On Generalized Pfaffians
Abstract
The determinant of an anti-symmetric matrix g is the square of its Pfaffian, which like the determinant is a polynomial in the entries of g. Studies of certain super conformal field theories (of class S) suggested a conjectural generalization of this, predicting that each of a series of other polynomials in the entries of g also admit polynomial square roots. Among other consequences, this conjecture led to a characterization of the local Hitchin image for type D. Several important special cases had been established previously. In this paper we prove the conjecture in full.
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