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SPATIAL HAMILTONIAN IDENTITIES for NONLOCALLY COUPLED SYSTEMS
Bente Bakker,
Arnd Scheel
School of Mathematics
Research output
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Contribution to journal
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Article
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peer-review
12
Scopus citations
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Dive into the research topics of 'SPATIAL HAMILTONIAN IDENTITIES for NONLOCALLY COUPLED SYSTEMS'. Together they form a unique fingerprint.
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Keyphrases
Euler-Lagrange Equation
100%
Hamiltonian Identity
100%
Dynamical Systems
50%
Phase Separation
50%
Symplectic Structure
50%
Separation Problem
50%
Finite-dimensional
50%
Center Manifold
50%
Lyapunov Function
50%
Forming System
50%
Hamiltonian Formalism
50%
Calculus
50%
Gradient Flow
50%
Conserved Quantity
50%
Nonlocal Interactions
50%
Noether's Theorem
50%
Field Separation
50%
Neural Fields
50%
Traveling Wave Equations
50%
System of Nonlinear Integro-differential Equations
50%
Hamiltonian Differential Equations
50%
Mathematics
Differential Equation
100%
Euler-Lagrange Equation
100%
Manifold
50%
Dynamical System
50%
Real Line
50%
Wave Equation
50%
Calculus
50%
Noether's Theorem
50%
Nonlinear Integro
50%
Gradient Flow
50%
Traveling Wave
50%