(L^p-L^q\) estimates for solutions to the plate equation with mass term

In this paper, we study the Cauchy problem for the linear plate equation with mass term and its applications to semilinear models. For the linear problem we obtain \(L^p-L^q\) estimates for the solutions in the full range \(1\leq p\leq q\leq \infty\), and we show that such estimates are optimal. In the sequel, we discuss the global in time existence of solutions to the associated semilinear problem with power nonlinearity \(|u|^\alpha\). For low dimension space \(n\leq 4\), and assuming \(L^1\) regularity on the second datum, we were able to prove global existence for \(\alpha> \max\{\alpha_c(n), \tilde\alpha_c(n)\}\) where \(\alpha_c = 1+4/n\) and \(\tilde \alpha_c = 2+2/n\). However, assuming initial data in \(H^2(\mathbb{R}^n)\times L^2(\mathbb{R}^n)\), the presence of the mass term allows us to obtain global in time existence for all \(1 (n+4)/[n-4]_+\).