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ELEC 7770 Advanced VLSI Design Spring 2012 Verification

ELEC 7770 Advanced VLSI Design Spring 2012 Verification. Vishwani D. Agrawal James J. Danaher Professor ECE Department, Auburn University Auburn, AL 36849 vagrawal@eng.auburn.edu http://www.eng.auburn.edu/~vagrawal/COURSE/E7770_Spr12/course.html. VLSI Realization Process. Customer’s need.

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ELEC 7770 Advanced VLSI Design Spring 2012 Verification

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  1. ELEC 7770Advanced VLSI DesignSpring 2012Verification Vishwani D. Agrawal James J. Danaher Professor ECE Department, Auburn University Auburn, AL 36849 vagrawal@eng.auburn.edu http://www.eng.auburn.edu/~vagrawal/COURSE/E7770_Spr12/course.html ELEC 7770: Advanced VLSI Design (Agrawal)

  2. VLSI Realization Process Customer’s need Design Determine requirements Write specifications Design synthesis and Verification Test development Fabrication Manufacturing test Manufacture Chips to customer ELEC 7770: Advanced VLSI Design (Agrawal)

  3. Origin of “Debugging” Thomas Edison wrote in a letter in 1878: “It has been just so in all of my inventions. The first step is an intuition, and comes with a burst, then difficulties arise—this thing gives out and [it is] then that “Bugs” — as such little faults and difficulties are called — show themselves and months of intense watching, study and labor are requisite before commercial success or failure is certainly reached.” An interesting example of “debugging” was in 1945 when a computer failure was traced down to a moth that was caught in a relay between contacts (Figure 3-1). D. Gizopoulos (Editor), Advances in Electronic Testing: Challenges and Methodologies, Springer, 2006, Chapter 3, “Silicon Debug,” by D. Josephson and B. Gottlieb. ELEC 7770: Advanced VLSI Design (Agrawal)

  4. Verification and Testing Hardware design Manufacturing Specification Silicon Verification Testing 50-70% cost 30-50% cost ELEC 7770: Advanced VLSI Design (Agrawal)

  5. Definitions Verification: Predictive analysis to ensure that the synthesized design, when manufactured, will perform the given I/O function. Alternative Definition: Verification is a process used to demonstrate the functional correctness of a design. ELEC 7770: Advanced VLSI Design (Agrawal)

  6. What is Being Verified? RTL coding Specification Interpretation Verification J. Bergeron, Writing Testbenches: Functional Verification Of HDL Models, Springer, 2000. Given a set of specification, Does the design do what was specified? ELEC 7770: Advanced VLSI Design (Agrawal)

  7. Avoiding Interpretation Error RTL coding Interpretation Specification Interpretation Verification Use redundancy ELEC 7770: Advanced VLSI Design (Agrawal)

  8. Methods of Verification • Simulation: Verify input-output behavior for selected cases. • Formal verification: Exhaustively verify input-output behavior: • Equivalence checking • Model checking • Symbolic simulation ELEC 7770: Advanced VLSI Design (Agrawal)

  9. Equivalence Checking Logic equivalence: Two circuits implement identical Boolean function. Logic and temporal equivalence: Two finite state machines have identical input-output behavior (machine equivalence). Topological equivalence: Two netlists are identical (graph isomorphism). Reference: S.-Y. Hwang and K.-T. Cheng, Formal Equivalence Checking and Design Debugging, Springer, 1998. ELEC 7770: Advanced VLSI Design (Agrawal)

  10. Compare Two Circuits a c b a c b f f Are graphs isomorphic? Are Boolean functions identical? Are timing behaviors identical? ELEC 7770: Advanced VLSI Design (Agrawal)

  11. Are Graphs Isomorphic? NO. a AND f OR c NOT AND b a OR NOT f AND c OR b ELEC 7770: Advanced VLSI Design (Agrawal)

  12. Are Boolean Functions Identical? YES. a c b a c b f f a 1 1 c 1 1 b ELEC 7770: Advanced VLSI Design (Agrawal)

  13. Model Checking RTL coding Specification RTL Assertions Interpretation Model checking Construct an abstract model of the system, usually in the form of a finite-state machine (FSM). Analytically prove that the model does not violate the properties (assertions) of original specification. Reference: E. M. Clarke, Jr., O. Grumberg, and D. A. Peled, Model Checking, MIT Press, 1999. ELEC 7770: Advanced VLSI Design (Agrawal)

  14. Symbolic Simulation Simulation with algebraic symbols rather than numerical values. Self-consistency: A complex (more advanced) design produces the same result as a much simpler (and previously verified) design. Reference: R. B. Jones, Symbolic Simulation Methods for Industrial Formal Verification, Springer, 2002. ELEC 7770: Advanced VLSI Design (Agrawal)

  15. Simulation: Testbench Testbench (HDL) Design under verification (HDL) See Professor Nelson’s Lectures: Modeling and Simulating ASIC Designs with VHDL www.eng.auburn.edu/~vagrawal/COURSE/E6200_Spr12/LECTURES/ELEC5200 VHDL Overview.pptx VHDL Simulation, Testbench Design www.eng.auburn.edu/~vagrawal/COURSE/E6200_Spr12/LECTURES/VHDL 6 Testbench.pptx ELEC 7770: Advanced VLSI Design (Agrawal)

  16. Testbench • HDL code: • Generates stimuli • Checks output responses • Approaches: • Blackbox • Whitebox • Greybox • Metrics (unreliable): • Statement coverage • Path coverage • Expression or branch coverage ELEC 7770: Advanced VLSI Design (Agrawal)

  17. Equivalence Checking • Definition: Establishing that two circuits are functionally equivalent. • Applications: • Verify that a design is identical to specification. • Verify that synthesis did not change the function. • Verify that corrections made to a design did not create new errors. ELEC 7770: Advanced VLSI Design (Agrawal)

  18. Compare Two Circuits a c b a c b f f Are graphs isomorphic? Yes Else, are Boolean functions identical? Yes Then, are timing behaviors identical? Yes ELEC 7770: Advanced VLSI Design (Agrawal)

  19. ATPG Approach (Miter) Circuit 1 (Verified design) stuck-at-0 Circuit 2 (Sythesized or modified design) stuck-at-0 Redundancy of a stuck-at-0 fault, checked by ATPG, establishes equivalence of the corresponding output pair. If the fault is detectable, its tests are used to diagnose the differences. ELEC 7770: Advanced VLSI Design (Agrawal)

  20. Difficulties with Miter ATPG is NP-complete. When circuits are equivalent, proving redundancy of faults is computationally expensive. When circuits are different, test vectors are quickly found, but diagnosis is difficult. ELEC 7770: Advanced VLSI Design (Agrawal)

  21. A Heuristic Approach Derive V1, test vectors for all faults in C1. Derive V2, test vectors for all faults in C2. If the combined set, V1+V2, produces the same outputs from the two circuits, then they are probably equivalent. Reference: V. D. Agrawal, “Choice of Tests for Logic Verification and Equivalence Checking and the Use of Fault Simulation,” Proc. 13th International Conf. VLSI Design, January 2000, pp. 306-311. ELEC 7770: Advanced VLSI Design (Agrawal)

  22. C1 = x1 x3 x4 + x2 x3 + x2 x4 Example Circuit C1 x1 x2 x3 x4 C1 Tests x3 1 1 1 x2 1 1 1 1 x1 1 x4 ELEC 7770: Advanced VLSI Design (Agrawal)

  23. C2 = x1 x3 x4 + x2 x3 + x2 x4 Example Circuit C2 x1 x2 x3 x4 C2 Tests x3 1 1 1 x2 1 1 1 1 x1 1 x4 ELEC 7770: Advanced VLSI Design (Agrawal)

  24. C1 ≡ C2 Tests x3 Tests x3 1 1 1 1 1 1 x2 x2 1 1 1 1 1 1 1 1 x1 x1 1 1 x4 x4 C1 C2 ELEC 7770: Advanced VLSI Design (Agrawal)

  25. C2 = x1 x3 x4 + x2 x3 + x2 x4 C2’ = x1 x2 x3 x4 + x2 x3 + x2 x4 C2’: Erroneous Implementation of C2 x1 x2 x3 x4 C2’ Tests x3 1 1 1 x2 1 1 1 x1 1 minterm deleted x4 ELEC 7770: Advanced VLSI Design (Agrawal)

  26. C1 = x1 x3 x4 + x2 x3 + x2 x4 C2’ = x1 x2 x3 x4 + x2 x3 + x2 x4 Incorrect Result: C1 ≡ C2’ Tests x3 Tests x3 1 1 1 1 1 1 x2 x2 1 1 1 1 1 1 1 x1 x1 1 1 minterm deleted x4 x4 ELEC 7770: Advanced VLSI Design (Agrawal)

  27. Additional Safeguard s-a-0 C1 (Verified design) 0 s-a-1 C2 (Sythesized or modified design) • Simulate V1+V2 for equivalence: • Output always 0 • No single fault on PI’s detected • Still not perfect ELEC 7770: Advanced VLSI Design (Agrawal)

  28. Probabilistic Equivalence • Consider two Boolean functions F and G of the same set of input variables {X1, . . . , Xn}. • Let f = Prob(F=1), g = Prob(G=1), xi = Prob(Xi=1) • For any arbitrarily given values of xi, if f = g, then F and G are equivalent with probability 1. • References: • J. Jain, J. Bittner, D. S. Fussell and J. A. Abraham, “Probabilistic Verification of Boolean Functions,” Formal Methods in System Design, vol. 1, pp 63-117, 1992. • V. D. Agrawal and D. Lee, “Characteristic Polynomial Method for Verification and Test of Combinational Circuits,” Proc. 9th International Conf. VLSI Design, January 1996, pp. 341-342. ELEC 7770: Advanced VLSI Design (Agrawal)

  29. Simplest Example F = X1.X2, f = x1 x2 G = X1+X2, g = (1 – x1)(1 – x2) = 1 – x1 – x2 + x1 x2 Input probabilities, x1 and x2, are randomly taken from {0.0, 1.0} We make a wrong decision if f = g, i.e., x1x2 = 1 – x1 – x2 + x1 x2 or x1 + x2 = 1 ELEC 7770: Advanced VLSI Design (Agrawal)

  30. Probability of Wrong Decision x2 Randomly selected point (x1,x2) 1.0 x1 + x2 = 1 0 x1 1.0 Probability of wrong decision = Random point falls on line {x1 + x2 = 1} = (area of line)/(area of unit square) = 0 ELEC 7770: Advanced VLSI Design (Agrawal)

  31. Calculation of Signal Probability • Exact calculation • Exponential complexity. • Affected by roundoff errors. • Alternative: Monte Carlo method • Randomly select input probabilities • Generate random input vectors • Simulate circuits F and G • If outputs have a mismatch, circuits are not equivalent. • Else, stop after “sufficiently” large number of vectors (open problem). ELEC 7770: Advanced VLSI Design (Agrawal)

  32. References on Signal Probability S. C. Seth and V. D. Agrawal, “A New Model for Computation of Probabilistic Testability in Combinational Circuits,” INTEGRATION, The VLSI Journal, vol. 7, pp. 49-75, 1989. V. D. Agrawal and D. Lee and H. Woźniakowski, “Numerical Computation of Characteristic Polynomials of Boolean Functions and its Applications,” Numerical Algorithms, vol. 17, pp. 261-278, 1998. ELEC 7770: Advanced VLSI Design (Agrawal)

  33. More on Equivalence Checking • Don’t cares • Sequential circuits • Time-frame expansion • Initial state • Design debugging (diagnosis) • Reference: S.-Y. Hwang and K.-T. Cheng, Formal Equivalence Checking and Design Debugging, Springer, 1998. ELEC 7770: Advanced VLSI Design (Agrawal)

  34. Methods of Equivalence Checking Satisfiability algorithms ATPG methods Binary decision diagrams (BDD) ELEC 7770: Advanced VLSI Design (Agrawal)

  35. Shannon’s Expansion Theorem • C. E. Shannon, “A Symbolic Analysis of Relay and Switching Circuits,” Trans. AIEE, vol. 57, pp. 713-723, 1938. • Consider: • Boolean variables, X1, X2, . . . , Xn • Boolean function, F(X1, X2, . . . , Xn) • Then F = Xi F(Xi=1) + Xi’ F(Xi=0) • Where • Xi’ is complement of Xi • Cofactors, F(Xi=j) = F(X1, X2, . . , Xi=j, . . , Xn), j = 0 or 1 ELEC 7770: Advanced VLSI Design (Agrawal)

  36. Claude E. Shannon (1916-2001) http://www.kugelbahn.ch/sesam_e.htm ELEC 7770: Advanced VLSI Design (Agrawal)

  37. Shannon’s Legacy A Symbolic Analysis of Relay and Switching Circuits, Master’s Thesis, MIT, 1940. Perhaps the most influential master’s thesis of the 20th century. An Algebra for Theoretical Genetics, PhD Thesis, MIT, 1940. Founded the field of Information Theory. C. E. Shannon and W. Weaver, The Mathematical Theory of Communication, University of Illinois Press, 1949. A “must read.” ELEC 7770: Advanced VLSI Design (Agrawal)

  38. Theorem (1) F = Xi F(Xi = 1) + Xi’ F(Xi = 0) ∀i = 1,2,3, . . . n (2) F = (Xi + F(Xi = 0)) (Xi’ + F(Xi = 1)) ∀ i = 1,2,3, . . . n F(Xi = 0) F(Xi = 1) 0 1 Xi F ELEC 7770: Advanced VLSI Design (Agrawal)

  39. Expansion About Two Inputs F = XiXj F(Xi = 1, Xj = 1) + XiXj’ F(Xi = 1, Xj = 0) + Xi’Xj F(Xi = 0, Xj = 1) + Xi’Xj’ F(Xi = 0, Xj = 0) In general, a Boolean function can be expanded about any number of input variables. Expansion about k variables will have 2k terms. ELEC 7770: Advanced VLSI Design (Agrawal)

  40. Binary Decision Tree a c b a 1 0 f b b 0 0 1 1 c c c c 0 0 1 1 0 1 1 0 Graph representation of a Boolean function. 0 0 1 0 0 1 1 1 Leaf nodes ELEC 7770: Advanced VLSI Design (Agrawal)

  41. Binary Decision Diagrams • Binary decision diagram (BDD) is a graph representation of a Boolean function, directly derivable from Shannon’s expansion. • References: • C. Y. Lee, “Representation of Switching Circuits by Binary Decision Diagrams,” Bell Syst. Tech J., vol. 38, pp. 985-999, July 1959. • S. Akers, “Binary Decision Diagrams,” IEEE Trans. Computers, vol. C-27, no. 6, pp. 509-516, June 1978. • Ordered BDD (OBDD) and Reduced Order BDD (ROBDD). • Reference: • R. E. Bryant, “Graph-Based Algorithms for Boolean Function Manipulation,” IEEE Trans. Computers, vol. C-35, no. 8, pp. 677-691, August 1986. ELEC 7770: Advanced VLSI Design (Agrawal)

  42. Binary Decision Diagram • BDD of an n-variable Boolean function is a tree: • Root node is any input variable. • All nodes in a level are labeled by the same input variable. • Each node has two outgoing edges, labeled as 0 and 1 indicating the state of the node variable. • Leaf nodes carry fixed 0 and 1 labels. • Levels from root to leaf nodes represent an ordering of input variables. • If we trace a path from the root to any leaf, the label of the leaf gives the value of the Boolean function when inputs are assigned the values from the path. ELEC 7770: Advanced VLSI Design (Agrawal)

  43. Ordered Binary Decision Diagram (OBDD) a c b a 1 0 f b b 0 1 a 1 c c 0 0 1 0 1 0 1 b b 0 1 0 1 1 0 1 0 0 1 c c c c 0 1 0 1 1 0 0 1 0 0 1 0 0 1 1 1 OBDD Tree ELEC 7770: Advanced VLSI Design (Agrawal)

  44. OBDD With Different Input Ordering a c b f c a 1 1 0 0 b b b b 1 0 0 1 a a 1 c c 1 0 0 0 1 0 0 1 0 1 1 0 1 0 1 0 1 1 0 1 0 0 1 ELEC 7770: Advanced VLSI Design (Agrawal)

  45. Evaluating Function from OBDD x 0 1 low high Start at leaf nodes and work toward the root – leaf node functions are 0 and 1. Function at a node with variable x is f = x’.f(low) + x.f(high) ELEC 7770: Advanced VLSI Design (Agrawal)

  46. Cannot Compare Two Circuits a c b a c b f f c c 1 0 0 1 b b b 1 0 a a a 1 1 0 0 0 1 0 1 0 1 0 1 0 1 0 1 0 1 0 1 ELEC 7770: Advanced VLSI Design (Agrawal)

  47. OBDD Graph Isomorphism • Two OBDDs are isomorphic if there is one-to-one mapping between the vertex sets with respect to adjacency, labels and leaf values. • Two isomorphic OBDDs represent the same function. • Two identical circuits may not have identical OBDDs even when same variable ordering is used. • Comparison is possible if: • Same variable ordering is used. • Any redundancies in graphs are removed. ELEC 7770: Advanced VLSI Design (Agrawal)

  48. Reduced Ordered BDD (ROBDD) * Properties common to OBDD. Directed acyclic graph (DAG) (*). Contains just two leaf nodes labeled 0 and 1. Variables are indexed, 1, 2, . . . n, such that the index of a node is greater than that of its child (*). A node has exactly two child nodes, low and high such that low ≠ high. Graph contains no pair of nodes such that subgraphs rooted in them are isomorphic. ELEC 7770: Advanced VLSI Design (Agrawal)

  49. ROBDDs a c b a c b f f c c 0 0 1 1 b b Isomorphic graphs 1 1 a a 0 0 1 1 0 0 0 1 0 1 ELEC 7770: Advanced VLSI Design (Agrawal)

  50. Reduction: OBDD to ROBDD a c b f a a 1 0 0 1 b b b b 1 0 0 1 0 1 c c 1 c c 0 0 0 0 1 0 1 1 1 0 1 1 0 1 0 0 1 ELEC 7770: Advanced VLSI Design (Agrawal)

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