metacyclic

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• Metacyclic group — In group theory, a metacyclic group is an extension of a cyclic group by a cyclic group. That is, it is a group G for which there is a short exact sequence where H and K are cyclic. Equivalently, a metacyclic group is a group G having a cyclic… …   Wikipedia

• metacyclic — adj. [Gr. meta, after; kyklos, circle] Pertaining to a stage in the life cycle of a parasite that is infective to its definitive host …   Dictionary of invertebrate zoology

• metacyclic — adjective Describing the infective part of the life cycle of trypanosomes outside the body of a host …   Wiktionary

• metacyclic — meta·cy·clic sī klikalso sik lik adj of a trypanosome broad and stocky, produced in an intermediate host, and infective for the definitive host …   Medical dictionary

• metacyclic — | ̷ ̷ ̷ ̷+ adjective Etymology: meta + cyclic of a trypanosome : broad and stocky, produced in an intermediate host, and infective for the definitive host …   Useful english dictionary

• Leishmaniasis — Classification and external resources Cutaneous leishmaniasis in the hand of a Central American adult …   Wikipedia

• Frobenius group — In mathematics, a Frobenius group is a transitive permutation group on a finite set, such that no non trivial elementfixes more than one point and some non trivial element fixes a point. They are named after F. G. Frobenius. Structure The… …   Wikipedia

• Z-group — In mathematics, especially in the area of algebra known as group theory, the term Z group refers to a number of distinct types of groups: * in the study of finite groups, a Z group is a finite groups whose Sylow subgroups are all cyclic. * in the …   Wikipedia

• Sleeping sickness — MedlinePlus = 001362 eMedicineSubj = med eMedicineTopic = 2140 MeshID = D014353 Sleeping sickness or human African trypanosomiasis is a parasitic disease of people and animals, caused by protozoa of species Trypanosoma brucei and transmitted by… …   Wikipedia

• Spherical 3-manifold — In mathematics, a spherical 3 manifold M is a 3 manifold of the form M = S3 / Γ where Γ is a finite subgroup of SO(4) acting freely by rotations on the 3 sphere S3. All such manifolds are prime, orientable, and closed. Spherical 3 manifolds are… …   Wikipedia