A note on regular perturbation theories

In this paper, we present a normwise perturbation theory for the regular generalized eigenproblem Ax = λBx, when λ is a semi-simple and finite eigenvalue, which departs from the classical analysis with the chordal norm [9]. A backward error and a condition number are derived for a choice of flexible

The n-electron Hilbeert space is pnrtitioned into three ports by means of the projection operators P, Q, R such that P is associated with the known zeroth order wavefunction @, Q with the subspace of iunctions that are singly or doubly substituted wirh respacr to Q and R with the rest. The perturbnt

## Abstract We prove that there is an absolute constant __C__>0 so that for every natural __n__ there exists a triangle‐free __regular__ graph with no independent set of size at least \documentclass{article}\usepackage{amssymb}\usepackage{amsbsy}\usepackage[mathscr]{euscript}\footskip=0pc\pagestyle

It can easily be seen that a conjecture of RUNGE does not hold for a class of graphs whose members will be called "almost regular". This conjecture is replaced by a weaker one, and a classification of almost regular graphs is given.

We show that puncturing a completely regular even binary code produces a completely regular code again, thus answering a question posed in Brouwer et al. [3], p. 357.