Constrained Willmore surfaces: Symmetries of a Möbius invariant integrable system

Research output: Book/ReportBookpeer-review

Abstract

From Bäcklund to Darboux, this monograph presents a comprehensive journey through the transformation theory of constrained Willmore surfaces, a topic of great importance in modern differential geometry and, in particular, in the field of integrable systems in Riemannian geometry. The first book on this topic, it discusses in detail a spectral deformation, Bäcklund transformations and Darboux transformations, and proves that all these transformations preserve the existence of a conserved quantity, defining, in particular, transformations within the class of constant mean curvature surfaces in 3-dimensional space-forms, with, furthermore, preservation of both the space-form and the mean curvature, and bridging the gap between different approaches to the subject, classical and modern. Clearly written with extensive references, chapter introductions and self-contained accounts of the core topics, it is suitable for newcomers to the theory of constrained Wilmore surfaces. Many detailed computations and new results unavailable elsewhere in the literature make it also an appealing reference for experts.
Original languageEnglish
PublisherCambridge University Press
Number of pages250
ISBN (Print)9781108794428
Publication statusPublished - 31 May 2021

Publication series

NameLondon Mathematical Society Lecture Note Series
PublisherCambridge University Press
No.465

Fingerprint Dive into the research topics of 'Constrained Willmore surfaces: Symmetries of a Möbius invariant integrable system'. Together they form a unique fingerprint.

Cite this