Add to ORKGAn interesting thing happens when one begins with the axioms of a field, but does not require the associative and commutative properties. The resulting nonassociative division ring is referred to as a "semifield" in this paper. Semifields have intimate ties to finite projective planes. In short, a nite projective plane with certain restrictions gives rise to a semifield, and, in turn, a finite semifield can be used via a coordinate construction, to build a special finite projective plane. It is also shown that two finite semields provide a coordinate system for isomorphic projective planes if and only if the semifields are isotopic, where isotopy is a relationship similar to but weaker than isomorphism. Before we prove those resul...
In 1965 Knuth [17] noticed that a finite semifield was determined by a 3-cube array (aijk) and that ...
AbstractIn 1965 Knuth (J. Algebra 2 (1965) 182) noticed that a finite semifield was determined by a ...
A semifield R is a not necessarily associative ring with no zero-divisors, a multiplicative identity...
NOTE: Text or symbols not renderable in plain ASCII are indicated by [...]. Abstract is included in...
AbstractA projective plane is called a translation plane if there exists a line L such that the grou...
A projective plane is called a translation plane if there exists a line L such that the group of ela...
The projection construction is a method to blend two or more semifields of the same order into a pos...
A finite presemifield is a non-associative division ring. A presemifield possessing a multiplicative...
AbstractSemiadditive rings are defined and their relationship with the projective planes is studied....
AbstractWe give a geometric construction of a finite semifield from a certain configuration of two s...
Abstract. We give a geometric construction of a finite semifield from a certain config-uration of tw...
Skew polynomial rings are used to construct finite semifields, following from a construction of Ore ...
We construct and describe the basic properties of a family of semifields in characteristic 2. The co...
AbstractA new family of commutative semifields with two parameters is presented. Its left and middle...
In [2] a geometric construction was given of a finite semifield from a certain configuration of two ...
In 1965 Knuth [17] noticed that a finite semifield was determined by a 3-cube array (aijk) and that ...
AbstractIn 1965 Knuth (J. Algebra 2 (1965) 182) noticed that a finite semifield was determined by a ...
A semifield R is a not necessarily associative ring with no zero-divisors, a multiplicative identity...
NOTE: Text or symbols not renderable in plain ASCII are indicated by [...]. Abstract is included in...
AbstractA projective plane is called a translation plane if there exists a line L such that the grou...
A projective plane is called a translation plane if there exists a line L such that the group of ela...
The projection construction is a method to blend two or more semifields of the same order into a pos...
A finite presemifield is a non-associative division ring. A presemifield possessing a multiplicative...
AbstractSemiadditive rings are defined and their relationship with the projective planes is studied....
AbstractWe give a geometric construction of a finite semifield from a certain configuration of two s...
Abstract. We give a geometric construction of a finite semifield from a certain config-uration of tw...
Skew polynomial rings are used to construct finite semifields, following from a construction of Ore ...
We construct and describe the basic properties of a family of semifields in characteristic 2. The co...
AbstractA new family of commutative semifields with two parameters is presented. Its left and middle...
In [2] a geometric construction was given of a finite semifield from a certain configuration of two ...
In 1965 Knuth [17] noticed that a finite semifield was determined by a 3-cube array (aijk) and that ...
AbstractIn 1965 Knuth (J. Algebra 2 (1965) 182) noticed that a finite semifield was determined by a ...
A semifield R is a not necessarily associative ring with no zero-divisors, a multiplicative identity...