-
1 graded morphism
Математика: градуированный морфизм -
2 graded morphism
-
3 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
-
4 morphism
-
5 градуированный морфизм
Большой англо-русский и русско-английский словарь > градуированный морфизм
См. также в других словарях:
Graded algebra — In mathematics, in particular abstract algebra, a graded algebra is an algebra over a field (or commutative ring) with an extra piece of structure, known as a gradation (or grading ). Graded rings A graded ring A is a ring that has a direct sum… … Wikipedia
Graded category — A graded category is a mathematical concept.If mathcal{A} is a category, then amathcal{A} graded categoryis a category mathcal{C} together with a functorF:mathcal{C} ightarrow mathcal{A}.Monoids and groups can be thought of categories with a… … Wikipedia
Differential graded category — In mathematics, especially homological algebra, a differential graded category or DG category for short, is a category whose morphism sets are endowed with the additional structure of a differential graded Z module. In detail, this means that… … Wikipedia
Poincaré–Birkhoff–Witt theorem — In the theory of Lie algebras, the Poincaré–Birkhoff–Witt theorem (Poincaré (1900), G. D. Birkhoff (1937), Witt (1937); frequently contracted to PBW theorem) is a result giving an explicit description of the universal enveloping algebra of a Lie… … Wikipedia
Free Lie algebra — In mathematics, a free Lie algebra, over a given field K, is a Lie algebra generated by a set X, without any imposed relations. Contents 1 Definition 2 Universal enveloping algebra 3 Hall sets … Wikipedia
Glossary of scheme theory — This is a glossary of scheme theory. For an introduction to the theory of schemes in algebraic geometry, see affine scheme, projective space, sheaf and scheme. The concern here is to list the fundamental technical definitions and properties of… … Wikipedia
List of algebraic structures — In universal algebra, a branch of pure mathematics, an algebraic structure is a variety or quasivariety. Abstract algebra is primarily the study of algebraic structures and their properties. Some axiomatic formal systems that are neither… … Wikipedia
Outline of algebraic structures — In universal algebra, a branch of pure mathematics, an algebraic structure is a variety or quasivariety. Abstract algebra is primarily the study of algebraic structures and their properties. Some axiomatic formal systems that are neither… … Wikipedia
Singular homology — In algebraic topology, a branch of mathematics, singular homology refers to the study of a certain set of topological invariants of a topological space X , the so called homology groups H n(X). Singular homology is a particular example of a… … Wikipedia
Hilbert scheme — In algebraic geometry, a branch of mathematics, a Hilbert scheme is a scheme that is the parameter space for the closed subschemes of some projective space (or a more general scheme), refining the Chow variety. The Hilbert scheme is a disjoint… … Wikipedia
Connection (algebraic framework) — Geometry of quantum systems (e.g., noncommutative geometry and supergeometry) is mainly phrased in algebraic terms of modules and algebras. Connections on modules are generalization of a linear connection on a smooth vector bundle written as a… … Wikipedia
