Strongly damped wave equations with mass-like terms of the logarithmic-Laplacian

Abstract

We consider strongly damped wave equations with logarithmic mass-like terms with a parameter θ ∈ (0; 1]. This research is a part of a series of wave equations that was initiated by Char\~ao-Ikehata [6], Char\~ao-D'Abbicco-Ikehata considered in [5] depending on a parameter θ ∈ (1/2,1) and Piske- Char\~ao-Ikehata [26] for small parameter θ ∈ (0,1/2). We derive a leading term (as time goes to infinity) of the solution, and by using it, a growth and a decay property of the solution itself can be precisely studied in terms of L2-norm. An interesting aspect appears in the case of n = 1, roughly speaking, a small θ produces a diffusive property, and a large θ gives a kind of singularity, expressed by growth rates.