In mathematics, a quasifield is an algebraic structure where and are binary operations on , much like a division ring, but with some weaker conditions. All division rings, and thus all fields, are quasifields.
In mathematics, a quasifield is an algebraic structure ( Q , + , ⋅ ) {\displaystyle (Q,+,\cdot )} where + {\displaystyle +} and ⋅ {\displaystyle \cdot...
based on the Hall quasifield (also called a Hall system), H of order p2n for p a prime. The creation of the plane from the quasifield follows the standard...
translation planes, it is always possible to coordinatize with a quasifield. However, some quasifields satisfy additional algebraic properties, and the corresponding...
nature of infinitesimal transformations. Other examples are quasigroup, quasifield, non-associative ring, and commutative non-associative magmas. In mathematics...
\forall a,b,c\in R} . For example, the planar ternary ring associated to a quasifield is (by construction) linear. Given a planar ternary ring ( R , T ) {\displaystyle...
commutative is a field. A semifield by this definition is a special case of a quasifield. If S is finite, the last axiom in the definition above can be replaced...