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Correlation Functions of the Pfaffian Schur Process Using Macdonald Difference Operators

Published 16 May 2017 in math.PR, math-ph, math.CO, and math.MP | (1705.05859v4)

Abstract: We study the correlation functions of the Pfaffian Schur process. Borodin and Rains [J. Stat. Phys. 121 (2005), 291-317] introduced the Pfaffian Schur process and derived its correlation functions using a Pfaffian analogue of the Eynard-Mehta theorem. We present here an alternative derivation of the correlation functions using Macdonald difference operators.

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