Homogeneous and Ultrahomogeneous Linear Spaces

## Abstract A Steiner system (or __t__ — (__v__, __k__, 1) design) __S__ is said to be __homogeneous__ if, whenever the substructures induced on two finite subsets __S__~1~ and __S__~2~ of __S__ are isomorphic, there is at least one automorphism of __S__ mapping __S__~1~ onto __S__~2~, and is said

Using pseudoinverses of incidence matrices of finite quasigroups in partitions induced by left multiplications of subquasigroups, a quasigroup homogeneous space is defined as a set of Markov chain actions indexed by the quasigroup. A certain non-unital ring is afforded a linear representation by a q

## Abstract We establish natural bijections between three different classes of combinatorial objects; namely certain families of locally 2‐arc transitive graphs, partial linear spaces, and homogeneous factorizations of arc‐transitive graphs. Moreover, the bijections intertwine the actions of the re