Q-exponential

In combinatorial mathematics, a q-exponential is a q-analog of the exponential function, namely the eigenfunction of a q-derivative. There are many q-derivatives, for example, the classical q-derivative, the Askey–Wilson operator, etc. Therefore, unlike the classical exponentials, q-exponentials are not unique. For example, $e_{q}(z)$ is the q-exponential corresponding to the classical q-derivative while ${\mathcal {E}}_{q}(z)$ are eigenfunctions of the Askey–Wilson operators.

The q-exponential is also known as the quantum dilogarithm.^[1]^[2]

^ Zudilin, Wadim (14 March 2006). "Quantum dilogarithm" (PDF). wain.mi.ras.ru. Retrieved 16 July 2021.
^ Faddeev, L.d.; Kashaev, R.m. (1994-02-20). "Quantum dilogarithm". Modern Physics Letters A. 09 (5): 427–434. arXiv:hep-th/9310070. Bibcode:1994MPLA....9..427F. doi:10.1142/S0217732394000447. ISSN 0217-7323. S2CID 119124642.

[1] Zudilin, Wadim (14 March 2006). "Quantum dilogarithm" (PDF). wain.mi.ras.ru. Retrieved 16 July 2021.

[2] Faddeev, L.d.; Kashaev, R.m. (1994-02-20). "Quantum dilogarithm". Modern Physics Letters A. 09 (5): 427–434. arXiv:hep-th/9310070. Bibcode:1994MPLA....9..427F. doi:10.1142/S0217732394000447. ISSN 0217-7323. S2CID 119124642.

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