ACC for F-signature: a likely counterexample
Abstract
Let k=F2 and let 0≠α∈ k. We present a conjecture supported by computer experimentation involving the Brenner-Monsky quartic gα=α x2y2+z4+xyz2+(x3+y3)z∈ k[[x,y,z]]. If true, this conjecture provides a formula for the Hilbert-Kunz multiplicity and F-signature of the family of four-dimensional hypersurfaces defined by uv+gα∈ k[[x,y,z,u,v]] which depends on [F2(α):F2], giving an infinite increasing chain of strict inequalities of F-signatures. Additionally, we obtain for any t∈N a formula for the Hilbert-Kunz multiplicity and F-signature of the t-parameter family of 3t+1-dimensional hypersurfaces defined by uv+Σi=1t gαi(xi,yi,zi).
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