In the article, the fully discrete finite difference scheme for a type of nonlinear reaction-diffusion equation is established. Then the new function space is introduced and the stability problem for the finite differ...In the article, the fully discrete finite difference scheme for a type of nonlinear reaction-diffusion equation is established. Then the new function space is introduced and the stability problem for the finite difference scheme is discussed by means of variational approximation method in this function space. The approach used is of a simple characteristic in gaining the stability condition of the scheme.展开更多
The authors study the existence of homoclinic type solutions for the following system of diffusion equations on R × RN:{atu-xu + b ·▽xu + au + V(t,x)v = Hv(t,x,u,v),-atv-xv-b·▽xv + av + V(...The authors study the existence of homoclinic type solutions for the following system of diffusion equations on R × RN:{atu-xu + b ·▽xu + au + V(t,x)v = Hv(t,x,u,v),-atv-xv-b·▽xv + av + V(t,x)u = Hu(t,x,u,v),where z =(u,v):R × RN → Rm × Rm,a 〉 0,b =(b1,···,bN) is a constant vector and V ∈ C(R × RN,R),H ∈ C1(R × RN × R2m,R).Under suitable conditions on V(t,x) and the nonlinearity for H(t,x,z),at least one non-stationary homoclinic solution with least energy is obtained.展开更多
文摘In the article, the fully discrete finite difference scheme for a type of nonlinear reaction-diffusion equation is established. Then the new function space is introduced and the stability problem for the finite difference scheme is discussed by means of variational approximation method in this function space. The approach used is of a simple characteristic in gaining the stability condition of the scheme.
基金Project supported by the National Natural Science Foundation of China (No.10971194)the Zhejiang Provincial Natural Science Foundation of China (Nos.Y7080008,R6090109)the Zhejiang Innovation Project (No.T200905)
文摘The authors study the existence of homoclinic type solutions for the following system of diffusion equations on R × RN:{atu-xu + b ·▽xu + au + V(t,x)v = Hv(t,x,u,v),-atv-xv-b·▽xv + av + V(t,x)u = Hu(t,x,u,v),where z =(u,v):R × RN → Rm × Rm,a 〉 0,b =(b1,···,bN) is a constant vector and V ∈ C(R × RN,R),H ∈ C1(R × RN × R2m,R).Under suitable conditions on V(t,x) and the nonlinearity for H(t,x,z),at least one non-stationary homoclinic solution with least energy is obtained.
