Existence of triple positive solutions of two-point right focal boundary value problems on time scales

We consider the following boundary value problem, where n \_> 2, 1 \_< p \_< n-1 is fixed and T is a time scale. Criteria for the existence of single, double, and multiple positive solutions of the boundary value problem are developed. Upper and lower bounds for these positive solutions are establi

consider the following boundary value problem: y(')(O) = 0, o<i<p-1, y(')(l) = 0, p<i<\_n-1, where 1 < p 5 n -1 is fixed. Using a fixed point theorem for operator0 on a cone, we offer eufflcient conditione for the existence of multiple (at least three) positive eolutions of the boundary value probl

In this paper, by using fixed point theorems in a cone and the associated Green's function, we study the existence of at least two and three positive solutions to the m-point boundary value problem (BVP) on time scales,

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