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Main Authors: Cavalieri, Renzo, Markwig, Hannah, Ranganathan, Dhruv
Format: Preprint
Published: 2022
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Online Access:https://arxiv.org/abs/2206.14034
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author Cavalieri, Renzo
Markwig, Hannah
Ranganathan, Dhruv
author_facet Cavalieri, Renzo
Markwig, Hannah
Ranganathan, Dhruv
contents We extract a system of numerical invariants from logarithmic intersection theory on pluricanonical double ramification cycles, and show that these invariants exhibit a number of properties that are enjoyed by double Hurwitz numbers. Among their properties are (i) the numbers can be efficiently calculated by counts of tropical curves with a modified balancing condition, (ii) they are piecewise polynomial in the entries of the ramification vector, and (iii) they are matrix elements of operators on the Fock space. The numbers are extracted from the logarithmic double ramification cycle, which is a lift of the standard double ramification cycle to a blowup of the moduli space of curves. The blowup is determined by tropical geometry. We show that the traditional double Hurwitz numbers are intersections of the refined cycle with the cohomology class of a piecewise polynomial function on the tropical moduli space of curves. This perspective then admits a natural, combinatorially motivated, generalization to the pluricanonical setting. Tropical correspondence results for the new invariants lead immediately to the structural results for these numbers.
format Preprint
id arxiv_https___arxiv_org_abs_2206_14034
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Pluricanonical cycles and tropical covers
Cavalieri, Renzo
Markwig, Hannah
Ranganathan, Dhruv
Algebraic Geometry
We extract a system of numerical invariants from logarithmic intersection theory on pluricanonical double ramification cycles, and show that these invariants exhibit a number of properties that are enjoyed by double Hurwitz numbers. Among their properties are (i) the numbers can be efficiently calculated by counts of tropical curves with a modified balancing condition, (ii) they are piecewise polynomial in the entries of the ramification vector, and (iii) they are matrix elements of operators on the Fock space. The numbers are extracted from the logarithmic double ramification cycle, which is a lift of the standard double ramification cycle to a blowup of the moduli space of curves. The blowup is determined by tropical geometry. We show that the traditional double Hurwitz numbers are intersections of the refined cycle with the cohomology class of a piecewise polynomial function on the tropical moduli space of curves. This perspective then admits a natural, combinatorially motivated, generalization to the pluricanonical setting. Tropical correspondence results for the new invariants lead immediately to the structural results for these numbers.
title Pluricanonical cycles and tropical covers
topic Algebraic Geometry
url https://arxiv.org/abs/2206.14034