DLoops

Dloops, or D-loops, are a class of algebraic structures studied in loop theory, a branch of nonassociative algebra. In this context, a loop is a set L with a binary operation such that there exists an identity element e in L with e*a = a and a*e = a for all a in L, and such that for any a, b in L there exist unique x, y in L with a*x = b and y*a = b. D-loops are defined by enforcing dihedral-like symmetry constraints on this basic framework, yielding finite loops whose multiplication is designed to resemble certain dihedral-group aspects while not requiring associativity.

Construction and definitions: Several common approaches exist to construct D-loops. One approach uses a base group

Properties and examples: D-loops are nonassociative in general but retain the loop property (existence of identity

Applications and research: D-loops serve as objects of study in algebraic combinatorics and finite geometry, providing

See also: loop, quasigroup, dihedral group, isotopy, Moufang loop.