On solutions of the wave equation with a sublinear dissipative term

## Abstract We consider the Cauchy problem for the weakly dissipative wave equation □__v__+__μ__/1+__t__ __v__~__t__~=0, __x__∈ℝ^__n__^, __t__≥0 parameterized by μ>0, and prove a representation theorem for its solutions using the theory of special functions. This representation is used to obtain _

This article presents a technique based on the hybrid Legendre tau-finite difference method to solve the fourth order wave equation which arises in the elasto-plastic-microstructure models for longitudinal motion of an elasto-plastic bar. Illustrative examples and numerical results obtained using ne

A n~mencai so~urmn of a recentI) dented d:sslpatlbe waw equation gavernmg the kmetlcs of spmodal decomposltmn of a Lennard-Jones Ruld 1s presenred In addltron. the r.zsults are compared wrth those of Cahn's and Abraham's generaked dtffusion theories for the case of rhe early stages of the coarsemng

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