Isotropic quadratic form information

In mathematics, a quadratic form over a field F is said to be isotropic if there is a non-zero vector on which the form evaluates to zero. Otherwise it...

simultaneously zero, then it is a definite quadratic form; otherwise it is an isotropic quadratic form. Quadratic forms occupy a central place in various branches...

vectors of V. An indefinite quadratic form takes on both positive and negative values and is called an isotropic quadratic form. More generally, these definitions...

mathematics, given a vector space X with an associated quadratic form q, written (X, q), a null vector or isotropic vector is a non-zero element x of X for which...

is an isotropic quadratic form. If Q has the same sign for all non-zero vectors, it is a definite quadratic form or an anisotropic quadratic form. There...

homogeneity. Isotropic quadratic form A quadratic form q is said to be isotropic if there is a non-zero vector v such that q(v) = 0; such a v is an isotropic vector...

In the geometry of quadratic forms, an isotropic line or null line is a line for which the quadratic form applied to the displacement vector between any...

{x^{*}}{N(x)}}} . When there is a non-zero null vector, N is an isotropic quadratic form, and "the algebra splits". Every unital composition algebra over...

an isotropic quadratic form; transformations preserving this form are sometimes called "isometries", and the collection of them is then said to form an...

hyperbolic geometry (a non-Euclidean geometry) The hyperbolic plane as isotropic quadratic form Hyperbolic quaternions, a non-associative algebra, precursor to...

~uu^{*}-vv^{*}~} in the definition of SU(1,1) is an Hermitian form which becomes an isotropic quadratic form when u and v are expanded with their real components...

functions in the x and y over F. Isotropic quadratic forms are multiplicative. For anisotropic quadratic forms, Pfister forms are multiplicative, and conversely...

Every global and local field is linked since all quadratic forms of degree 6 over such fields are isotropic. The following properties of F are equivalent:: 342 ...

identity matrix. Isotropic vector In a vector space with a quadratic form, a non-zero vector for which the form is zero. Isotropic quadratic form A vector space...

} and a quadratic form N , {\displaystyle N,} which is called the "norm". In several cases N {\displaystyle N} is an isotropic quadratic form so that...

preserve the quadratic form of spacetime and are akin to orthogonal transformations, though with respect to an isotropic quadratic form. The liberties...

now reversed, the form Q(ξ) = x defines, for each spinor ξ, a vector x quadratically in the components of ξ. If this quadratic form is polarized, it determines...

the symplectic form reduces to a simple quadratic form. If In denotes the n × n identity matrix then the matrix, Ω, of this quadratic form is given by the...

In mathematics, the Arf invariant of a nonsingular quadratic form over a field of characteristic 2 was defined by Turkish mathematician Cahit Arf (1941)...

requirement that the stress derives from an elastic energy potential. For isotropic materials, the elasticity tensor has just two independent components,...