Probabilistic verification of Boolean functions

Abstract

We present a novel method for verifying the equivalence of two Boolean functions. Each function is hashed to an integer code by assigning random integer values to the input variables and evaluating an integer-valued transformation of the original function. The hash codes for two equivalent functions are always equal. Thus the equivalence of two functions can be verified with a very low probability of error, which arises from unlikely “collisions” between inequivalent functions. An upper bound, ∈, on the probability of error is known a priori. The bound can be decreased exponentially by making multiple runs. Results indicate significant time and space advantages for this method over techniques that represent each function as a single OBDD. Some functions known to require space (and time) exponential in the number of input variables for these techniques require only polynomial resources using our method. Experimental results indicate that probabilistic verification can provide an attractive alternative for verifying functions too large to be handled using these OBDD-based techniques.