On the size of classes with weak membership properties

A hereditary property of graphs is a class of graphs which is closed under taking induced subgraphs. For a hereditary property \(\mathscr{P}\), let \(\mathscr{P}_{n}\) denote the set of \(\mathscr{P}\) graphs on \(n\) labelled vertices. Clearly we have \(0 \leqslant\left|\mathscr{P}_{n}\right| \leqs

## Abstract In this paper we investigate Hankel operators with anti‐holomorphic __L__^2^‐symbols on generalized Fock spaces __A__~__m__~^2^ in one complex dimension. The investigation of the mentioned operators was started in [4] and [3]. Here, we show that a Hankel operator with anti‐holomorphic

By means of a blend of theoretical arguments and computer algebra techniques, we prove that the number of isomorphism classes of hypergroups of type U on the right of order five, having a scalar (bilateral) identity, is 14 751. In this way, we complete the classification of hypergroups of type U on