There Are No Post-Quantum Weakly Pseudo-Free Families in Any Nontrivial Variety of Expanded Groups

Abstract

Let be a finite set of finitary operation symbols and let V be a nontrivial variety of -algebras. Assume that for some set ⊂eq of group operation symbols, all -algebras in V are groups under the operations associated with the symbols in . In other words, V is assumed to be a nontrivial variety of expanded groups. In particular, V can be a nontrivial variety of groups or rings. Our main result is that there are no post-quantum weakly pseudo-free families in V, even in the worst-case setting and/or the black-box model. In this paper, we restrict ourselves to families (Hd|d∈ D) of computational and black-box -algebras (where D⊂eq\0,1\*) such that for every d∈ D, each element of Hd is represented by a unique bit string of length polynomial in the length of d. In our main result, we use straight-line programs to represent nontrivial relations between elements of -algebras. Note that under certain conditions, this result depends on the classification of finite simple groups. Also, we define and study some types of weak pseudo-freeness for families of computational and black-box -algebras.