Strictly speaking, this is the definition of a left quasifield. A right quasifield is similarly defined, but satisfies right distributivity instead. A quasifield satisfying both distributive laws is called a semifield, in the sense in which the term is used in projective geometry. Although not assumed, one can prove that the axioms imply that the additive group is abelian. Thus, when referring to an abelian quasifield, one means that is abelian.
Kernel
The kernel K of a quasifield Q is the set of all elements c such that :
Restricting the binary operations + and to K, one can shown that is a division ring. One can now make a vector space of Q over K, with the following scalar multiplication : As a finite division ring is a finite field by Wedderburn's theorem, the order of the kernel of a finite quasifield is a prime power. The vector space construction implies that the order of any finite quasifield must also be a prime power.
Examples
All division rings, and thus all fields, are quasifields. The smallest quasifields are abelian and unique. They are the finite fields of orders up to and including eight. The smallest quasifields which are not division rings are the four non-abelian quasifields of order nine; they are presented in and.
Given a quasifield, we define a ternary map by One can then verify that satisfies the axioms of a planar ternary ring. Associated to is its corresponding projective plane. The projective planes constructed this way are characterized as follows; the details of this relationship are given in. A projective plane is a translation planewith respect to the line at infinityif and only if any of its associated planar ternary rings are right quasifields. It is called a shear plane if any of its ternary rings are left quasifields. The plane does not uniquely determine the ring; all 4 nonabelian quasifields of order 9 are ternary rings for the unique non-Desarguesian translation plane of order 9. These differ in the fundamental quadrilateral used to construct the plane.
History
Quasifields were called "Veblen-Wedderburn systems" in the literature before 1975, since they were first studied in the 1907 paper by O. Veblen and J. Wedderburn. Surveys of quasifields and their applications to projective planes may be found in and.