A q-analog of the campbell-baker-hausdorff formula

An explicit formula for an arbitrary function of the evolution operator is derived. With its use, the continuous analog of the Baker-Campbell-Hausdorff problem is solved. The application of this result to the quantum theory of scattering leads to a new closed expression for the phase shifts in every

In this paper a \(q\)-analogue of the Coxeter complex of a finite Coxeter group \(W\) is constructed for the (generic) Hecke algebra \(\mathscr{H}\) associated to \(W\). It is shown that the homology of this chain complex, together with that of its truncations, vanishes away from top dimension. The

An addition and product formula for the Hahn Exton \(q\)-Bessel function, previously obtained by use of a quantum group theoretic interpretation, are proved analytically. A (formal) limit transition to the Graf addition formula and corresponding product formula for the Bessel function is given. 1995

As an application of a general q-difference equation for basic hypergeometric series well-poised in SU(n), an elementary proof is given of a q-analog of Holman's SU(n) generalization of the terminating sF4( 1) summation theorem. This provides an SC/(n) generalization of the terminating e@s summation