Nonlinear Parabolic Equation on Manifolds


  •  Gladson Antunes    
  •  Ivo Lopez    
  •  Maria Silva    
  •  Luiz Medeiros    
  •  Angela Biazutti    

Abstract

In this work we investigate the existence and the uniqueness of solution for a nonlinear differential equation of parabolic type on the lateral boundary $\Sigma$ of a cylinder $Q$, cf. (1). An important part of our study is to transform this initial value problem into another one whose differential operator equation is of the type
\[
u_{t}+a\left({\displaystyle\int_{\Gamma}}udx\right)  \mathcal{A}%
u-\Delta_{\Gamma}u+u^{2k+1}=f \,\, \text{on} \,\, \Sigma,
\]
cf. (9), where $k$ is a positive integer. The operator $\mathcal{A}$ acts in Sobolev spaces on $\Gamma$, boundary of $\Omega$. The initial value problem (9) will be studied in Section $4$. Thus, we obtain  the existence and the uniqueness of weak solution for (9).


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