Stillman's question for twisted commutative algebras

Abstract

Let An, m be the polynomial ring Sym(Cn Cm) with the natural action of GLm(C). We construct a family of GLm(C)-stable ideals Jn, m in An, m, each equivariantly generated by one homogeneous polynomial of degree 2. Using the Ananyan-Hochster principle, we show that the regularity of this family is unbounded. This negatively answers a question raised by Erman-Sam-Snowden on a generalization of Stillman's conjecture.