-
1 invariant subalgebra
Математика: идеал алгебры, инвариантная подалгебра -
2 invariant subalgebra
мат.инвариантная подалгебра, идеал алгебрыEnglish-Russian scientific dictionary > invariant subalgebra
-
3 subalgebra
подалгебра compactly embedded subalgebra ≈ компактно вложенная подалгебра uniformly closed subalgebra ≈ равномерно замкнутая подалгебра weak-star closed subalgebra ≈ замкнутая подалгебра в слабой топологии сопряженного пространства - acceptable subalgebra - analytical subalgebra - ascendant subalgebra - central subalgebra - characteristic subalgebra - closed subalgebra - commutative subalgebra - complete subalgebra - dense subalgebra - diagonal subalgebra - division subalgebra - graded subalgebra - invariant subalgebra - least subalgebra - marginal subalgebra - matrix subalgebra - maximal subalgebra - minimal subalgebra - n-dimensional subalgebra - nilpotent subalgebra - normal subalgebra - nuclear subalgebra - one-element subalgebra - proper subalgebra - pure subalgebra - quasiseparable subalgebra - reductive subalgebra - regular subalgebra - restricted subalgebra - self-adjoint subalgebra - semisimple subalgebra - separating subalgebra - spectral subalgebra - splittable subalgebra - splitting subalgebra - sufficient subalgebra - triangular subalgebra - trivial subalgebra - verbal subalgebraБольшой англо-русский и русско-английский словарь > subalgebra
-
4 sub(-)algebra
-
5 sub(-)algebra
См. также в других словарях:
Invariant theory — is a branch of abstract algebra that studies actions of groups on algebraic varieties from the point of view of their effect on functions. Classically, the theory dealt with the question of explicit description of polynomial functions that do not … Wikipedia
Invariant subspace — In mathematics, an invariant subspace of a linear mapping : T : V rarr; V from some vector space V to itself is a subspace W of V such that T ( W ) is contained in W . An invariant subspace of T is also said to be T invariant.If W is T invariant … Wikipedia
Ergodicity — For other uses, see Ergodic (disambiguation). In mathematics, the term ergodic is used to describe a dynamical system which, broadly speaking, has the same behavior averaged over time as averaged over space. In physics the term is used to imply… … Wikipedia
Superselection sector — A superselection sector is a concept used in quantum mechanics when a representation of a * algebra is decomposed into irreducible components. It formalizes the idea that not all self adjoint operators are observables because the relative phase… … Wikipedia
analysis — Synonyms and related words: Baconian method, Boolean algebra, Euclidean geometry, Fourier analysis, Lagrangian function, a fortiori reasoning, a posteriori reasoning, a priori reasoning, abstraction, accounting, airing, algebra, algebraic… … Moby Thesaurus
arithmetic — Synonyms and related words: Boolean algebra, Euclidean geometry, Fourier analysis, Lagrangian function, algebra, algebraic geometry, analysis, analytic geometry, associative algebra, binary arithmetic, calculation, calculus, ciphering, circle… … Moby Thesaurus
mathematics — Synonyms and related words: Boolean algebra, Euclidean geometry, Fourier analysis, Lagrangian function, algebra, algebraic geometry, algorism, algorithm, analysis, analytic geometry, applied mathematics, arithmetic, associative algebra, binary… … Moby Thesaurus
trigonometry — Synonyms and related words: Boolean algebra, Euclidean geometry, Fourier analysis, Lagrangian function, algebra, algebraic geometry, analysis, analytic geometry, arithmetic, associative algebra, binary arithmetic, calculus, circle geometry,… … Moby Thesaurus
Dynkin diagram — See also: Coxeter–Dynkin diagram Finite Dynkin diagrams Affine (extended) Dynkin diagrams … Wikipedia
Lorentz group — Group theory Group theory … Wikipedia
Spin representation — In mathematics, the spin representations are particular projective representations of the orthogonal or special orthogonal groups in arbitrary dimension and signature (i.e., including indefinite orthogonal groups). More precisely, they are… … Wikipedia
