Skip to main navigation
Skip to search
Skip to main content
Experts@Minnesota Home
Home
Profiles
Research units
University Assets
Projects and Grants
Research output
Press/Media
Datasets
Activities
Fellowships, Honors, and Prizes
Search by expertise, name or affiliation
A nonlinear Hamiltonian structure for the Euler equations
Peter J. Olver
Mathematics
Research output
:
Contribution to journal
›
Article
›
peer-review
77
Scopus citations
Overview
Fingerprint
Fingerprint
Dive into the research topics of 'A nonlinear Hamiltonian structure for the Euler equations'. Together they form a unique fingerprint.
Sort by
Weight
Alphabetically
Mathematics
Hamiltonian Structure
97%
Vorticity
82%
Euler Equations
77%
Conservation Laws
75%
Soliton-like Solutions
56%
Helicity
55%
Surface integral
49%
Angular Momentum
47%
Incompressible Flow
42%
Symmetry Group
41%
Conservation
40%
Fluid Flow
39%
Incompressible Fluid
38%
Three-dimension
38%
Operator
37%
Two Dimensions
35%
Invariance
35%
Energy
27%
Invariant
22%
Engineering & Materials Science
Euler equations
100%
Hamiltonians
96%
Conservation
78%
Vorticity
61%
Mathematical operators
49%
Solitons
38%
Angular momentum
35%
Invariance
28%
Flow of fluids
24%