Using Partial Implications for Redundancy Identification and Fault Equivalence

Using Partial Implications for Redundancy Identification and Fault Equivalence Vishwani D. Agrawal Agere Systems, Murray Hill, New Jersey va@agere.com http://cm.bell-labs.com/cm/cs/who/va Partial Implications, etc.

Talk Outline • Problem statement • Background • Implication graph • Partial implications • Transitive closure • Redundancy identification • A new method for fault equivalence • Conclusion Partial Implications, etc.

Problem Statement • Many problems can be solved by implication graphs and transitive closure. • We will study two problems: • Redundancy identification • Fault equivalence Partial Implications, etc.

Background • Implication graphs: • Chakradhar, et al., Book’90 • Larrabee, IEEE-TCAD’92 • Transitive closure: • ATPG: Chakradhar, et al., IEEE-TCAD’93 • Redundancy, Agrawal, et al., ATS’96 • Partial implications: • Henftling, et al., EDAC’95 • Gaur, et al., DELTA’02, Gaur, MS Thesis’02 • Fault equivalence: • Bushnell and Agrawal, Book’00 Partial Implications, etc.

Implication graph An implication graph is a representation of logical implications between pairs of signals of a digital circuit. • Nodes • Two nodes per signal; nodes a and a correspond to signal a. • A node has two states (true,false); represents the signal state. • Edges • A directed edge from node a to b means “a=1” implies “b=1”. Partial Implications, etc.

Building an Implication Graph • If C is ‘1’ then that implies that A and B must be ‘1’, but the reverse is not true. Similarly, if either AorB is ‘0’ then C will be ‘0’. But if we want to represent the implications of AandB on C then partial implications are necessary. A B B C A C AB + C = 0 A B C AC + BC + ABC = 0 Partial Implications, etc.

Partial Implications A B B C A C AB + C = 0 A B C AC + BC + ABC = 0 Reference: Henftling, et al., EDAC, 1995 Partial Implications, etc.

Observability Variables Observability variable of a signal represents whether or not that signal is observable at a PO. It can be true or false. OA OC = 1 OC A B OA C B (PO) OB OCB + OA = 0 OCOA + BOA + OCBOA = 0 Partial Implications, etc.

Adding Observability Variables to Implication Graph OC OA OCOA + BOA + OCBOA = 0 B OA OC B C A OC OA A B C OBcan be added similarly. Partial Implications, etc.

Transitive Closure • Transitive closure of a directed graph contains the same set of nodes as the original graph. • If there is a directed path from node a to b, then the transitive closure contains an edge from a to b. a b b a c d c d Transitive closure A graph Partial Implications, etc.

Stuck-at Faults • This is a type of fault, which causes a line to hold a constant logic value, irrespective of change of state at previous stages. • There are two types of stuck-at-faults: • Stuck-at-1 • Stuck-at-0 • Detection of a fault requires the fault to be activated and its effect observable at a PO. • Fault a s-a-1 is detectable, iff following conditions can be simultaneously satisfied: • a = 0 • Oa = 1 Partial Implications, etc.

Redundant Faults • A fault that has no test is called an untestable fault. • Any untestable fault in a combinational circuit is a redundant fault because it does not cause any change in the input/output logic function of the circuit. • Identification of redundant faults is useful because they can be removed • from testing consideration, or • from hardware Partial Implications, etc.

Redundancy Identification • ATPG based method • It uses exhaustive test pattern generation to determine whether or not a target fault has a test. • All redundant faults can be found, but the ATPG cost is high (exponential in circuit size). • Fault independent method • This method analyzes circuit topology and function locally without targeting a specific fault. • Many (not all) redundant faults can be found at a lower cost. Partial Implications, etc.

Redundancy Identification by Transitive Closure b c d a c a s-a-0 e s-a-0 b Od Oc d Circuit with two redundant faults Implication graph (some nodes and edges not shown) Implication Partial implication Transitive closure edge Partial Implications, etc.

Method Summarized • Obtain an implication graph from the circuit topology and compute transitive closure. • Examine all nodes: • S-a-0 is redundant if the signal implies its complement. • S-a-1 is redundant if the complement of the signal implies the signal. • Both faults are redundant if the signal and its complement imply each other. • S-a-0 is redundant if the signal implies its false observability variable. • S-a-1 is redundant if the complement of the signal implies its false observability variable. • S-a-0 is redundant if the observability variable implies the complement of the signal. • S-a-1 is redundant if the observability variable implies the signal. • Both faults are redundant if the observability variable and its complement imply each other. Partial Implications, etc.

Circuit Total red. +aborted faults* Tot. red. faults ident. Unexcit-able red. faults Unpropag-atable red. faults Undriv-able red. faults C1908 6+3 2 0 0 2 C2670 99+18 23+2 3 3 17+2 C3540 99+40 74 0 8 66 C5315 59 32 1 1 30 C6288 33 31 15 16 0 C7552 67+76 34 3 0 31 Classification of Redundant Faults by TCAND *HITEC, Nierman and Patel, EDAC’91 Partial Implications, etc.

Complexity of TCAND SUN Sparc 5 Partial Implications, etc.

Limitation of Method • Observability variable of a fanout stem is not analyzed. • Only the redundant faults due to false controllability of fanout stem can be identified. s-a-1 s-a-0 Three redundant s-a-0 faults identified by transitive closure Two redundant stem faults not identified by transitive closure Partial Implications, etc.

Some Conclusions • Partial implications help find more redundant faults than the transitive closure without partial implications. • The results have been compared with FIRE (another fault-independent program), which did equal to or worse that transitive closure with partial implication. • Transitive closure computation run times were linear in the number of nodes for the implication graphs of benchmark circuits, although the known worst-case complexity is O(N3) for N nodes. Partial Implications, etc.

Fault Equivalence • Two faults of a Boolean circuit are called equivalent if they transform the circuit such that the two faulty circuits have identical output functions. • Equivalent faults are indistinguishable and have exactly the same set of tests. • Many fault equivalences can be determined by structural analysis based on gate fault equivalences and circuit interconnects; this is done in practice. • Some fault equivalences require equivalence checking of faulty circuits; too complex and not generally done. Partial Implications, etc.

Gate Fault Equivalence sa1 sa0 sa0 sa1 sa1 sa0 sa1 sa0 sa1 sa0 sa1 sa0 sa0 sa1 sa1 sa0 sa0 sa0 sa0 sa1 sa0 sa1 sa1 sa1 sa1 sa0 Partial Implications, etc.

Sa0 and Sa1 Variables Variable Asa0 assumes a true state when A=1 and OAis true s-a-0 A A B Asa0 C OA Asa1 is similarly defined. Partial Implications, etc.

Equivalence by Imp. Graph s-a-0 s-a-0 A C Asa0 Csa0 B OA OC B C A OC OA A B C Partial Implications, etc.

An Open Question • Can implication graph/transitive closure recognize functional fault equivalence. These are not found by structural analysis. • Example: e = b, for both faults. s-a-1 a e s-a-1 b Partial Implications, etc.

Conclusion • Partial implications improve redundancy identification. • Present limitation of the method is the identification of redundancy due to the false observability of fanout stem; open problem. • New formulation of fault equivalence may find some functional equivalences. Partial Implications, etc.

THANK YOU Partial Implications, etc.

Using Partial Implications for Redundancy Identification and Fault Equivalence