Higher Dimensional Unitary Braid Matrices: Construction, Associated Structures and Entanglements

Abstract

We construct (2n)2× (2n)2 unitary braid matrices R for n≥ 2 generalizing the class known for n=1. A set of (2n)× (2n) matrices (I,J,K,L) are defined. R is expressed in terms of their tensor products (such as K J), leading to a canonical formulation for all n. Complex projectors P provide a basis for our real, unitary R. Baxterization is obtained. Diagonalizations and block-diagonalizations are presented. The loss of braid property when R (n>1) is block-diagonalized in terms of R (n=1) is pointed out and explained. For odd dimension (2n+1)2× (2n+1)2, a previously constructed braid matrix is complexified to obtain unitarity. RLL- and RTT-algebras, chain Hamiltonians, potentials for factorizable S-matrices, complex non-commutative spaces are all studied briefly in the context of our unitary braid matrices. Turaev construction of link invariants is formulated for our case. We conclude with comments concerning entanglements.

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