We announce an analogue of the celebrated theorem by Campbell, Baker, Hausdorff, and Dynkin for the q-exponential exp_q(x)=sum_{n=0}^{infty} x^n/[n]_q!, with the usual notation for q-factorials: [n]_q! := [n-1]_q!*(q^n-1)/(q-1) and [0]_q! := 1. Our result states that if x and y are non-commuting indeterminates and [y,x]_q is the q-commutator yx - q xy, then there exist linear combinations Q_{i,j} (x,y) of iterated q-commutators with exactly i x's, j y's and [y,x]_q in their central position, such that exp_q(x) exp_q(y) = exp_q (x + y +sum_{i,j >= 1} Q_{i,j} (x,y)). Our expansion is consistent with the well-known result by Schutzenberger ensuring that one has exp_q (x) exp_q (y) = exp_q(x+y) if and only if [y, x]_q = 0, and it improves forme...
AbstractThere are two q-analogues for the exponential function, and each of them appears naturally a...
This paper provides three classes of q-summation formulas in the form of general contiguous extensio...
48 pagesThere is a striking similarity between Macdonald's reduced word formula and the image of the...
We announce an analogue of the celebrated theorem by Campbell, Baker, Hausdorff, and Dynkin for the ...
Motivated by the physical applications of q-calculus and of q-deformations, the aim of this paper is...
We revisit the q-deformed counterpart of the Zassenhaus formula, expressing the Jackson q-exponentia...
12 pages. Extended abstract accepted for FPSAC 2022; will eventually be replaced by a full-length pa...
Nonextensive statistical mechanics has been a source of investigation in mathematical structures suc...
AbstractDyson's celebrated constant term conjecture [F.J. Dyson, Statistical theory of the energy le...
F.H. Jackson defined a q-analogue of the factorial n! = 1∙2∙3 ⋯ n as (n!)q = 1∙ (1 + q) ∙ (1 + q + q...
Abstract. In this paper, we improve results of Gillot, Kumar and Moreno to estimate some exponential...
International audienceThe well-known Baker-Campbell-Hausdorff theorem in Lie theory says that the lo...
We give a combinatorial proof of a q-analogue of the classical formula for the sum of cubes
We give a combinatorial proof of a q-analogue of the classical formula for the sum of cubes.
AbstractLet (y)a=(1−y)(1−qy)…(1−qa−1y). We prove that the constant term of the Laurent polynomial Π1...
AbstractThere are two q-analogues for the exponential function, and each of them appears naturally a...
This paper provides three classes of q-summation formulas in the form of general contiguous extensio...
48 pagesThere is a striking similarity between Macdonald's reduced word formula and the image of the...
We announce an analogue of the celebrated theorem by Campbell, Baker, Hausdorff, and Dynkin for the ...
Motivated by the physical applications of q-calculus and of q-deformations, the aim of this paper is...
We revisit the q-deformed counterpart of the Zassenhaus formula, expressing the Jackson q-exponentia...
12 pages. Extended abstract accepted for FPSAC 2022; will eventually be replaced by a full-length pa...
Nonextensive statistical mechanics has been a source of investigation in mathematical structures suc...
AbstractDyson's celebrated constant term conjecture [F.J. Dyson, Statistical theory of the energy le...
F.H. Jackson defined a q-analogue of the factorial n! = 1∙2∙3 ⋯ n as (n!)q = 1∙ (1 + q) ∙ (1 + q + q...
Abstract. In this paper, we improve results of Gillot, Kumar and Moreno to estimate some exponential...
International audienceThe well-known Baker-Campbell-Hausdorff theorem in Lie theory says that the lo...
We give a combinatorial proof of a q-analogue of the classical formula for the sum of cubes
We give a combinatorial proof of a q-analogue of the classical formula for the sum of cubes.
AbstractLet (y)a=(1−y)(1−qy)…(1−qa−1y). We prove that the constant term of the Laurent polynomial Π1...
AbstractThere are two q-analogues for the exponential function, and each of them appears naturally a...
This paper provides three classes of q-summation formulas in the form of general contiguous extensio...
48 pagesThere is a striking similarity between Macdonald's reduced word formula and the image of the...