A Note on the Sturmian Theorem for Singular Boundary Value Problems

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 consider different types of singular boundary value problems for the Monge᎐Ampere operator. The approach is based on existing regularity theory and á subsolution᎐supersolution method. Nonexistence and uniqueness results are also given.

Strong solvability in the Sobolev space W 2 p is proved for the oblique derivative problem almost everywhere in ∂u/∂ + σ x u = ϕ x in the trace sense on ∂ in the case when the vector field x has a contact of infinite order with ∂ at the points of some non-empty subset E ⊂ ∂ .

An upper and lower solution theory is presented for singular initial value problems. Our non-linear term may be singular in both the independent and dependent variable. Existence will be established using Schauder's "xed point theorem and the Arzela}Ascoli theorem.

Existence of a unique solution for a class of regular singular two point boundary value problems . and with quite general conditions on f x, y . These conditions on f x, y are sharp, which is seen through one example. Regions for multiple solutions have also been determined.