Adjective
Alt. of Homomorphous
Source: Webster's dictionaryHence we have a homomorphic mapping, st(x), from F to R whose kernel consists of the infinitesimals and which sends every element x of F to a unique real number whose difference from x is in S; which is to say, is infinitesimal. Source: Internet
The complex cepstrum was defined by Oppenheim in his development of homomorphic system theory A. V. Oppenheim, "Superposition in a class of nonlinear systems" Ph. Source: Internet
We may think of G as the "most general" group that contains a homomorphic image of S. An important question is to characterize those semigroups for which this map is an embedding. Source: Internet
The construction, detailed in the article on the Grothendieck group, is "universal", in that it has the universal property of being unique, and homomorphic to any other embedding of an abelian monoid in an abelian group. Source: Internet