Reduced invariants from cuspidal maps

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Title: Reduced invariants from cuspidal maps
Authors: Manolache, C
Battistella, L
Carocci, F
Item Type: Working Paper
Abstract: We consider genus 1 enumerative invariants arising from the Smyth-Viscardi moduli space of stable maps from curves with nodes and cusps. We prove that these invariants are equal to the Vakil-Zinger reduced invariants for the quintic threefold, providing a modular interpretation of the latter.
Issue Date: 23-Jan-2018
Sponsor/Funder: The Royal Society
The Royal Society
Funder's Grant Number: DH130106
Open Access location:
Appears in Collections:Pure Mathematics

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