Large positive solutions for a class of 1-D diffusive logistic problems with general boundary conditions

Abstract

The first goal of this paper is to establish the existence of a positive solution for the singular boundary value problem (1.1), where B is a general boundary operator of Dirichlet, Neumann or Robin type, either classical or non-classical; in the sense that, as soon as Bu(0)=-u'(0)+β u(0), the coefficient β can take any real value, not necessarily β≥ 0 as in the classical Sturm--Liouville theory. Since the function f(u):=aup -λ u, u≥ 0, is not increasing if λ>0, the uniqueness of the positive solution of (1.1) is far from obvious, in general, even for the simplest case when a(x) is a positive constant. The second goal of this paper is to establish the uniqueness of the positive solution of (1.1) in that case. At a later stage, denoting by Lλ the unique positive solution of (1.1) when a(x) is a positive constant, we will characterize the point-wise behavior of Lλ as λ ∞. It turns out that any positive solution of (1.1) mimics the behavior of Lλ as λ ∞. Finally, we will establish the uniqueness of the positive solution of (1.1) when a(x) is non-increasing in [0,R], λ≥ 0, and β<0 if -u'(0)+β u(0)=0.