d-homogeneous and d-ultrahomogeneous linear spaces

If every isomorphism from S$ to S" can be extended to an automorphism of S, S is called ultrahomogeneous. We give a complete classification of all homogeneous (resp. ultrahomogeneous) linear spaces, without making any finiteness assumption on the number of points of S.

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

## Abstract It was remarked by P. Erdős, J. C. Fowler, V. T. Sós, and R. M. Wilson, (J Combin Theory Ser A 38, 1985, 131–142), that a non‐degenerate finite linear space on __v__ points has the following property. For every point __P__ the number of lines not passing through __P__ is at least $\lflo

## Abstract In this article, an optimization procedure is described to align electromagnetic (EM) three‐dimensional (3D) models with two‐dimensional (2D) models for the design of RF/microwave circuits. The optimization procedure is realized from a modified standard space mapping (SM) approach. The