Dissipative Effects in Nonlinear Klein-Gordon Dynamics

Abstract

We consider dissipation in a recently proposed nonlinear Klein-Gordon dynamics that admits soliton-like solutions of the power-law form eqi(kx-wt), involving the q-exponential function naturally arising within the nonextensive thermostatistics [eqz [1+(1-q)z]1/(1-q), with e1z=ez]. These basic solutions behave like free particles, complying, for all values of q, with the de Broglie-Einstein relations p= k, E= ω and satisfying a dispersion law corresponding to the relativistic energy-momentum relation E2 = c2p2 + m2c4 . The dissipative effects explored here are described by an evolution equation that can be regarded as a nonlinear version of the celebrated telegraphists equation, unifying within one single theoretical framework the nonlinear Klein-Gordon equation, a nonlinear Schroedinger equation, and the power-law diffusion (porous media) equation. The associated dynamics exhibits physically appealing soliton-like traveling solutions of the q-plane wave form with a complex frequency ω and a q-Gaussian square modulus profile.