O-asymptotic classes of finite structures, pseudofinite dimension and forking

The first result about the asymptotic behaviour of convex domains in H 2 (−1) was given in 1972 by Santal´ o and Ya˜ nez ([SY72]) for a family of h-convex domains (a convex domain

These results can be inter- preted as saying that abelian normal .A-Fitting classes are large (sx = .A) whereas any other Fitting class is rather small since all finite soluble

Temme, Parabolic cylinder function, in: NIST Handbook of Mathematical Functions, Cambridge University Press, Cambridge,

We show tight bounds for the quantifier depth needed to distinguish structures for two natural classes of random ordered structures: bit strings and graphs?. Related open

In order to complete these considerations we still consider a continuous total preference relation “ - ” on a real or complex convex space V that is locally non-satiated (cf.

In this paper, we continue with that program and obtain asymptotic expansions between the fourth level and the third level: we derive 16 asymptotic expansions of the Hahn, dual

This expansion has the additional property of being asymptotic for large c with fixed a uniformly in b and z (with bounded b/c).. Moreover, the asymptotic character of the

In this paper we continue with that investigation and establish asymptotic connections between the fourth level and the two lower levels: we derive twelve asymptotic expansions of