orthogonality's Usage Examples:

In mathematics, orthogonality is the generalization of the notion of perpendicularity to the linear algebra of bilinear forms.

instance of the more general mathematical concept of orthogonality; perpendicularity is the orthogonality of classical geometric objects.

In geometry, the relation of hyperbolic orthogonality between two lines separated by the asymptotes of a hyperbola is a concept used in special relativity.

significantly reversed the trend against more orthogonality.

Modern CPUs often simulate orthogonality in a pre-processing step before performing the.

Birkhoff orthogonality Two vectors x and y in a normed linear space are said to be Birkhoff.

orthonormal basis for the space of class-functions, and this yields the orthogonality relation for the rows of the character table: ⟨ χ i , χ j ⟩ = { 0  if .

bilinear form to be symmetric and substitutes the energy minimization with orthogonality constrains determined by the same basis functions that are used to approximate.

One argument for the orthogonality thesis is that some AI designs appear to have orthogonality built into them; in such a design, changing.

In mathematics, the Schur orthogonality relations, which were proven by Issai Schur through Schur's lemma, express a central fact about representations.

meaning lines that form right angles at their point of intersection, and orthogonality, which is the property of forming right angles, usually applied to vectors.

the orthogonality principle is a necessary and sufficient condition for the optimality of a Bayesian estimator.

Loosely stated, the orthogonality principle.

In computer programming, orthogonality means that operations change just one thing without affecting others.

frequency are out of phase with each other by 90°, a condition known as orthogonality or quadrature.

stationary point of the Lagrangian under variations of ψi and RI, with the orthogonality constraint.

orthogonality to P 0 {\displaystyle P_{0}} and P 1 {\displaystyle P_{1}} , and so on.

P n {\displaystyle P_{n}} is fixed by demanding orthogonality to.

That is, a sesquilinear form is reflexive precisely when the derived orthogonality relation is symmetric.

The Anderson orthogonality theorem is a theorem in physics by the physicist P.

Synonyms:

oblongness; rectangularity;

Antonyms:

roundness; agonist;