The rank 8 case of a conjecture on square-zero upper triangular matrices

Abstract

Let A be the polynomial algebra in r variables with coefficients in an algebraically closed field k. When the characteristic of k is 2, Carlsson conjectured that any dg-A-module that is free of rank N as an A-module and whose homology is nontrivial and finite dimensional as a k-vector space satisfies N≥ 2r. In this paper, we examine a stronger conjecture concerning varieties of square-zero upper triangular N× N matrices. Stratifying these varieties via Borel orbits, we show that the stronger conjecture holds when N = 8 without any restriction on the characteristic of k. This result also verifies that if X is a product of 3 spheres of any dimensions, then the elementary abelian 2-group of rank 4 cannot act freely on X.