Graph isomorphism and volumes of convex bodies

Abstract

We show that a nontrivial graph isomorphism problem of two undirected graphs, and more generally, the permutation similarity of two given n× n matrices, is equivalent to equalities of volumes of the induced three convex bounded polytopes intersected with a given sequence of balls, centered at the origin with radii ti∈ (0,n-1), where \ti\ is an increasing sequence converging to n-1. These polytopes are characterized by n2 inequalities in at most n2 variables. The existence of fpras for computing volumes of convex bodies gives rise to a semi-frpas of order O*(n14) at most to find if given two undirected graphs are isomorphic.