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A Schur-Horn-Kostant convexity theorem for the diffeomorphism group of the annulus
A. M. Bloch, H. Flaschka, T. Ratiu
Mathematics
Research output
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Article
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peer-review
13
Scopus citations
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Dive into the research topics of 'A Schur-Horn-Kostant convexity theorem for the diffeomorphism group of the annulus'. Together they form a unique fingerprint.
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Mathematics
Adjoints
50%
Cartan Subalgebra
50%
Convex Set
50%
Diffeomorphism
100%
Extreme Points
50%
Group of Diffeomorphisms
100%
Hamiltonian
50%
Hilbert Space
50%
Lie Algebra
50%
Measure Preserving Transformation
50%
Permutation
50%
Semigroup
50%
Unitary Operator
50%
Weakly Compact
50%
Keyphrases
Adjoint Orbit
33%
Area-preserving Diffeomorphisms
33%
Cartan Subalgebra
33%
Convexity Theorem
100%
Diffeomorphism
33%
Diffeomorphism Group
100%
Group Thinking
33%
Lie Algebra
33%
Measure Preserving Transformations
33%
Schur-Horn
100%
Semigroups of Measures
33%
Unitary Operators
33%
Weakly Compact Convex Subset
33%