Bifurcation techniques for Lidstone boundary value problems

The singular problem (-1) n x (2n) = f(t; x; : : : ; x (2n-2) ), x (2j) (0)=x (2j) (T )=0 (06j6n -1), max{x(t) : 0 6 t 6 T } = A depending on the parameter is considered. Here the positive Carathà eodory function f may be singular at the zero value of all its phase variables. The paper presents cond

The bifurcation function for an elliptic boundary value problem is a vector field B(ω) on R d whose zeros are in a one-to-one correspondence with the solutions of the boundary value problem. Finite element approximations of the boundary value problem are shown to give rise to an approximate bifurcat

A compact finite difference method is proposed for a general class of 2nth-order Lidstone boundary value problems. The existence and uniqueness of the finite difference solution is investigated by the method of upper and lower solutions, without any monotone requirement on the nonlinear term. A mono

Piecewise quasilinearization methods for singular boundary-value problems in second-order ordinary differential equations are presented. These methods result in linear constant-coefficients ordinary differential equations which can be integrated analytically, thus yielding piecewise analytical solut