Relative stable pairs and a non-Calabi-Yau wall crossing

Abstract

Let Y be a smooth projective threefold and let f:Y X be a birational map with Rf*OY=OX. When Y is Calabi-Yau, Bryan-Steinberg defined enumerative invariants associated to such maps called f-relative stable (or Bryan-Steinberg) invariants. When X has Gorenstein singularities and f has relative dimension one, they compared these invariants to the Donaldson-Thomas, or equivalently the Pandharipande-Thomas invariants of Y. We define Bryan-Steinberg invariants for maps f as above without assuming that Y is Calabi-Yau. For X with Gorenstein and rational singularities, f of relative dimension one, and for insertions from X and arbitrary descendant levels, we conjecture a relation between the generating functions of Bryan-Steinberg and Pandharipande-Thomas invariants of Y. We check the conjecture for the contraction f: Y X of a rational curve C with normal bundle NC/Y OC(-1) 2 using degeneration and localization techniques to reduce to a Calabi-Yau situation, which we then treat using Joyce's motivic Hall algebra.

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