Regularity of the semigroups associated with some damped coupled elastic systems II: a nondegenerate fractional damping case

Abstract

In this paper, we examine regularity issues for two damped abstract elastic systems; the damping and coupling involve fractional powers μ, θ, with 0 ≤ μ , θ ≤ 1, of the principal operators. The matrix defining the coupling and damping is nondegenerate. This new work is a sequel to the degenerate case that we discussed recently in kfl. First, we prove that for 1/2 ≤ μ , θ ≤ 1, the underlying semigroup is analytic. Next, we show that for (μ,θ) ∈ (0,1/2), the semigroup is of certain Gevrey classes. Finally, some examples of application are provided.