A quenching phenomenon for one-dimensional -Laplacian with singular boundary flux

In this work, we give nonresonance conditions for a singular quasilinear two-point boundary value problem , h is a nonnegative measurable function on (0, 1), and k : (0, 1) × R × R → R is a Carathéodory function dominated by K ∈ L 1 (0, 1), i.e., |k(t, x, y)| ≤ K (t) for all (t, x, y) ∈ (0, 1) × R

The singularity may appear at u s 0 and at t s 0 or t s 1 and the function f may be discontinuous. The authors prove that for any p ) 1 and for any positive, nonincreasing function f and nonnegative measurable function k with some integrability conditions, the abovementioned problem has a unique sol

We use the fixed-point index theory to establish the existence of at least one or two positive solutions for the singular three-point boundary value problems and a(t) is allowed to have a singularity at the endpoints of (0, 1). Applications of our results are provided to yield positive radial solut