Existence of Solutions for a Class of Weighted <inline-formula> <graphic file="1029-242X-2008-791762-i1.gif"/></inline-formula>-Laplacian System Multipoint Boundary Value Problems

<p>Abstract</p> <p>This paper investigates the existence of solutions for weighted <inline-formula> <graphic file="1029-242X-2008-791762-i2.gif"/></inline-formula>-Laplacian system multipoint boundary value problems. When the nonlinearity term <inline-formula> <graphic file="1029-242X-2008-791762-i3.gif"/></inline-formula> satisfies sub-<inline-formula> <graphic file="1029-242X-2008-791762-i4.gif"/></inline-formula><inline-formula> <graphic file="1029-242X-2008-791762-i5.gif"/></inline-formula> growth condition or general growth condition, we give the existence of solutions via Leray-Schauder degree.</p

Existence of Solutions for a Class of Weighted -Laplacian System Multipoint Boundary Value Problems

This paper investigates the existence of solutions for weighted p(t)-Laplacian system multipoint boundary value problems. When the nonlinearity term f(t,⋅,⋅) satisfies sub-p−−1 growth condition or general growth condition, we give the existence of solutions via Leray-Schauder degree

Existence of Solutions for a Class of Weighted p t -Laplacian System Multipoint Boundary Value Problems

This paper investigates the existence of solutions for weighted p t -Laplacian system multipoint boundary value problems. When the nonlinearity term f t, ·, · satisfies sub-p − −1 growth condition or general growth condition, we give the existence of solutions via Leray-Schauder degree