Journal article
Hemisphere partition function and analytic continuation to the conifold point
J Knapp, M Romo, E Scheidegger
Communications in Number Theory and Physics | INT PRESS BOSTON, INC | Published : 2017
Abstract
We show that the hemisphere partition function for certain U(1) gauged linear sigma models (GLSMs) with D-branes is related to a particular set of Mellin-Barnes integrals which can be used for analytic continuation to the singular point in the Kähler moduli space of an h1,1 = 1 Calabi-Yau (CY) projective hypersurface. We directly compute the analytic continuation of the full quantum corrected central charge of a basis of geometric D-branes from the large volume to the singular point. In the mirror language this amounts to compute the analytic continuation of a basis of periods on the mirror CY to the conifold point. However, all calculations are done in the GLSM and we do not have to refer t..
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