Some Nonlinear Wave Equations with Acoustic Boundary Conditions

## Abstract We define an abstract setting to treat wave equations equipped with time‐dependent acoustic boundary conditions on bounded domains of **R**^__n__^ . We prove a well‐posedness result and develop a spectral theory which also allows to prove a conjecture proposed in [13]. Concrete problems

This paper deals with the existence and nonexistence of global positive solutions of the doubly nonlinear parabolic equation with nonlinear boundary conditions. Necessary and sufficient conditions in order that all positive solutions exist globally are obtained by using the upper and lower solutions

We consider the model problem where ⍀ is a bounded region in R with smooth boundary, q g 0, 2 , and Ž . p Ž .

In this paper, we analyze from the mathematical point of view a model for small vertical vibrations of an elastic string with weak internal damping and quadratic term, coupled with mixed boundary conditions of Dirichlet type and acoustic type. Our goal is to extend some of the results of Frota-Golds