Y-Formalism and Curved Beta-Gamma Systems

Pietro Antonio Grassi; Ichiro Oda; and Mario Tonin

arXiv:0803.0236·hep-th·November 26, 2008

Y-Formalism and Curved Beta-Gamma Systems

Pietro Antonio Grassi, Ichiro Oda, and Mario Tonin

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TL;DR

This paper applies the Y-formalism to analyze beta-gamma systems on hypersurfaces, focusing on operator product expansions and applications to Calabi-Yau models, advancing understanding of these complex geometric systems.

Contribution

It introduces the use of Y-formalism for beta-gamma systems on hypersurfaces and explores its applications to Calabi-Yau spaces, providing new computational tools.

Findings

01

Computed operator product expansions of gauge-invariant currents.

02

Demonstrated applications of Y-formalism to Calabi-Yau models.

03

Enhanced understanding of beta-gamma systems on complex geometries.

Abstract

We adopt the Y-formalism to study beta-gamma systems on hypersurfaces. We compute the operator product expansions of gauge-invariant currents and we discuss some applications of the Y-formalism to model on Calabi-Yau spaces.

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