Asymptotic Behaviour for a Phase-Field System with Hysteresis

## Abstract In this paper, an asymptotic analysis of the (non‐conserved) Penrose–Fife phase field system for two vanishing time relaxation parameters ε and δ is developed, in analogy with the similar analyses for the phase field model proposed by G. Caginalp (__Arch. Rational Mech. Anal__. 1986; **

## Abstract Some linear evolution problems arising in the theory of hereditary electromagnetism are considered here. Making use of suitable Liapunov functionals, existence of solutions as well as asymptotic behaviour, are determined for rigid conductors with electric memory. In particular, we show

## Abstract The asymptotic behaviour and stability properties are studied for a real two‐dimensional system __x__^′^(__t__) = A(__t__)__x__ (__t__) + B(__t__)__x__ (__θ__ (__t__)) + __h__ (__t__, __x__ (__t__), __x__ (__θ__ (__t__))), with a nonconstant delay __t__ ‐ __θ__ (__t__) ≥ 0. It is suppos

## Abstract We consider a conserved phase‐field system of Caginalp type, characterized by the assumption that both the internal energy and the heat flux depend on the past history of the temperature and its gradient, respectively. The latter dependence is a law of Gurtin–Pipkin type, so that the eq

We consider a spinless particle moving in a d-dimensional box, subject to periodic boundary conditions, and in the presence of a random potential. Introducing the logarithm of the wave function transforms the time-independent Schrödinger equation into a stochastic differential equation with the rand