Chambered invariants of real Cauchy-Riemann operators

Abstract

Motivated by counting pseudo-holomorphic curves in symplectic Calabi-Yau 3-folds, this article studies a chamber structure in the space of real Cauchy-Riemann operators on a Riemann surface, and constructs three chambered invariants associated with such operators: nBl, n1,2, n2,1. The first of these invariants is defined by counting pseudo-holomorphic sections of bundles whose fibres are modeled on the blow-up of C2/\ 1\. The other two are defined by counting solutions to the ADHM vortex equations. We conjecture that n1,2 and n2,1 are related to putative symplectic invariants generalizing the Pandharipande-Thomas and rank 2 Donaldson-Thomas invariants in algebraic geometry.

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