Quadratic Donaldson-Thomas invariants for (P1)3 and some other smooth proper toric threefolds

Abstract

Using virtual localization in Witt sheaf cohomology, we show that the generating series of quadratic Donaldson-Thomas invariants of (P1)3, valued in the Witt ring of R, W(R) Z, is equal to M(q2)-8, where M(q) is the MacMahon function. This confirms a modified version of a conjecture of Viergever. We also show that a localized version of this conjecture holds for certain iterated blow-ups of (P1)3 and other related smooth proper toric varieties.

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