Abstract: We construct the Euclidean Hopf algebra $U_q(e^N)$ dual of $Fun(R_q^N\lcross SO_{q^{-1}}(N))$ by realizing it as a subalgebra of the differential algebra $\DFR$ on the quantum Euclidean space $R_q^N$; in fact, we extend our previous realization of $U_{q^{-1}}(so(N))$ within $\DFR$ through the introduction of q-derivatives as generators of q-translations. The fundamental Hilbert space representations of $U_q(e^N)$ turn out to be of highest weight type and rather simple `` lattice-regularized '' versions of the classical ones. The vectors of a basis of the singlet (i.e. zero-spin) irrep can be realized as normalizable functions on $R_q^N$, going to distributions in the limit $q\rightarrow 1$.
The Euclidean Hopf algebra U_q(e^N) and its fundamental Hilbert space representations / Fiore, Gaetano. - In: JOURNAL OF MATHEMATICAL PHYSICS. - ISSN 0022-2488. - STAMPA. - 36:(1995), pp. 4363-4405.
The Euclidean Hopf algebra U_q(e^N) and its fundamental Hilbert space representations
FIORE, GAETANO
1995
Abstract
Abstract: We construct the Euclidean Hopf algebra $U_q(e^N)$ dual of $Fun(R_q^N\lcross SO_{q^{-1}}(N))$ by realizing it as a subalgebra of the differential algebra $\DFR$ on the quantum Euclidean space $R_q^N$; in fact, we extend our previous realization of $U_{q^{-1}}(so(N))$ within $\DFR$ through the introduction of q-derivatives as generators of q-translations. The fundamental Hilbert space representations of $U_q(e^N)$ turn out to be of highest weight type and rather simple `` lattice-regularized '' versions of the classical ones. The vectors of a basis of the singlet (i.e. zero-spin) irrep can be realized as normalizable functions on $R_q^N$, going to distributions in the limit $q\rightarrow 1$.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
