The Heisenberg Algebra and Spin

Within a group-theoretical approach to the description of (2+1)-dimensional anyons, the minimal covariant set of linear differential equations is constructed for the fractional spin fields with the help of the deformed Heisenberg algebra (DHA), [a & , a + ]=1+&K, involving the Klein operator K, [K,

We discuss the amazing interconnections between normal form theory, classical invariant theory and transvectants, modular forms and Rankin-Cohen brackets, representations of the Heisenberg algebra, differential invariants, solitons, Hirota operators, star products and Moyal brackets, and coherent st

Irreducible representations of the convolution algebra M(H n ) of bounded regular complex Borel measures on the Heisenberg group H n are analyzed. For the Segal Bargmann representation \, the C\*-algebra generated by \[M(H n )] is just the C\*-algebra generated by Berezin Toeplitz operators with pos

We prove a fundamental case of a conjecture of the first author which expresses the homology of the extension of the Heisenberg Lie algebra by C½t=ðt kþ1 Þ in terms of the homology of the Heisenberg Lie algebra itself. More specifically, we show that both the 0th and ðk þ 1Þth x-graded components of

Spin models were introduced by Vaughan Jones to construct invariants of knots and links (Pac. J. Math. 137 (1989), 311-336). This paper summarizes recent (1995)(1996)(1997) results on spin models in connection with Bose-Mesner algebras.