Landesman-Lazer's Type Boundary Value Problems for Holomorphic Functions

Cubic basis functions in one dimension for the solution of two-point boundary value problems are constructed based on the zeros of Chebyshev polynomials of the first kind. A general formula is derived for the construction of polynomial basis functions of degree r, where 1 Qr< co. A Galerkin finite e

It is established that, under certain conditions, the Dirichlet problem on a bounded interval for the Painleve II equation is uniquely solvable and solutions are ćonstructed in an iterative manner. Moreover, conditions for the existence of periodic solutions are set down.

## Abstract For partial differential equations of mixed elliptic‐hyperbolic type we prove results on existence and existence with uniqueness of weak solutions for __closed__ boundary value problems of Dirichlet and mixed Dirichlet‐conormal types. Such problems are of interest for applications to tr