-
1 splitting morphism
Большой англо-русский и русско-английский словарь > splitting morphism
-
2 splitting morphism
Математика: расщепляющий морфизм -
3 splitting morphism
мат. -
4 morphism
морфизм dually universal morphism ≈ двойственно универсальный морфизм fiber bundle morphism ≈ морфизм расслоенного пространства left regular morphism ≈ регулярный слева морфизм local vector bundle morphism ≈ локальный морфизм векторных расслоений locally embeddable morphism ≈ локально вложимый морфизм locally stable morphism ≈ локально устойчивый морфизм locally trivial morphism ≈ локально тривиальный морфизм principal bundle morphism ≈ морфизм главных расслоений projectively embeddable morphism ≈ проективно вложимый морфизм purely inseparable morphism ≈ чисто несепарабельный морфизм residually stable morphism ≈ резидуально устойчивый морфизм right liberty morphism ≈ освобождающий справа морфизм right regular morphism ≈ регулярный справа морфизм universally closed morphism ≈ универсально замкнутый морфизм universally submersive morphism ≈ универсально субмерсивный морфизм - bijective morphism - bilogical morphism - bimeromorphic morphism - birational morphism - bounded morphism - bundle morphism - canonical morphism - categorical morphism - central morphism - clone morphism - closed morphism - cobounded morphism - codiagonal morphism - coequating morphism - coessential morphism - coimage of morphism - coliberty morphism - commutator morphism - compactifiable morphism - compatibility morphism - composite morphism - connecting morphism - coperfect morphism - covering morphism - divisible morphism - dominant morphism - dual morphism - embeddable morphism - epic morphism - etale morphism - extendable morphism - factored morphism - factorial morphism - fibered morphism - finite morphism - flat morphism - functorial morphism - fuzzy morphism - general morphism - geometric morphism - graded morphism - groupoid morphism - homotopic morphism - identity morphism - index of morphism - induced morphism - inductive morphism - injective morphism - inseparable morphism - invertible morphism - kernel of morphism - lattice morphism - liftable morphism - limit morphism - manifold morphism - monic morphism - morphism of colimit - morphism of complexes - morphism of functors - morphism of limit - morphism of manifolds - morphism of premanifold - morphism of presheafs - morphism of rings - morphism of semigroups - morphism of sheafs - natural morphism - neighbor morphism - nonstrict morphism - nontrivial morphism - open morphism - periodicity morphism - pregroup morphism - projective morphism - proper morphism - pseudosmooth morphism - quasicompact morphism - quasifinite morphism - quasiprojective morphism - quotient morphism - ramified morphism - restriction morphism - semilattice morphism - separated morphism - shape morphism - simplicial morphism - splitting morphism - stable morphism - strong morphism - submersive morphism - substitution morphism - surjective morphism - terminal morphism - topological morphism - trace morphism - transfer morphism - transversal morphism - universal morphism - unramified morphism - zero morphism (математика) морфизмБольшой англо-русский и русско-английский словарь > morphism
-
5 morphism
-
6 расщепляющий морфизм
Большой англо-русский и русско-английский словарь > расщепляющий морфизм
См. также в других словарях:
Splitting lemma — In mathematics, and more specifically in homological algebra, the splitting lemma states that in any abelian category, the following statements for short exact sequence are equivalent. Given a short exact sequence with maps q and r: :0 ightarrow… … Wikipedia
Fibred category — Fibred categories are abstract entities in mathematics used to provide a general framework for descent theory. They formalise the various situations in geometry and algebra in which inverse images (or pull backs) of objects such as vector bundles … Wikipedia
Isomorphism theorem — In mathematics, specifically abstract algebra, the isomorphism theorems are three theorems that describe the relationship between quotients, homomorphisms, and subobjects. Versions of the theorems exist for groups, rings, vector spaces, modules,… … Wikipedia
Section (category theory) — In category theory, a branch of mathematics, a section (or coretraction) is a right inverse of a morphism. Dually, a retraction (or retract) is a left inverse. In other words, if and are morphisms whose composition is the identity morphism on Y,… … Wikipedia
Polymorphism (biology) — Light morph Jaguar (typical) Dark morph or melanistic Jaguar (about … Wikipedia
Exact sequence — In mathematics, especially in homological algebra and other applications of abelian category theory, as well as in differential geometry and group theory, an exact sequence is a (finite or infinite) sequence of objects and morphisms between them… … Wikipedia
Vector bundle — The Möbius strip is a line bundle over the 1 sphere S1. Locally around every point in S1, it looks like U × R, but the total bundle is different from S1 × R (which is a cylinder instead). In mathematics, a vector bundle is a… … Wikipedia
Separable polynomial — In mathematics, two slightly different notions of separable polynomial are used, by different authors. According to the most common one, a polynomial P(X) over a given field K is separable if all its roots are distinct in an algebraic closure of… … Wikipedia
Mayer–Vietoris sequence — In mathematics, particularly algebraic topology and homology theory, the Mayer–Vietoris sequence is an algebraic tool to help compute algebraic invariants of topological spaces, known as their homology and cohomology groups. The result is due to… … Wikipedia
Ramification — In mathematics, ramification is a geometric term used for branching out , in the way that the square root function, for complex numbers, can be seen to have two branches differing in sign. It is also used from the opposite perspective (branches… … Wikipedia
Motive (algebraic geometry) — For other uses, see Motive (disambiguation). In algebraic geometry, a motive (or sometimes motif, following French usage) denotes some essential part of an algebraic variety . To date, pure motives have been defined, while conjectural mixed… … Wikipedia