New Characterizations of Riesz Bases

This paper deals with L 2 (R)-norm and Sobolev-norm stability of polynomial splines with multiple knots, and with regularized versions thereof. An essential ingredient is a result on Ho lder continuity of the shift operator operating on a B-spline series. The stability estimates can be reformulated

## Operator-valued functions of the form compact-valued and holomorphic on certain domains ⍀ ; ‫ރ‬ are considered in separable Hilbert space. Assuming that the resolvent of A is compact, its eigenvalues are simple and the corresponding eigenvectors form a Riesz basis for H H of finite defect, it i

Two number fields \(K\left|k, K^{\prime}\right| k\) are called Kronecker equivalent over \(k\) iff the sets of primes of \(k\) having a prime divisor of first degree in \(K\) respectively in \(K^{\prime}\) coincide up to at most finitely many exceptions. We give some new characterizations of Kroneck

The purpose of this paper is to give new characterizations of some mean-values of two positive real numbers. The arithmetic, geometric, and harmonic means of two positive real numbers are the fundamentals of this paper.

We present new characterizations of interval digraphs, interval graphs, and indifference digraphs, using linear orderings of edges and vertices.