Constant-sign solutions for a system of third-order generalized right focal problems

with the same boundary conditions. Under various assumptions on f , a, and λ we establish intervals of the parameter λ which yield the existence of a positive solution of the eigenvalue problem. By placing certain restrictions on the nonlinearity, we prove the existence of at least one, at least two

In this paper, we are concerned with the third order two-point generalized right focal boundary value problem A few new results are given for the existence of at least one, two, three and infinitely many monotone positive solutions of the above boundary value problem by using the Krasnosel'skii fix

We consider the following system of third-order three-point generalized right focal boundary value problems where > 0, i = 1, 2, . . . , n, 1 2 (a + b) < z < b, i 0, i > 0, and i are deviating arguments. Criteria will be developed so that for values of that form an interval (bounded or unbounded),

In this paper, we sh 1 r~ults whi ~u~~tee the Epstein of one or above co~t~t-sign ~l~tio~s to the foil equations on a time scale T, where a, a < ~(~), and L is kx positive ~~te~erT o ~d~~s~~d the notations used in (1.1 f , we ret (4 be ES time scale, i.e., cloud su~et o that T has the topolo for any

We consider the following system of higher order three-point boundary-value problems where i = 1, 2, . . . , n, m i ≥ 3, 1 2 (a + b) < t \* < b, ξ ≥ 0, δ > 0 and φ i 's are deviating arguments. Several criteria are offered for the existence of three fixed-sign solutions (u 1 , u 2 , . . . , u n ) o