The Cauchy problem for gradient generalized Ricci solitons on a bundle gerbe
Published: Oct 29, 2025
Last Updated: Oct 29, 2025
Authors:Severin Bunk, Miguel Pino, C. S. Shahbazi
Abstract
We prove well-posedness of the analytic Cauchy problem for gradient generalized Ricci solitons on an abelian bundle gerbe and solve the initial data equations on every compact Riemann surface. Along the way, we provide a novel characterization of the self-similar solutions of the generalized Ricci flow by means of families of automorphisms of the underlying abelian bundle gerbe covering families of diffeomorphisms isotopic to the identity.