Functional Equations and the Generalised Elliptic Genus

H.W. Braden; K.E. Feldman

arXiv:math-ph/0501011·math-ph·June 26, 2015

Functional Equations and the Generalised Elliptic Genus

H.W. Braden, K.E. Feldman

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TL;DR

This paper introduces a new derivation and characterization of the generalized elliptic genus of Krichever-Höhn using a functional equation approach, providing deeper theoretical understanding.

Contribution

It presents a novel derivation and characterization method for the generalized elliptic genus based on functional equations, advancing the theoretical framework.

Findings

01

New derivation of the generalized elliptic genus

02

Characterization of the genus via functional equations

03

Enhanced understanding of elliptic genus structure

Abstract

We give a new derivation and characterisation of the generalised elliptic genus of Krichever-H\"ohn by means of a functional equation.

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