Rationality of cohomological descendent series for Quot schemes on surfaces with pg=0

Abstract

For a smooth projective surface S, Johnson--Oprea--Pandharipande defined cohomological descendent generating series for Quot schemes of rank-0 quotients of S N. We prove rationality of these series in the remaining cohomological surface case \[ pg(S)=0, β≠ 0, N>1. \] The wall-crossing part of the proof starts from Joyce-style generalized Donaldson--Thomas invariant classes of H-Gieseker semistable one-dimensional sheaves. We vary a single real parameter in the fixed-source Pairs stability condition and obtain the large-c stable-pair chamber for maps S N F. We then compare this pair chamber with the open pure Quot locus, meaning the locus inside the Quot scheme whose target quotient is pure one-dimensional, and then with the full Quot scheme, where zero-dimensional torsion in the target is allowed. The first comparison records the zero-dimensional cokernel of the image of a pair. After decomposing the pure Quot locus into locally-closed pieces on which the scheme-theoretic support curve is flat over the base, this comparison is identified with relative Quot theory on those support curves. The resulting curve-Quot contributions factor into smooth-normalization contributions and finitely many punctual factors at singular points of the support curve. The second comparison records the maximal zero-dimensional torsion subsheaf of a Quot target; locally it becomes a punctual Quot problem over the completed smooth surface ring [[x,y]], and its contribution is the universal punctual smooth-surface factor.