【 摘 要 】

In this paper, we study the nonlocal dispersal equation {u(t) = integral(RN) J(x-y)u(y, t)dy-u+lambda u-a(x, t)u(P) in (Omega) over bar x (0, +infinity), u(x, t) = 0 in (R-N\(Omega) over bar) x (0, +infinity), u(x, 0) = u(0)(x) in (Omega) over bar, where Omega subset of R-N is a bounded domain, lambda and p > 1 are constants. The dispersal kernel J is nonnegative. The function a is an element of C((Omega) over bar x R) is nonnegative and T-periodic in t, but a(x, t) has temporal or spatial degeneracies (a(x, t) vanishes). We first study the periodic nonlocal eigenvalue problems with parameter and establish the asymptotic behavior of principal eigenvalues when the parameter is large. We find that the spatial degeneracy of a(x, t) always guarantees a principal eigenfunction. Then we consider the dynamical behavior of the equation if a(x, t) has temporal or spatial degeneracies. Our results indicate that only the temporal degeneracy can not cause a change of the dynamical behavior, but the spatial degeneracy always causes fundamental changes, whether or not the temporal degeneracy appears. (C) 2017 Elsevier Inc. All rights reserved.

【 授权许可】

Free   

【 预 览 】

附件列表

Files	Size	Format	View
10_1016_j_jde_2017_03_001.pdf	1521KB	PDF	download