A note on the existence of traveling-wave solutions to a Boussinesq system

Abstract

We obtain a one-parameter family (uμ(x,t),ημ(x,t))μ≥ μ0=(φμ(x-ωμ t),μ(x-ωμ t))μ≥ μ0 of traveling-wave solutions to the Boussinesq system ut+ηx+uux+cηxxx=0,ηt+ux+(η u)x+auxxx=0 in the case a,c<0, with non-null speeds ωμ arbitrarily close to 0 (ωμ[μ+∞] 0). We show that the L2-size of such traveling-waves satisfies the uniform (in μ) estimate \|φμ\|22+\|μ\|22≤ C|a|+|c|, where C is a positive constant. Furthermore, φμ and -μ are smooth, non-negative, radially decreasing functions which decay exponentially at infinity.