On the complexity of isomorphism problems for tensors, groups, and polynomials IV: linear-length reductions and their applications

Abstract

Many isomorphism problems for tensors, groups, algebras, and polynomials were recently shown to be equivalent to one another under polynomial-time reductions, prompting the introduction of the complexity class TI (Grochow & Qiao, ITCS '21; SIAM J. Comp., '23). Using the tensorial viewpoint, Grochow & Qiao (CCC '21) then gave moderately exponential-time search- and counting-to-decision reductions for a class of p-groups. A significant issue was that the reductions usually incurred a quadratic increase in the length of the tensors involved. When the tensors represent p-groups, this corresponds to an increase in the order of the group of the form |G|( |G|), negating any asymptotic gains in the Cayley table model. In this paper, we present a new kind of tensor gadget that allows us to replace those quadratic-length reductions with linear-length ones, yielding the following consequences: 1. If Graph Isomorphism is in P, then testing equivalence of cubic forms in n variables over Fq, and testing isomorphism of n-dimensional algebras over Fq, can both be solved in time qO(n), improving from the brute-force upper bound qO(n2) for both of these. 2. Combined with the |G|O(( |G|)5/6)-time isomorphism-test for p-groups of class 2 and exponent p (Sun, STOC '23), our reductions extend this runtime to p-groups of class c and exponent p where c<p, and yield algorithms in time qO(n1.8· q) for cubic form equivalence and algebra isomorphism. 3. Polynomial-time search- and counting-to-decision reduction for testing isomorphism of p-groups of class 2 and exponent p when Cayley tables are given. This answers questions of Arvind and T\'oran (Bull. EATCS, 2005) for this group class, thought to be one of the hardest cases of Group Isomorphism.