Asymptotics of spatially periodic solution to Boussinesq's equation with dissipation for large time (Q1374952)

I show that a solution to the Cauchy problem for the equation \[ u_{tt}- 2bu_{txx}= -\alpha u_{xxxx}+ u_{xx}+ \beta(u^2)_{xx}, \] \(x\in\mathbb{R}^1\), \(t>0\), \(\alpha,b=\text{const}> 0\), \(\beta=\text{const}\in\mathbb{R}^1\), increases linearly with time, and find the next term of the asymptotic decomposition of the solution.