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Quaestiones Mathematicae Volume 46, 2023 - Issue 1
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Research Article

Normal ordering in the shift algebra and the dual of Spivey’s identity

Matthias SchorkIm Haindell 99, 65843Sulzbach, Germany.Correspondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-9759-6618
ORCID Icon
Pages 173-180 | Received 09 Jul 2021, Published online: 17 Jan 2022

References

  • P. Blasiak and P. Flajolet, Combinatorial models of creation-annihilation, Śem. Lothar. Combin. 65 (2011), Art. B65c.
  • C.C. Chen and K.M. Kho, Principles and techniques in combinatorics, World Scientific Publishing Co., Singapore, 1992.
  • R.L. Graham, D.E. Knuth, and O. Patashnik, Concrete mathematics: a founda- tion for computer science, 2nd. ed., Addison-Wesley Publishing Group, Amsterdam, 1994.
  • J. Katriel, On a generalized recurrence for Bell numbers, J. Integer Seq. 11 (2008), Art. 08.3.8.
  • M.M. Mangontarum, Spivey’s Bell Number Formula Revisited, J. Integer Seq. 21 (2018), Art. 18.1.1.
  • M.M. Mangontarum and A.M. Dibagulun, Some generalizations of Spivey’s Bell number formula, Matimyás Mat. 40 (2017), 1–11.
  • T. Mansour and M. Schork, Commutation relations, normal ordering, and Stirling numbers, CRC Press, Boca Raton, FL, 2016.
  • I. Mező, The dual of Spivey’s Bell number formula, J. Integer Seq. 15 (2012), Art. 12.2.4.
  • A.F. Neto, The dual of Spivey’s Bell number identity from Zeon algebra, J. Integer Seq. 20 (2017), Art. 17.2.3.
  • L. Oussi, A (p, q)-deformed recurrence for the Bell numbers, J. Integer Seq. 23 (2020), Art. 20.5.2.
  • L. Oussi, (p, q)-Analogues of the generalized Touchard polynomials and Stirling numbers, Preprint 2021, arXiv:2106.12935 [math.CO].
  • H. Scherk, De evolvenda functione (yd·yd·yd . . . yd X)/dx disquisitiones nonnullae analyticae, (Ph.D. Thesis), University of Berlin, 1823.
  • M. Schork, Recent developments in combinatorial aspects of normal ordering, Enu- mer. Combin. Appl. 1 (2021), Article S2S2.
  • M. Schork, File placements, fractional matchings, and normal ordering, Preprint 2021, submitted.
  • M. Shattuck, Generalized r-Lah numbers, Proc. Indian Acad. Sci. Math. Sci. 126 (2016), 461–478.
  • M. Shattuck, Generalizations of Bell number formulas of Spivey and Mezo˝, Filomat 30 (2016), 2683–2694.
  • N.J.A. Sloane, The On-line Encyclopedia of Integer Sequences, http://oeis.org/
  • M.Z. Spivey, A generalized recurrence for Bell numbers, J. Integer Seq. 11 (2008), Art. 08.2.5.
  • O.V. Viskov, About the identity of L.B. Redei on the Laguerre polynomials, Acta Sci. Math. (Szeged) 39 (1977), 27–28. (In Russian)
  • O.V. Viskov. Sack theorem for translation operators, Dokl. Math. 51 (1995), 79–82.

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