- symplectic algebra
- мат. симплектическая алгебра
Большой англо-русский и русско-английский словарь. 2001.
symplectic algebra
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Symplectic group — For finite groups with all characteristc abelian subgroups cyclic, see group of symplectic type. Group theory … Wikipedia
Symplectic representation — In mathematical field of representation theory, a symplectic representation is a representation of a group or a Lie algebra on a symplectic vector space ( V , omega; ) which preserves the symplectic form omega; . Here omega; is a nondegenerate… … Wikipedia
Symplectic matrix — In mathematics, a symplectic matrix is a 2n times; 2n matrix M (whose entries are typically either real or complex) satisfying the condition:M^T Omega M = Omega,.where MT denotes the transpose of M and Omega; is a fixed nonsingular, skew… … Wikipedia
Symplectic vector field — In physics and mathematics, a symplectic vector field is one whose flow preserves a symplectic form. That is, if (M,omega) is a symplectic manifold, then a vector field Xinmathfrak{X}(M) is symplectic if its flow preserves the symplectic… … Wikipedia
Poisson algebra — In mathematics, a Poisson algebra is an associative algebra together with a Lie bracket that also satisfies Leibniz law; that is, the bracket is also a derivation. Poisson algebras appear naturally in Hamiltonian mechanics, and are also central… … Wikipedia
Compact Lie algebra — Lie groups … Wikipedia
Exterior algebra — In mathematics, the exterior product or wedge product of vectors is an algebraic construction generalizing certain features of the cross product to higher dimensions. Like the cross product, and the scalar triple product, the exterior product of… … Wikipedia
Geometric algebra — In mathematical physics, a geometric algebra is a multilinear algebra described technically as a Clifford algebra over a real vector space equipped with a non degenerate quadratic form. Informally, a geometric algebra is a Clifford algebra that… … Wikipedia
Symmetric algebra — In mathematics, the symmetric algebra S ( V ) (also denoted Sym ( V )) on a vector space V over a field K is the free commutative unital associative K algebra containing V .It corresponds to polynomials with indeterminates in V , without choosing … Wikipedia
Lie algebra representation — Lie groups … Wikipedia
Weyl algebra — In abstract algebra, the Weyl algebra is the ring of differential operators with polynomial coefficients (in one variable),: f n(X) partial X^n + cdots + f 1(X) partial X + f 0(X).More precisely, let F be a field, and let F [ X ] be the ring of… … Wikipedia
