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About this page

  • This is part of the series of OEIS Wiki pages that list works citing the OEIS.
  • Additions to these pages are welcomed.
  • But if you add anything to these pages, please be very careful — remember that this is a scientific database. Spell authors' names, titles of papers, journal names, volume and page numbers, etc., carefully, and preserve the alphabetical ordering.
  • If you are unclear about what to do, contact one of the Editors-in-Chief before proceeding.
  • Works are arranged in alphabetical order by author's last name.
  • Works with the same set of authors are arranged by date, starting with the oldest.
  • This section lists works in which the first author's name begins with Q.
  • The full list of sections is: A Ba Bi Ca Ci D E F G H I J K L M N O P Q R Sa Sl T U V W X Y Z.
  • For further information, see the main page for Works Citing OEIS.

References

  1. QI ("Quite Interesting", British quiz TV program) mentioned OEIS in Series I, episode 10, "Inland Revenue", Nov 11 2011 (XL edition Nov 12). The OEIS reference is at time offset 27:20 (or 29:24 for the truly impatient).
  2. Feng Qi, An Explicit Formula for Bell Numbers in Terms of Stirling Numbers and Hypergeometric Functions, arXiv:1402.2361, 2014.
  3. Feng Qi, On Sum of the Lah Numbers and zeros of the Kummer Confluent hypergeometric Function, 2015
  4. Feng Qi, An Explicit Formula for the Bell Numbers in Terms of the Lah and Stirling Numbers, Mediterranean Journal of Mathematics, November 2015, doi:10.1007/s00009-015-0655-7; https://www.researchgate.net/publication/281461656_An_Explicit_Formula_for_the_Bell_Numbers_in_Terms_of_the_Lah_and_Stirling_Numbers
  5. Feng Qi, On multivariate logarithmic polynomials and their properties, Indagationes Mathematicae (2018) 29. doi:10.1016/j.indag.2018.04.002
  6. Feng Qi, BN Guo, Some explicit and recursive formulas of the large and little Schröder numbers, Arab Journal of Mathematical Sciences, June 2016; doi:10.1016/j.ajmsc.2016.06.002
  7. Feng Qi, Bai-Ni Guo, "Some Properties and Generalizations of the Catalan, Fuss, and Fuss–Catalan Numbers", Mathematical Analysis and Applications: Selected (2018), Wiley, Ch. 5, 101-133. doi:10.1002/9781119414421.ch5 (A001497)
  8. FENG QI, XIAO-TING SHI, AND BAI-NI GUO, Integral representations of the large and little Schroder numbers, Preprint, 2016; PDF
  9. FENG QI, XIAO-TING SHI, AND BAI-NI GUO, Two explicit formulas of the Schroder numbers, Integers 16 (2016 A23 HTML
  10. Feng Qi, X.-T. Shi, F.-F. Liu, Several formulas for special values of the Bell polynomials of the second kind and applications, Preprint 2015; PDF
  11. Feng Qi and Mark Daniel Ward, Closed-form formulas and properties of coefficients in Maclaurin's series expansion of Wilf's function, arXiv:2110.08576 [math.CO], 2021. (A014304, A014307, A180875)
  12. Lan Qi, Zhuoyu Chen, Identities Involving the Fourth-Order Linear Recurrence Sequence, Symmetry (2019) Vol. 11, No. 12, 1476. doi:10.3390/sym11121476 (A000078)
  13. D. Qin, H. Xie, Complexity analysis of time series generated by elementary cellular automata, Appl. Math. J. Chinese Univ. Ser. B 20 (3) (2005) 253-267 doi:10.1007/s11766-005-0001-0
  14. M. Qin, E. Yaakobi, P. H. Siegel, Constrained Codes that Mitigate Inter-Cell Interference in Read/Write Cycles for Flash Memories, IEEE Jnl. Selected Areas in Communications, 2014.
  15. Qiongqiong Pan, Jiang Zeng, A q-analogue of generalized Eulerian polynomials with applications, Advances in Applied Mathematics (2019) Vol. 104, 85-99. doi:10.1016/j.aam.2018.12.002
  16. Dun Qiu, Classical pattern distributions in S_n(132) and S_n(123), arXiv:1810.10099 [math.CO], 2018. (A101399)
  17. Dun Qiu and Jeffrey B. Remmel, Quadrant marked mesh patterns in 123-avoiding permutations, arXiv:1705.00164 [math.CO], 2017.
  18. Dun Qiu, Jeffery Remmel, Patterns in words of ordered set partitions, arXiv:1804.07087 [math.CO], 2018. (A001263, A001519)
  19. Ke Qiu, Interesting sequences in star graphs, Congr. Numerantium 165 (2003) 111-121
  20. H. Quan, F. Roman, M. Washington, Infinite products and periodic sequences, in MSRI-UP Research Reports, 2014; http://www.msri.org/system/cms/files/81/files/original/Research_Reports_2014_MSRI-UP_(Single_File).pdf#page=6
  21. Jocelyn Quaintance, Letter Representations of m x n x p Proper Arrays (2004), arXiv:math/0412244.
  22. Jocelyn Quaintance, Word Representations of m x n x p Proper Arrays (2004), arXiv:math/0412280; Discrete Mathematics, Volume 309, Issue 6, 6 April 2009, Pages 1199-1212.
  23. Quaintance, Jocelyn, Combinatoric enumeration of two-dimensional proper arrays. Discrete Math. 307 (2007), no. 15, 1844-1864
  24. J. Quaintance, H. Kwong, Permutations and combinations of colored mulisets, JIS 13 (2010) #10.2.6
  25. Jocelyn Quaintance and Harris Kwong, A combinatorial interpretation of the Catalan and Bell number difference tables, Integers, 13 (2013), #A29.
  26. Saulo Queiroz, João Vilela, Edmundo Monteiro, What is the Cost of the Index Selector Task for OFDM with Index Modulation?, 2019 Wireless Days (WD). doi:10.1109/WD.2019.8734233 (A001405)
  27. Saulo Queiroz, João P. Vilela, Edmundo Monteiro, Optimal Mapper for OFDM with Index Modulation: A Spectro-Computational Analysis, arXiv:2002.09382 [eess.SP], 2020. See also IEEE Access (2020) Vol. 8, 68365-68378. doi:10.1109/ACCESS.2020.2986131 (A001405)
  28. Claudio Qureshi, Antonio Campello, Sueli I. R. Costa, Non-Existence of Linear Perfect Lee Codes With Radius 2 for Infinitely Many Dimensions, IEEE Transactions on Information Theory (2018) Vol. 64, Issue 4, pp. 3042-3047. doi:10.1109/TIT.2018.2797049

About this page

  • This is part of the series of OEIS Wiki pages that list works citing the OEIS.
  • Additions to these pages are welcomed.
  • But if you add anything to these pages, please be very careful — remember that this is a scientific database. Spell authors' names, titles of papers, journal names, volume and page numbers, etc., carefully, and preserve the alphabetical ordering.
  • If you are unclear about what to do, contact one of the Editors-in-Chief before proceeding.
  • Works are arranged in alphabetical order by author's last name.
  • Works with the same set of authors are arranged by date, starting with the oldest.
  • The full list of sections is: A Ba Bi Ca Ci D E F G H I J K L M N O P Q R Sa Sl T U V W X Y Z.
  • For further information, see the main page for Works Citing OEIS.