Classical Computation of Number of Lines in Projective Hypersurfaces:   Origin of Mirror Transformation

Masao Jinzenji (Hokkaido University; Math. Dept.)

arXiv:1201.5717·math.AG·January 30, 2012·1 cites

Classical Computation of Number of Lines in Projective Hypersurfaces: Origin of Mirror Transformation

Masao Jinzenji (Hokkaido University, Math. Dept.)

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TL;DR

This paper explores the classical derivation of residue integral formulas for rational Gromov-Witten invariants of projective hypersurfaces, shedding light on their connection to mirror transformations.

Contribution

It provides a classical derivation of residue integral representations for Gromov-Witten invariants, linking them to the origin of mirror transformations.

Findings

01

Residue integral representation derived from localization techniques.

02

Connection established between classical computations and mirror symmetry.

03

Insights into the origin of mirror transformations in algebraic geometry.

Abstract

In this paper, we discuss classical derivation of the residue integral representation of the d=1 rational Gromov-Witten invariants of projective hypersurfaces that followed from localization technique.

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Taxonomy

TopicsMathematics and Applications · Algebraic Geometry and Number Theory · Polynomial and algebraic computation