Direct and inverse theorems in the theory of approximation by the Ritz method

Abstract

For an arbitrary self-adjoint operator B in a Hilbert space H, we present direct and inverse theorems establishing the relationship between the degree of smoothness of a vector x ∈ H with respect to the operator B, the rate of convergence to zero of its best approximation by exponential-type entire vectors of the operator B, and the k-modulus of continuity of the vector x with respect to the operator B. The results are used for finding a priori estimates for the Ritz approximate solutions of operator equations in a Hilbert space.