Nonexistence of Global Solutions to an Elliptic Equation with a Dynamical Boundary Condition - doi: 10.5269/bspm.v22i2.7475

Mokhtar Kirane; Eric NABANA; Stanislav I. Pohozaev

doi:10.5269/bspm.v22i2.7475

Nonexistence of Global Solutions to an Elliptic Equation with a Dynamical Boundary Condition - doi: 10.5269/bspm.v22i2.7475

Autores/as

Mokhtar Kirane Université de La Rochelle
Eric NABANA Université de Picardie Jules Verne
Stanislav I. Pohozaev Russian Academy of Sciences

DOI:

https://doi.org/10.5269/bspm.v22i2.7475

Palabras clave:

nonexistence, ellipitic problem, dynamical boundary conditions

Resumen

We consider the equation \Deltau = 0 posed in Q := (0;+\infty) \times \Omega ; \Omega:=\{x = (x'; x_ N)/ x' \in R^{N-1}; x_N > 0\}; with the dynamical boundary condition
B(t, x',0)u_{tt} + A(t, x',0)u_t - u_{x_N} \geq D(t; x',0; 0) |u|^q on \Sigma := (0;\infty) \times R^{N-1} \times \{0\} and give conditions on the coefficient functions A(t, x',0); B(t, x',0; 0) and D(t, x'; 0) for the nonexistence of global solutions.