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Qu'est-ce (qui) est quasi-Hermitian - définition

A SET OF N³ + 1 POINTS ARRANGED INTO SUBSETS OF N + 1

Hermitian variety

Hermitian Yang–Mills connection

A HERMITIAN HOLOMORPHIC VECTOR BUNDLE OVER A KÄHLER MANIFOLD, WHOSE CHERN CONNECTION’S CURVATURE SATISFIES EINSTEIN’S EQUATIONS (I.E. EQUALS THE IDENTITY TIMES A CONSTANT)

Hermitian–Einstein metric; Einstein-Hermitian vector bundle; Hermitian-Einstein vector bundle; Hermitian–Einstein vector bundle; Einstein–Hermitian metric; Einstein-Hermitian metric; Hermitian-Einstein metric; Hermitian-Einstein connection; Hermitian–Einstein connection; Einstein-Hermitian connection; Einstein–Hermitian connection; Einstein–Hermitian vector bundle; Hermite-Einstein connection; Hermite–Einstein connection; Hermite-Einstein vector bundle; Hermite-Einstein metric; Hermitian Yang-Mills equations; Hermitian Yang-Mills connection; Hermitian Yang–Mills equation; Hermitian Yang-Mills equation; Hermitian Yang–Mills equations; Hermite–Einstein metric

In mathematics, and in particular gauge theory and complex geometry, a Hermitian Yang–Mills connection (or Hermite-Einstein connection) is a Chern connection associated to an inner product on a holomorphic vector bundle over a Kähler manifold that satisfies an analogue of Einstein's equations: namely, the contraction of the curvature 2-form of the connection with the Kähler form is required to be a constant times the identity transformation. Hermitian Yang–Mills connections are special examples of Yang–Mills connections, and are often called instantons.

https://en.wikipedia.org/wiki/Hermitian_Yang–Mills_connection

Quasi-market

TYPE OF EXCHANGE SYSTEM

Quasi market

Quasi-markets, are markets which can be supervised and organisationally designed that are intended to create greater desire and more efficiency in comparison to conventional delivery systems, while supporting more accessibility, stability and impartiality than traditional markets. Quasi-markets also can be referred to as internal or planned markets.

https://en.wikipedia.org/wiki/Quasi-market

Quasi-constitutionality

CANADIAN TERM FOR A LAW THAT OVERRIDES REGULAR LAWS BUT IS NOT PART OF THE CONSTITUTION

Quasi-constitutionality (Canada); Quasi-constitutional; Quasi-consitutionality

In Canada, the term quasi-constitutional is used for laws which remain paramount even when subsequent statutes, which contradict them, are enacted by the same legislature. This is the reverse of the normal practice, under which newer laws trump any contradictory provisions in any older statute.

https://en.wikipedia.org/wiki/Quasi-constitutionality

Wikipédia

Unital (geometry)

In geometry, a unital is a set of n³ + 1 points arranged into subsets of size n + 1 so that every pair of distinct points of the set are contained in exactly one subset. This is equivalent to saying that a unital is a 2-(n³ + 1, n + 1, 1) block design. Some unitals may be embedded in a projective plane of order n² (the subsets of the design become sets of collinear points in the projective plane). In this case of embedded unitals, every line of the plane intersects the unital in either 1 or n + 1 points. In the Desarguesian planes, PG(2,q²), the classical examples of unitals are given by nondegenerate Hermitian curves. There are also many non-classical examples. The first and the only known unital with non prime power parameters, n=6, was constructed by Bhaskar Bagchi and Sunanda Bagchi. It is still unknown if this unital can be embedded in a projective plane of order 36, if such a plane exists.

https://en.wikipedia.org/wiki/Unital (geometry)