A Simple Constructive Bound on Circuit Size Change Under Truth Table Perturbation

Abstract

The observation that optimum circuit size changes by at most O(n) under a one-point truth table perturbation is implicit in prior work on the Minimum Circuit Size Problem. This note states the bound explicitly for arbitrary fixed finite complete bases with unit-cost gates, extends it to general Hamming distance via a telescoping argument, and verifies it exhaustively at n = 4 in the AIG basis using SAT-derived exact circuit sizes for 220 of 222 NPN equivalence classes. Among 987 mutation edges, the maximum observed difference is 4 = n, confirming the bound is tight at n = 4 for AIG.

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