Ordering relations for q-boson operators, continued fraction techniques and the q-CBH enigma

Ordering properties of boson operators have been very extensively studied, and q-analogues of many of the relevant techniques have been derived. These relations have far reaching physical applications and, at the same time, provide a rich and interesting source of combinatorial identities and of their g-analogues. An interesting exception involves the transformation from symmetric to normal ordering, which, for conventional boson operators, can most simply be effected using a special case of the Campbell-Baker-Hausdorff (CBH) formula. To circumvent the lack of a suitable q-analogue of the CBH formula, two alternative procedures are proposed, based on a recurrence relation and on a double continued fraction, respectively. These procedures enrich the repertoire of techniques available in this field. For conventional bosons they result in an expression that coincides with that derived using the CBH formula.

[1]  M. Kashiwara,et al.  On crystal bases of the $Q$-analogue of universal enveloping algebras , 1991 .

[2]  Kevin Cahill,et al.  Ordered Expansions in Boson Amplitude Operators , 1969 .

[3]  A no‐go theorem for a Lie‐consistent q‐Campbell–Baker–Hausdorff expansion , 1994 .

[4]  Coherent states of theq-canonical commutation relations , 1993, funct-an/9303002.

[5]  Exponential mapping for non-semisimple quantum groups , 1993, hep-th/9311114.

[6]  Harold Exton,et al.  q-hypergeometric functions and applications , 1983 .

[7]  Michelle L. Wachs,et al.  p, q-Stirling numbers and set partition statistics , 1990, J. Comb. Theory A.

[8]  H. Gould The $q$-Stirling numbers of first and second kinds , 1961 .

[9]  Jean Berstel,et al.  Rational series and their languages , 1988, EATCS monographs on theoretical computer science.

[10]  Metin Arik,et al.  Hilbert spaces of analytic functions and generalized coherent states , 1976 .

[11]  Jacob Katriel,et al.  Normal ordering for deformed boson operators and operator-valued deformed Stirling numbers , 1992 .

[12]  L. C. Biedenharn,et al.  The quantum group SUq(2) and a q-analogue of the boson operators , 1989 .

[13]  Leonard Carlitz,et al.  On abelian fields , 1933 .

[14]  A. J. Macfarlane,et al.  On q-analogues of the quantum harmonic oscillator and the quantum group SU(2)q , 1989 .

[15]  Nicolai Reshetikhin,et al.  Quantum Groups , 1993 .

[16]  A. Solomon,et al.  An analogue of the unitary displacement operator for the q-oscillator , 1994 .