Aim of the paper is the qualitative analysis of a quasi-linear parabolic third order equation, which describes the evolution in a large class of dissipative models. As examples of some typical boundary problems, both Dirichlet's and Neumann's type boundary conditions are examined. In the linear case, the related Green functions are explicitly determined, together with rigorous estimates of their behavior when the parameter of dissipation is vanishing. These results are basic to study the integral equations to which the non linear problems can be reduced. Moreover, boundary layer estimates can be determined too.
Non linear problems in dissipative models / DE ANGELIS, Monica; Fiore, Gaetano; Renno, Pasquale. - In: RENDICONTO DELL'ACCADEMIA DELLE SCIENZE FISICHE E MATEMATICHE. - ISSN 0370-3568. - STAMPA. - (4)72:(2005), pp. 81-94.
Non linear problems in dissipative models
DE ANGELIS, MONICA;FIORE, GAETANO;RENNO, PASQUALE
2005
Abstract
Aim of the paper is the qualitative analysis of a quasi-linear parabolic third order equation, which describes the evolution in a large class of dissipative models. As examples of some typical boundary problems, both Dirichlet's and Neumann's type boundary conditions are examined. In the linear case, the related Green functions are explicitly determined, together with rigorous estimates of their behavior when the parameter of dissipation is vanishing. These results are basic to study the integral equations to which the non linear problems can be reduced. Moreover, boundary layer estimates can be determined too.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.