摘要
In this paper, we study the initial-boundary value problem for the semilinear pseudoparabolic equations ut —△xut —△xu =|u|^p-1u, where X =(X1, X2,..., Xm) is a system of real smooth vector fields which satisfy the Hormander's condition, and △x =∑j=1^m Xj^2 is a finitely degenera te elliptic operator. By using potential well method, we first prove the invariance of some sets and vacuum isolating of solutions. Then, by the Galerkin method and the concavity method we show the global existence and blow-up in finite time of solutions with low initial energy or critical initial energy. The asymptotic behavior of the global solutions and a lower bound for blow-up time of local solution are also given.
In this paper, we study the initial-boundary value problem for the semilinear pseudoparabolic equations ut-△Xut-△Xu = |u|p-1u, where X =(X1, X2,..., Xm) is a system of real smooth vector fields which satisfy the H?rmander’s condition, and △X = ∑j=1m Xj2 is a finitely degenerate elliptic operator. By using potential well method, we first prove the invariance of some sets and vacuum isolating of solutions. Then, by the Galerkin method and the concavity method we show the global existence and blow-up in finite time of solutions with low initial energy or critical initial energy.The asymptotic behavior of the global solutions and a lower bound for blow-up time of local solution are also given.
基金
Supported by National Natural Science Foundation of China(Grants Nos.11631011 and 11626251)
