Multilinear form

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English

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Noun

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Template:Lb Given a vector space V over a field K of scalars, a mapping V^k → K that is linear in each of its arguments;
Template:Lb a similarly multiply linear mapping M^r → R defined for a given module M over some commutative ring R.
- 1985, Jack Peetre, Paracommutators and Minimal Spaces, S. C. Power (editor) Operators and Function Theory, Kluwer Academic (D. Reidel), page 163,
  Finally, in the short Lecture 5 we make some remarks on multilinear forms over Hilbert spaces, a theory which is still in a rather embryonic state, motivated by the observation that paracommutators (and Hankel operators too) really should be viewed as forms, not operators.
- 1994, Hessam Khoshnevisan, Mohamad Afshar, Mechanical Elimination of Commutative Redundancy, Baudouin Le Charlier (editor), Static Analysis: 1st International Static Analysis Symposium, Proceedings, Volume 1, Springer, Template:W 864, page 454,
  A multilinear form is said to be degenerate if all its function variables are identical. Thus a degenerate $m$ -multilinear form can more concisely be written as $M f$ .
- Template:Quote-book

Usage notes

A multilinear form $V^{k} \to K$ (which has $k$ variables) is called a multilinear $k$ -form.
A multilinear $k$ -form on $V$ over $ℝ$ is called a (Template:M) $k$ -Template:M, and the vector space of such forms is usually denoted $𝒯^{k} (V)$ or $ℒ^{k} (V)$ . (But note that many authors use an opposite convention, writing $𝒯^{k} (V)$ for the contravariant $k$ -tensors on $V$ and $𝒯_{k} (V)$ for the covariant ones.)
A multilinear form differs from a Template:L in that the former maps to a field of scalars, whereas the latter maps, in the general case, to a cross product of vector spaces.

Synonyms

Template:Sense Template:L

Hyponyms

Template:Sense Template:L, Template:L, Template:L

Derived terms

Template:L, multilinear k-form

Translations

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Spanish: Template:T, Template:T

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See also

Further reading

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