This paper concerns the blow up at infinity of global solutions of strongly damped polyharmonic Kirchhoff systems, involving lower order terms, a time dependent nonlinear dissipative function Q and a driving force f, under homogeneous Dirichlet boundary conditions. Some applications are presented in special subcases of f and Q.
Blow up at infinity of solutions of polyharmonic Kirchhoff systems / Autuori, Giuseppina; F., Colasuonno; Pucci, Patrizia. - In: COMPLEX VARIABLES AND ELLIPTIC EQUATIONS. - ISSN 1747-6933. - STAMPA. - 57/2012:2-4(2012), pp. 379-395. [10.1080/17476933.2011.592584]
Blow up at infinity of solutions of polyharmonic Kirchhoff systems
AUTUORI, GIUSEPPINA;
2012-01-01
Abstract
This paper concerns the blow up at infinity of global solutions of strongly damped polyharmonic Kirchhoff systems, involving lower order terms, a time dependent nonlinear dissipative function Q and a driving force f, under homogeneous Dirichlet boundary conditions. Some applications are presented in special subcases of f and Q.File in questo prodotto:
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