vertex$90088$ - definitie. Wat is vertex$90088$
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Wat (wie) is vertex$90088$ - definitie

ALGEBRAIC STRUCTURE
Vertex algebra; Vertex operator; Vertex Operator Algebra; Vertex algebras; Vertex operator superalgebra; Virasoro element; Vertex superalgebra; Vacuum module; Virasoro constraint; Virasoro vertex operator algebras; Virasoro vertex operator algebra

Universal vertex         
  • u}}
VERTEX OF AN UNDIRECTED GRAPH THAT IS ADJACENT TO ALL OTHER VERTICES OF THE GRAPH. IT MAY ALSO BE CALLED A DOMINATING VERTEX, AS IT FORMS A ONE-ELEMENT DOMINATING SET IN THE GRAPH
Dominating vertex; Cone (graph theory)
In graph theory, a universal vertex is a vertex of an undirected graph that is adjacent to all other vertices of the graph. It may also be called a dominating vertex, as it forms a one-element dominating set in the graph.
Vertex (geometry)         
  • Vertex B is an ear, because the [[open line segment]] between C and D is entirely inside the polygon. Vertex C is a mouth, because the open line segment between A and B is entirely outside the polygon.
  • A vertex of an angle is the endpoint where two line or rays come together.
SPECIAL KIND OF POINT THAT DESCRIBES THE CORNERS OR INTERSECTIONS OF GEOMETRIC SHAPES
Ear (mathematics); Mouth (mathematics); Principal vertex; Geometric vertex; Polyhedron vertex; Polytope vertex; 0-face
In geometry, a vertex (in plural form: vertices or vertexes), often denoted by letters such as S, P, Q, R, is a point where two or more curves, lines, or edges meet. As a consequence of this definition, the point where two lines meet to form an angle and the corners of polygons and polyhedra are vertices.
Ice-type model         
  • 500px
SQUARE LATTICE MODEL WHOSE STATE IS A SET OF ORIENTATIONS FOR EVERY EDGE SUCH THAT AT EACH VERTEX EXACTLY 2 ARROWS POINT INWARD
Six-vertex model; Six vertex model; Ice type model; 6 vertex model; 6-vertex model
In statistical mechanics, the ice-type models or six-vertex models are a family of vertex models for crystal lattices with hydrogen bonds. The first such model was introduced by Linus Pauling in 1935 to account for the residual entropy of water ice.

Wikipedia

Vertex operator algebra

In mathematics, a vertex operator algebra (VOA) is an algebraic structure that plays an important role in two-dimensional conformal field theory and string theory. In addition to physical applications, vertex operator algebras have proven useful in purely mathematical contexts such as monstrous moonshine and the geometric Langlands correspondence.

The related notion of vertex algebra was introduced by Richard Borcherds in 1986, motivated by a construction of an infinite-dimensional Lie algebra due to Igor Frenkel. In the course of this construction, one employs a Fock space that admits an action of vertex operators attached to elements of a lattice. Borcherds formulated the notion of vertex algebra by axiomatizing the relations between the lattice vertex operators, producing an algebraic structure that allows one to construct new Lie algebras by following Frenkel's method.

The notion of vertex operator algebra was introduced as a modification of the notion of vertex algebra, by Frenkel, James Lepowsky, and Arne Meurman in 1988, as part of their project to construct the moonshine module. They observed that many vertex algebras that appear 'in nature' carry an action of the Virasoro algebra, and satisfy a bounded-below property with respect to an energy operator. Motivated by this observation, they added the Virasoro action and bounded-below property as axioms.

We now have post-hoc motivation for these notions from physics, together with several interpretations of the axioms that were not initially known. Physically, the vertex operators arising from holomorphic field insertions at points in two-dimensional conformal field theory admit operator product expansions when insertions collide, and these satisfy precisely the relations specified in the definition of vertex operator algebra. Indeed, the axioms of a vertex operator algebra are a formal algebraic interpretation of what physicists call chiral algebras (not to be confused with the more precise notion with the same name in mathematics) or "algebras of chiral symmetries", where these symmetries describe the Ward identities satisfied by a given conformal field theory, including conformal invariance. Other formulations of the vertex algebra axioms include Borcherds's later work on singular commutative rings, algebras over certain operads on curves introduced by Huang, Kriz, and others, D-module-theoretic objects called chiral algebras introduced by Alexander Beilinson and Vladimir Drinfeld and factorization algebras, also introduced by Beilinson and Drinfeld.

Important basic examples of vertex operator algebras include the lattice VOAs (modeling lattice conformal field theories), VOAs given by representations of affine Kac–Moody algebras (from the WZW model), the Virasoro VOAs, which are VOAs corresponding to representations of the Virasoro algebra, and the moonshine module V, which is distinguished by its monster symmetry. More sophisticated examples such as affine W-algebras and the chiral de Rham complex on a complex manifold arise in geometric representation theory and mathematical physics.