Search results for "Orthogonal complement"

showing 3 items of 3 documents

Polynomial identities for the Jordan algebra of a degenerate symmetric bilinear form

2013

Let J(n) be the Jordan algebra of a degenerate symmetric bilinear form. In the first section we classify all possible G-gradings on J(n) where G is any group, while in the second part we restrict our attention to a degenerate symmetric bilinear form of rank n - 1, where n is the dimension of the vector space V defining J(n). We prove that in this case the algebra J(n) is PI-equivalent to the Jordan algebra of a nondegenerate bilinear form.

Discrete mathematicsSymmetric algebraNumerical AnalysisPure mathematicsAlgebra and Number TheoryJordan algebraRank (linear algebra)Symmetric bilinear formPolynomial identities gradings Jordan algebraOrthogonal complementBilinear formSettore MAT/02 - AlgebraDiscrete Mathematics and CombinatoricsGeometry and TopologyAlgebra over a fieldMathematicsVector spaceLinear Algebra and its Applications

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Convolution of three functions by means of bilinear maps and applications

1999

When dealing with spaces of vector-valued analytic functions there is a natural way to understand multipliers between them. If X and Y are Banach spaces and L(X,Y ) stands for the space of linear and continuous operators we may consider the convolution of L(X,Y )-valued analytic functions, say F (z) = ∑ n=0∞ Tnz , and X-valued polynomials, say f(z) = ∑m n=0 xnz , to get the Y -valued function F ∗ f(z) = ∑ Tn(xn)z. The second author considered such a definition and studied multipliers between H(X) and BMOA(Y ) in [5]. When the functions take values in a Banach algebra A then the natural extension of multiplier is simply that if f(z) = ∑ anz n and g(z) = ∑ bnz , then f ∗ g(z) = ∑ an.bnz n whe…

Discrete mathematicsSymmetric bilinear formSesquilinear formGeneral MathematicsBanach spaceOrthogonal complementBilinear formMultiplier (Fourier analysis)46E40Tensor productInterpolation space46B2846G25MathematicsIllinois Journal of Mathematics

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Spacelike energy of timelike unit vector fields on a Lorentzian manifold

2004

On a Lorentzian manifold, we define a new functional on the space of unit timelike vector fields given by the L2 norm of the restriction of the covariant derivative of the vector field to its orthogonal complement. This spacelike energy is related with the energy of the vector field as a map on the tangent bundle endowed with the Kaluza–Klein metric, but it is more adapted to the situation. We compute the first and second variation of the functional and we exhibit several examples of critical points on cosmological models as generalized Robertson–Walker spaces and Godel universe, on Einstein and contact manifolds and on Lorentzian Berger’s spheres. For these critical points we have also stu…

Tangent bundleMathematical analysisGeneral Physics and AstronomyOrthogonal complementCongruence (general relativity)ManifoldCovariant derivativeGeneral Relativity and Quantum CosmologyDifferential geometryUnit vectorVector fieldMathematics::Differential GeometryGeometry and TopologyMathematical PhysicsMathematicsMathematical physicsJournal of Geometry and Physics

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