For two naturals such that , we show how to construct a circuit C with m inputs and n outputs, that has the following property: for some , the circuit defines a k-universal function. This means, informally, that for every subset K of k outputs, every possible valuation of the variables in K is reachable.
Now consider a circuit M with n inputs that we wish to model-check. Connecting the inputs of M to the outputs of C gives us a new circuit with m inputs, that its original inputs have freedom defined by k. This is a very attractive feature for underapproximation in model-checking: on one hand the combined circuit has a smaller number of inputs, and on the other hand it is expected to find an error state fast if there is one.
We show a random construction of a k-universal circuit that guarantees that k is very close to m, with an arbitrarily high probability. We also present a deterministic construction of such a circuit, but here the value of k is smaller with respect to a fixed value of m. We report initial experimental results with bounded model checking of industrial designs (the method is equally applicable to unbounded model checking and to simulation), which shows mixed results. An interesting observation, however, is that in 13 out of 17 designs, setting m to be is sufficient to detect the bug. This is in contrast to other underapproximation techniques that are based on reducing the number of inputs, which in most cases cannot detect the bug even with .
