On Stability of a Third Order of Accuracy Difference Scheme for Hyperbolic Nonlocal BVP with Self-Adjoint Operator

الملخص EN

A third order of accuracy absolutely stable difference schemes is presented for nonlocal boundary value hyperbolic problem of the differential equations in a Hilbert space H with self-adjoint positive definite operator A.

Stability estimates for solution of the difference scheme are established.

In practice, one-dimensional hyperbolic equation with nonlocal boundary conditions is considered.