Moments of square-integrable functions

## Abstract We consider the Sobolev spaces of square integrable functions __v__, from ℝ^__n__^ or from one of its hyperquadrants __Q__, into a complex separable Hilbert space, with square integrable sum of derivatives ∑∂~__𝓁__~__v__. In these spaces we define closed trace operators on the boundarie

## Abstract Boundary value problems for singular canonical systems of differential equations of the form are studied in the associated Hilbert space \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$L^2\_\Delta (\imath )$\end{document}. With the help of a monotonicity pr

A variational method for estimating the energies and widths of short-lived resonance states has been implemented. The procedure was originally suggested by Taylor and Hazi. The method gives good results on a model one-dimensional system. It is very general and easy to implement.