On the wave equation with a magnetic potential

A damped semilinear hyperbolic equation on 1 with linear memory is considered in a history space setting. Viewing the past history of the displacement as a variable of the system, it is possible to express the solution in terms of a strongly continuous process of continuous operators on a suitable H

The wave equation model, originally developed to solve the advection-diffusion equation, is extended to the multidimensional transport equation in which the advection velocities vary in space and time. The size of the advection term with respect to the diffusion term is arbitrary. An operator-splitt

We study the scattering for a one-dimensional wave equation with a measurable positive potential <, locally bounded away from zero and satisfying lim V <(x)"#R and <(x)"O (" x "\\C) as xP!R, for some '0. By using a combination of ideas from the Lax}Phillips theory and the Enss method we prove the ex

The paper considers a particular type of closed-loop for the wave equation in one space dimension with damping acting at an arbitrary internal point, for which the uniform stabilization with exponential decay rate is shown. Applications to chains of coupled strings are also discussed.

It is shown, that the problem of existing of a relativistic covariant matrix equation of the first order with a free termsingular matrix, is transformed into a problem of determination of one of the matrices, if the representation of the Lorentz group T , by which the field y is transformed, is give

In this paper, following the ideas of Lax, we prove a blow-up result for a class of solutions of the equation & -&x -&+xx -= 0, corresponding, in certain cases, to the development of a singularity in the second derivatives of 4. These solutions solve locally (in time) the Cauchy problem for smooth i