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Symmetric powers of algebraic and tropical curves: A non-Archimedean perspective

https://doi.org/10.1090/btran/113

Brandt, Madeline; Ulirsch, Martin (June 2022, Transactions of the American Mathematical Society, Series B)

We show that the non-Archimedean skeleton of the d d -th symmetric power of a smooth projective algebraic curve X X is naturally isomorphic to the d d -th symmetric power of the tropical curve that arises as the non-Archimedean skeleton of X X . The retraction to the skeleton is precisely the specialization map for divisors. Moreover, we show that the process of tropicalization naturally commutes with the diagonal morphisms and the Abel-Jacobi map and we exhibit a faithful tropicalization for symmetric powers of curves. Finally, we prove a version of the Bieri-Groves Theorem that allows us, under certain tropical genericity assumptions, to deduce a new tropical Riemann-Roch-Theorem for the tropicalization of linear systems.
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Divisorial Motivic Zeta Functions for Marked Stable Curves

https://doi.org/10.1307/mmj/20195792

Brandt, Madeline; Ulirsch, Martin (May 2022, Michigan Mathematical Journal)

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A MODULI STACK OF TROPICAL CURVES

https://doi.org/10.1017/fms.2020.16

CAVALIERI, RENZO; CHAN, MELODY; ULIRSCH, MARTIN; WISE, JONATHAN (January 2020, Forum of Mathematics, Sigma)

We contribute to the foundations of tropical geometry with a view toward formulating tropical moduli problems, and with the moduli space of curves as our main example. We propose a moduli functor for the moduli space of curves and show that it is representable by a geometric stack over the category of rational polyhedral cones. In this framework, the natural forgetful morphisms between moduli spaces of curves with marked points function as universal curves. Our approach to tropical geometry permits tropical moduli problems—moduli of curves or otherwise—to be extended to logarithmic schemes. We use this to construct a smooth tropicalization morphism from the moduli space of algebraic curves to the moduli space of tropical curves, and we show that this morphism commutes with all of the tautological morphisms.
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Skeletons and Fans of Logarithmic Structures

https://doi.org/10.1007/978-3-319-30945-3

Abramovich, Dan; Chen, Qile; Marcus, Steffen; Ulirsch, Martin; Wise, Jonathan (January 2016, Nonarchimedean and Tropical Geometry)

We survey a collection of closely related methods for generalizing fans of toric varieties, include skeletons, Kato fans, Artin fans, and polyhedral cone complexes, all of which apply in the wider context of logarithmic geometry. Under appropriate assumptions these structures are equivalent, but their different realizations have provided for surprisingly disparate uses. We highlight several current applications and suggest some future possibilities.
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