Spectral approximations of strongly degenerate elliptic differential operators

Abstract: We establish analytical estimates of spectral approximations errors for strongly degenerate elliptic differential operators in the Lebesgue space $L_q(\Omega)$ on a bounded domain $\Omega$. Elliptic operators have coefficients with strong degeneration near boundary. Their spectrum consists of isolated eigenvalues of finite multiplicity and the linear span of the associated eigenvectors is dense in $L_q(\Omega)$. The received results are based on an appropriate generalization of Bernstein-Jackson inequalities w… Show more

“…Finally, note that the applications of analytic vectors to approximation problems can be found in [8,10,11,14] and etc. As for exact constants in direct and inverse approximation theorems of the functions theory, see also [1,17].…”

Approximation by interpolation spectral subspaces of operators with discrete spectrum

“…Finally, note that the applications of analytic vectors to approximation problems can be found in [8,10,11,14] and etc. As for exact constants in direct and inverse approximation theorems of the functions theory, see also [1,17].…”

Approximation by interpolation spectral subspaces of operators with discrete spectrum