The one-step Shafarevich gap in embedding dimension five

Abstract

Let k be an algebraically closed field of characteristic zero and let S=k[x1,…,x5] with maximal ideal m=(x1,…,x5). For a codimension-r subspace Q⊂ S2, set IQ=(Q)+ m3. Then S/IQ has Hilbert function (1,5,r). We prove that the translated one-step locus defined by these ideals is contained in the smoothable component for every r∈6,7,…,15. We introduce a finite field differential rank certificate proving dominance, for 6 r 14, of the Erman--Velasco map GL*5× ( A5)r Gr(r,Sym2 k5), (g,a(1),…,a(r)) g· q(a(1)),…,q(a(r)), where q(a)=Σ*i=15 ai yi2-(Σi=15 ai yi)2. The endpoint r=15 is handled separately by a flat degeneration of 21 general reduced points to the fat point defined by m3. Combined with the known small cases and with the known elementary components for r=3 and r=5, this gives the complete one-step classification in embedding dimension five: the one-step loci with Hilbert function (1,5,r) are smoothable for all r≠ 3,5, and the cases r=3,5 are precisely the generically reduced elementary component cases. In this sense the one-step Shafarevich gap in embedding dimension five is completely resolved.