On generalized Clifford algebraC 4 (n) andGL q (2;C) quantum group

Abstract

The non commuting matrix elements of matrices from quantum groupGL q (2;C) withq≡ω being then-th root of unity are given a representation as operators in Hilbert space with help ofC 4 generalized Clifford algebra generators appropriately tensored with unit 2×2 matrix infinitely many times. Specific properties of such a representation are presented. Relevance of generalized Pauli algebra to azimuthal quantization of angular momentum ala Levy-Leblond [10] and to polar decomposition ofSU q (2;C) quantum algebra ala Chaichian and Ellinas [6] is also commented. The case ofq∈C, |q|=1 may be treated parallely.