Add to ORKGCertain translation nets are shown to be equivalent to sets of mutually orthogonal Latin squares constructed by the automorphism method. Known results on fixed-point-free automorphisms are used to improve the known upper bounds on the maximum number of parallel classes in such a net. In particular, the maximum number is found exactly for such nets whose translation groups are Abelian. Applications are given both to the statistical design of experiments and to other parts of pure mathematics
A Latin square is considered to be a set of n^2 cells with three block systems. An automorphism is a...
Unit squares having their vertices at integer points in the Cartesian plane are called cells. A fini...
The automorphism group of a finitely generated free group is the normal closure of a single element ...
AbstractCertain translation nets are shown to be equivalent to sets of mutually orthogonal Latin squ...
AbstractIn this paper, we are concerned with three topics in finite geometry which have generated mu...
In this paper the first infinite series of translation nets with nonabelian translation groups and a...
AbstractThe existence of a translation net of order s and degree r with translation group G is equiv...
The existence of a translation net of order s and degree r with translation group G is equivalent to...
AbstractLet D be a translation Bruck net of order s and degree r, with translation group G, and let ...
AbstractThe maximal partial spreads of PG(3,4) were recently classified by Leonard Soicher. Each suc...
In this survey, we will discuss the existence problem for translation nets, the question of when a t...
We start the systematic investigation of the geometric properties and the collineation groups of Bru...
EnHere we study affine parallel translation structures, both finite and infinite, with a principal l...
Computational complexity of the subtasks in the symmetry reduction method for Place/Transition-nets...
AbstractA theory of certain types of translations for generalised nets is developed, and the structu...
A Latin square is considered to be a set of n^2 cells with three block systems. An automorphism is a...
Unit squares having their vertices at integer points in the Cartesian plane are called cells. A fini...
The automorphism group of a finitely generated free group is the normal closure of a single element ...
AbstractCertain translation nets are shown to be equivalent to sets of mutually orthogonal Latin squ...
AbstractIn this paper, we are concerned with three topics in finite geometry which have generated mu...
In this paper the first infinite series of translation nets with nonabelian translation groups and a...
AbstractThe existence of a translation net of order s and degree r with translation group G is equiv...
The existence of a translation net of order s and degree r with translation group G is equivalent to...
AbstractLet D be a translation Bruck net of order s and degree r, with translation group G, and let ...
AbstractThe maximal partial spreads of PG(3,4) were recently classified by Leonard Soicher. Each suc...
In this survey, we will discuss the existence problem for translation nets, the question of when a t...
We start the systematic investigation of the geometric properties and the collineation groups of Bru...
EnHere we study affine parallel translation structures, both finite and infinite, with a principal l...
Computational complexity of the subtasks in the symmetry reduction method for Place/Transition-nets...
AbstractA theory of certain types of translations for generalised nets is developed, and the structu...
A Latin square is considered to be a set of n^2 cells with three block systems. An automorphism is a...
Unit squares having their vertices at integer points in the Cartesian plane are called cells. A fini...
The automorphism group of a finitely generated free group is the normal closure of a single element ...