Disconjugacy, disfocality, and differentiation with respect to boundary conditions

We consider solutions of boundary value problems for the ordinary differential equation. \(y^{\prime n}=f\left(x, y, y^{\prime}, \ldots, y^{\prime n}{ }^{\prime \prime}\right)\), which satisfy \(g_{i}\left(y(x), \ldots, y^{\prime n}{ }^{11}\left(x_{i}\right)\right)=y_{i}\), \(1 \leqslant i \leqslant

A simple numerical method for construction of the dependence of solutions to nonlinear boundary value problem on a parameter will be developed. The set of differential equations is diiferentiated with respect to the boundary condition chosen and the resulting partial differential equations are solve

## Abstract A new concept associated with the __reciprocity relation__ in acoustic scattering is introduced. Motivated by this well‐known relation, which holds in all the classical cases, more general boundary value problems for the scalar Helmholtz equation are studied. These generalized boundary