Heisenberg group and Nondegenerate form

Shortcuts: Differences, Similarities, Jaccard Similarity Coefficient, References.

Difference between Heisenberg group and Nondegenerate form

Heisenberg group vs. Nondegenerate form

In mathematics, the Heisenberg group H, named after Werner Heisenberg, is the group of 3×3 upper triangular matrices of the form \end under the operation of matrix multiplication. In linear algebra, a nondegenerate form or nonsingular form is a bilinear form that is not degenerate, meaning that v \mapsto (x \mapsto f(x,v)) is an isomorphism, or equivalently in finite dimensions, if and only if.

Similarities between Heisenberg group and Nondegenerate form

Heisenberg group and Nondegenerate form have 2 things in common (in Unionpedia): Bilinear form, Symplectic vector space.

Bilinear form

In mathematics, more specifically in abstract algebra and linear algebra, a bilinear form on a vector space V is a bilinear map, where K is the field of scalars.

Bilinear form and Heisenberg group · Bilinear form and Nondegenerate form · See more »

Symplectic vector space

In mathematics, a symplectic vector space is a vector space V over a field F (for example the real numbers R) equipped with a symplectic bilinear form.

Heisenberg group and Symplectic vector space · Nondegenerate form and Symplectic vector space · See more »

The list above answers the following questions

What Heisenberg group and Nondegenerate form have in common
What are the similarities between Heisenberg group and Nondegenerate form

Heisenberg group and Nondegenerate form Comparison

Heisenberg group has 96 relations, while Nondegenerate form has 8. As they have in common 2, the Jaccard index is 1.92% = 2 / (96 + 8).

References

This article shows the relationship between Heisenberg group and Nondegenerate form. To access each article from which the information was extracted, please visit:

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