The tropical invariant and the $F$-invariant in cluster algebras

Peigen Cao (USTC Hefei)

Mon Feb 9, 13:00-14:00 (5 months ago)

Abstract: The Lambda-invariant and the d-invariant are two integer-valued invariants introduced by Kang-Kashiwara-Kim-Oh and by Kashiwara-Kim-Oh-Park in their study of monoidal categorification of cluster algebras using finite-dimensional modules over quiver Hecke algebras and quantum affine algebras. The Lambda-invariant can be viewed as a monoidal categorification of the compatible Poisson structure on those cluster algebras. The d-invariant is defined as half the symmetrized sum of Lambda-invariants, and it can be used to characterize the strong commutativity between real simples.

In this talk, we introduce the tropical invariant and the F-invariant in cluster algebras. The tropical invariant is defined for any cluster algebra with a compatible Poisson structure and it generalizes the Lambda-invariant. The F-invariant is defined as the symmetrized sum of the tropical invariants and it simultaneously generalizes all of the following invariants: the d-invariant, Derksen-Weyman-Zelevinsky’s E-invariant, Fu-Gyoda’s f-compatibility degree, Fomin-Zelevinsky’s compatibility degree, and Qiu-Zhou’s f-intersection number on marked surfaces.

This talk will take place on Zoom only.

K-theory and homologyquantum algebrarings and algebrasrepresentation theory

Audience: researchers in the topic


Paris algebra seminar

Series comments: For the Zoom links and passwords, please subscribe to the mailing list (link and password will be emailed shortly before each talk) or contact one of the organizers. The slides and notes are available here. For recordings of talks, please contact Bernhard Keller.

Organizers: Bernhard Keller*, David Hernandez, Sophie Morier-Genoud
*contact for this listing

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