AbstractImportant complementary extremum principles are generated without recourse to general variational theory. The results are illustrated by an application to a class of boundary value problems in Magnetohydrodynamics
Variational principles in classical fluid mechanics and electromagnetism have sprinkled the literatu...
The complementary variational problem is studied for thin elastic shells undergoing large deflection...
In this work we extend our previously developed formalism of Newtonian multi-fluid hydrodynamics to ...
Important complementary extremum principles are generated without recourse to general variational th...
AbstractThis paper presents variational and extremum principles for pairs of coupled linear equation...
AbstractError bounds for a wide class of linear and nonlinear boundary value problems are derived fr...
AbstractThis paper presents a useful alternative to the classical complementary variational principl...
AbstractA variational principle for a class of Hamiltonian boundary value problems is formulated. Co...
AbstractThe relationship between the complementary variational principle and duality in mathematical...
AbstractThe canonical Euler-Hamilton theory is used to establish the connection between extremum pri...
Variational expressions and saddle-point (or "mini-max") principles for linear problems in electroma...
AbstractVariational principles associated with Komkov's class of boundary value problems are discuss...
ADSTRACT. This paper deals with magnetohydrodynamic channel flow problems. Attention is given to a v...
Here we are going to formulate and prove variational extremum principle for electrodynamics, asserti...
Variational principle for calculating velocity profile and electric potential distribution in magnet...
Variational principles in classical fluid mechanics and electromagnetism have sprinkled the literatu...
The complementary variational problem is studied for thin elastic shells undergoing large deflection...
In this work we extend our previously developed formalism of Newtonian multi-fluid hydrodynamics to ...
Important complementary extremum principles are generated without recourse to general variational th...
AbstractThis paper presents variational and extremum principles for pairs of coupled linear equation...
AbstractError bounds for a wide class of linear and nonlinear boundary value problems are derived fr...
AbstractThis paper presents a useful alternative to the classical complementary variational principl...
AbstractA variational principle for a class of Hamiltonian boundary value problems is formulated. Co...
AbstractThe relationship between the complementary variational principle and duality in mathematical...
AbstractThe canonical Euler-Hamilton theory is used to establish the connection between extremum pri...
Variational expressions and saddle-point (or "mini-max") principles for linear problems in electroma...
AbstractVariational principles associated with Komkov's class of boundary value problems are discuss...
ADSTRACT. This paper deals with magnetohydrodynamic channel flow problems. Attention is given to a v...
Here we are going to formulate and prove variational extremum principle for electrodynamics, asserti...
Variational principle for calculating velocity profile and electric potential distribution in magnet...
Variational principles in classical fluid mechanics and electromagnetism have sprinkled the literatu...
The complementary variational problem is studied for thin elastic shells undergoing large deflection...
In this work we extend our previously developed formalism of Newtonian multi-fluid hydrodynamics to ...
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