AbstractThe equation (A▽4 + B▽2 + C)χ = 0 with matrix coefficients A, B, C is studied for homogeneous boundary conditions. An integral constraint is derived for the above system leading to a relationship between the matrices involved. As a consequence, known as well as unknown results are obtained for some problems of hydrodynamic stability in a unified manner. Finally, another method of unification is suggested
The Liapunov method is extended to a function space with a suitable metric, and is applied to the pr...
The biharmonic equation is encountered in plane problems of elasticity (w is the Airy stress functio...
This paper is concerned with weak solution of a mixed boundary value problem for the biharmonic equa...
AbstractThe equation (A▽4 + B▽2 + C)χ = 0 with matrix coefficients A, B, C is studied for homogeneou...
Abstract. Problems concerning characterization of eigenvalues of some linear and homogenous differen...
The biharmonic equation arises in areas of continuum mechanics, including mechanics of elastic plate...
The compound matrix method, which has been proposed by Ng & Reid for numerically integrating sy...
abstract: The dissipative shallow-water equations (SWE) possess both real-world application and exte...
AbstractWe propose a stabilized finite element method for the approximation of the biharmonic equati...
We propose a stabilized finite element method for the approximation of the biharmonic equation with ...
We solve the inhomogeneous Bessel differential equation and apply this result to obtain a partial s...
We extend the Kreiss–Ma jda theory of stability of hyperbolic initial– boundary-value and shock prob...
In this paper, the error and stability analysis of the method of fundamental solution (MFS) is explo...
A biharmonic equation with an impedance (non standard) boundary condition and more general equations...
The concept of integrable boundary conditions is applied to hydrodynamic type systems. Examples of s...
The Liapunov method is extended to a function space with a suitable metric, and is applied to the pr...
The biharmonic equation is encountered in plane problems of elasticity (w is the Airy stress functio...
This paper is concerned with weak solution of a mixed boundary value problem for the biharmonic equa...
AbstractThe equation (A▽4 + B▽2 + C)χ = 0 with matrix coefficients A, B, C is studied for homogeneou...
Abstract. Problems concerning characterization of eigenvalues of some linear and homogenous differen...
The biharmonic equation arises in areas of continuum mechanics, including mechanics of elastic plate...
The compound matrix method, which has been proposed by Ng & Reid for numerically integrating sy...
abstract: The dissipative shallow-water equations (SWE) possess both real-world application and exte...
AbstractWe propose a stabilized finite element method for the approximation of the biharmonic equati...
We propose a stabilized finite element method for the approximation of the biharmonic equation with ...
We solve the inhomogeneous Bessel differential equation and apply this result to obtain a partial s...
We extend the Kreiss–Ma jda theory of stability of hyperbolic initial– boundary-value and shock prob...
In this paper, the error and stability analysis of the method of fundamental solution (MFS) is explo...
A biharmonic equation with an impedance (non standard) boundary condition and more general equations...
The concept of integrable boundary conditions is applied to hydrodynamic type systems. Examples of s...
The Liapunov method is extended to a function space with a suitable metric, and is applied to the pr...
The biharmonic equation is encountered in plane problems of elasticity (w is the Airy stress functio...
This paper is concerned with weak solution of a mixed boundary value problem for the biharmonic equa...