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An Energy Approach to Uniqueness for Higher-Order Geometric Flows
Brett Kotschwar
Mathematical and Statistical Sciences, School of (SoMSS)
Research output
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Contribution to journal
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Article
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peer-review
6
Scopus citations
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Dive into the research topics of 'An Energy Approach to Uniqueness for Higher-Order Geometric Flows'. Together they form a unique fingerprint.
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Mathematics
Geometric Flows
100%
Curvature Flow
94%
Uniqueness
51%
Higher Order
50%
Energy
47%
Prolongation
28%
Ricci Flow
27%
Fully Nonlinear
26%
Uniqueness of Solutions
25%
Parabolic Systems
25%
Obstruction
23%
Direct Method
23%
Evolution Equation
21%
Tensor
19%
Curvature
18%
Alternatives
14%
Class
13%