Open Access. Powered by Scholars. Published by Universities.®
- Institution
- Keyword
-
- Applied Mathematics (2)
- Algebraic scattering (1)
- Amplitude (1)
- Asymptotic conservation laws (1)
- Classical field theory (1)
-
- Deformations (1)
- Droplet oscillations (1)
- Free surface (1)
- Frequency (1)
- GKdV equation (1)
- Gravity waves (1)
- Hydrodynamics (1)
- KdV equation (1)
- Nonlinear algebra (1)
- Nonlinear deformation (1)
- Nonlinear waves (1)
- Nonlinearity and Solitons (1)
- Quantum algebra (1)
- Quantum groups (1)
- S matrix (1)
- Shallow water (1)
- Solitons (1)
- Publication
- Publication Type
Articles 1 - 7 of 7
Full-Text Articles in Physics
Music And Mathematics, Roxanne Kitts
Music And Mathematics, Roxanne Kitts
Humanistic Mathematics Network Journal
No abstract provided.
Droplet Evaporation And Deformations In An Amplitude Modulated Ultrasonic Field, Nihad E. Daidzic, Rene Stadler, Adrian Melling
Droplet Evaporation And Deformations In An Amplitude Modulated Ultrasonic Field, Nihad E. Daidzic, Rene Stadler, Adrian Melling
Aviation Department Publications
The aim of the report presented is the measurements of droplet oscillations.
Stability Analysis Of A Model For The Defect Structure Of Yba2cu3ox, Gregory Kozlowski, Tom Svobodny
Stability Analysis Of A Model For The Defect Structure Of Yba2cu3ox, Gregory Kozlowski, Tom Svobodny
Physics Faculty Publications
Unusual microstructures of YBa2Cu3Ox (123) crystals have been observed. These structures have been shown to pass very high transport currents. A model of the solidification of 123 from a melt with Y2BaCuO5 (211) inclusions indicates that the stability of the 123 interface can depend on the sizes of the 211 inclusions. The observed formations are interpreted in the light of this instability.
Nonlinear Deformed Su(2) Algebras Involving Two Deforming Function, Andrei Ludu
Nonlinear Deformed Su(2) Algebras Involving Two Deforming Function, Andrei Ludu
Andrei Ludu
No abstract provided.
Asymptotic Conservation Laws In Classical Field Theory, Ian M. Anderson, Charles G. Torre
Asymptotic Conservation Laws In Classical Field Theory, Ian M. Anderson, Charles G. Torre
Mathematics and Statistics Faculty Publications
A new, general, field theoretic approach to the derivation of asymptotic conservation laws is presented. In this approach asymptotic conservation laws are constructed directly from the field equations according to a universal prescription which does not rely upon the existence of Noether identities or any Lagrangian or Hamiltonian formalisms. The resulting general expressions of the conservation laws enjoy important invariance properties and synthesize all known asymptotic conservation laws, such as the Arnowitt-Deser-Misner energy in general relativity.
Su(1,1) Algebraic Description Of One-Dimensional Potentials Within The R-Matrix Theory, Andrei Ludu
Su(1,1) Algebraic Description Of One-Dimensional Potentials Within The R-Matrix Theory, Andrei Ludu
Andrei Ludu
No abstract provided.
Generalization Kdv Equation For Fluid Dynamics And Quantum Algebras, Andrei Ludu
Generalization Kdv Equation For Fluid Dynamics And Quantum Algebras, Andrei Ludu
Andrei Ludu
No abstract provided.