Checking Tests for Read-Once Functions over Arbitrary Bases
Abstract
A Boolean function is called read-once over a basis B if it can be expressed by a formula over B where no variable appears more than once. A checking test for a read-once function f over B depending on all its variables is a set of input vectors distinguishing f from all other read-once functions of the same variables. We show that every read-once function f over B has a checking test containing O(n^l) vectors, where n is the number of relevant variables of f and l is the largest arity of functions in B. For some functions, this bound cannot be improved by more than a constant factor. The employed technique involves reconstructing f from its l-variable projections and provides a stronger form of Kuznetsov's classic theorem on read-once representations.
Keywords
Cite
@article{arxiv.1203.0631,
title = {Checking Tests for Read-Once Functions over Arbitrary Bases},
author = {Dmitry V. Chistikov},
journal= {arXiv preprint arXiv:1203.0631},
year = {2012}
}
Comments
Accepted to the 7th International Computer Science Symposium in Russia (CSR 2012), revised version