A note on isoenergetic stability

This note provides counter-examples to a conjecture of D.A. Holton on stability of graphs. It is shown that even though the automorphism groups of two graphs are identical, one may be stable while the other is not.

Numerical stability of the Galerkin method for some class of semilinear evolution equations is studied. The stability is established in the I, (1 p l i co) norms. Our results are applied to the special coordinate systems. All the conditions of the stability theorems proved in this note may be readil

We investigate vertex orders that can be used to obtain maximum stable sets by a simple greedy algorithm in polynomial time in some classes of graphs. We characterize a class of graphs for which the stability number can be obtained by a simple greedy algorithm. This class properly contains previousl

## Abstract We show that if a class **__K__** of finite relational structures is closed under quasi‐substructures, then there is no saturated **__K__**‐generic structure that is superstable but not __ω__ ‐stable (© 2010 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)