1(x1, old(g1)/g1, g1/g1’); 2. Use the summary relations to assume mutual summaries at call sites: axiom (forall x1, g1, g1’, x2, g2, g2’:: {R_F1(x1, g1, g1’), R_F2(x2, g2, g2’)} (R_F1(x1, g1, g1’) && R_F2(x2, g2, g2’)) ==> MS_F1_F2(x1, g1, g1’, x2, g2, g2’) );

37 Leveraging program verifiers Mutual Summary checking – Encode using contracts (postconditions), axioms – Verification condition generation (Boogie) – Checking using SMT solver (Z3) Next steps – Inferring the mutual summaries

38 Relative termination Specification relating the terminating behaviors of P2 wrt P1 Not just for proving termination – Required for composing transformations – MS1(f,f’) && MS2(f’,f’’)  (MS1  MS2) (f,f’’) – E.g. P_Eq(f,f’) && P_Eq(f’,f’’)  P_Eq(f,f’’)

39 Relative termination condition What is a relative termination condition RT(F1, F2)? – An formula over two copies of parameters, globals (g) void F1(int x1){ if(x1 < 100){ g1 := g1 + x1; F1(x1 + 1); } void F2(int x2){ if(x2 < 100){ g2 := g2 + 2*x2; F2(x2 + 1); } RT(F1, F2): (x1 <= x2)

40 Relative termination condition What does relative termination condition RT(F1, F2) mean? – For pair of inputs states (s1,s2), if F1 terminates on s1, and (s1,s2) satisfies RT(F1,F2), then F2 terminates on s2 void F1(int x1){ if(x1 < 100){ g1 := g1 + x1; F1(x1 + 1); } void F2(int x2){ if(x2 < 100){ g2 := g2 + 2*x2; F2(x2 + 1); } RT(F1, F2): (x1 <= x2)

41 What about loops? int Foo2() { i = 0; if (n > 0) { t = g; v = 3; do2: a[i] := v; i := i + 1; v := v + t; //FLABEL While2: //FLABEL if (i < n) goto do2; } return i; } int Foo2() { i = 0; if (n > 0) { t = g; v = 3; do2: a[i] := v; i := i + 1; v := v + t; return While2(i, t, v); } return i; } (int,int) While2(i2, t2, v2) { i2' := i2; v2' := v2; if (i2' < n) { a2[i2'] := v2'; i2' := i2' + 1; v2' := v2' + t2; return While2(i2', t2,v2'); } return (i2‘,v2’); }

42 Unrolling optimizations void F2(int i2) { if (i2 < n) { a2[i2] = 1; F2(i2+1); return; } return; } void F3(int i3) { if (i3 + 1 < n) { a3[i3] := 1; a3[i3+1] := 1; F3(i3+2); return; } if (i3 < n) a3[i3] := 1; return; } Extra step Inline F2 once inside F2 to “match up” with F3 MS(F2, F3) = (i2 == i3 && a2 == a3) ==> a2’ == a3’

43 Using mutual summaries Flow 1.Specify the FLABELS to remove loops and gotos into procedures 2.Write mutual summaries for pairs of resulting procedures 3.Specify the inlining limit (if needed)

44 Express translation validation proofs of many compiler optimizations – Copy propagation – Constant propagation – Common sub-expression elimination – Partial redundancy elimination – Loop invariant code hoisting – Conditional speculation – Speculation – Software pipelining – Loop unswitching – Loop unrolling – Loop peeling – Loop splitting – Loop alignment – Loop interchange – Loop reversal – Loop skewing – Loop fusion – Loop distribution [Kundu, Tatlock, Lerner ‘09] Order of updates differ in two versions

45 A nice example that uses MS, RT void A(ref x){ if(x != nil){ A(next[x]); D(x); } next: ref  ref; data: ref  int; void B(ref x){ if(x != nil){ D(x); B(next[x]); } void C(ref x){ ref i := x; if(i != nil){ Do: D(i); i := next[i]; if (i != nil) goto Do; } void D(ref x){ data[x] := U(data[x]); } Recursive Tail-recursive Do-while

46 Overview Demo Semantic diff – Tool (in current form) An application – Compiler compatibility Making SymDiff extensible with contracts – Mutual summaries and relative termination – General contracts for comparing programs

47 In summary Checking compatibility (statically) is a huge opportunity – Both formalizing the problem – Tools/techniques to solve it Likely to have impact on development cycle – Existing static analysis tools has failed to do so cost- effectively, in spite of all the progress Combining with dynamic analysis – To generate test cases when possible, or aid testing achieve higher differential coverage

48 Resources SymDiff website Binary release soon! – Contains C front end


Download ppt "SymDiff: Leveraging Program Verification for Comparing Programs Shuvendu Lahiri Research in Software Engineering (RiSE), Microsoft Research, Redmond Jointly."

Similar presentations


Ads by Google