Description
Constrained Willmore Surfaces provides a comprehensive examination of Willmore surfaces under various geometric constraints, focusing on their role in Möbius invariant integrable systems. The book delves into the sophisticated mathematical structures underlying these geometric objects and their symmetry properties.
Authored by Áurea Casinhas Quintino, this volume combines classical differential geometry with modern integrable systems theory. It explores how Möbius transformations preserve the Willmore functional and how these invariances lead to powerful techniques for constructing and classifying solutions. The text is essential for researchers in differential geometry, integrable systems, and mathematical physics.
Part of the London Mathematical Society Lecture Note Series, this work represents significant contributions to understanding geometric variational problems. It will appeal to graduate students and specialists interested in the intersection of geometry, analysis, and mathematical physics.
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