The Cauchy problem for the improved Boussinesq equation with spatially quasi-periodic initial data

Abstract

We study the Cauchy problem for the improved Boussinesq equation \[ utt-uxx-uxxtt-(u2)xx=0 \] on the real line with spatially quasi-periodic initial data. For a non-resonant frequency vector ω∈ R, we prove local existence and uniqueness of classical spatially quasi-periodic solutions with the same frequency vector ω in two Fourier-side classes. First, for exponentially decaying initial Fourier coefficients, we obtain a spatially quasi-periodic solution whose Fourier coefficients remain exponentially decaying on an explicit time interval. Second, for initial Fourier coefficients c(n) and d(n) satisfying the polynomial decay |c(n)|+|d(n)| (1+|n|)-r, \; r>+2, we prove that the corresponding spatially quasi-periodic solution preserves the same polynomial decay rate as the initial data. We also extend these results to the nonlinearity up with integer p ≥ 3.