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# CiteQ

From OeisWiki

## 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

- 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).
- Feng Qi, An Explicit Formula for Bell Numbers in Terms of Stirling Numbers and Hypergeometric Functions, arXiv:1402.2361, 2014.
- Feng Qi, On Sum of the Lah Numbers and zeros of the Kummer Confluent hypergeometric Function, 2015
- 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
- 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
- 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)
- FENG QI, XIAO-TING SHI, AND BAI-NI GUO, Integral representations of the large and little Schroder numbers, Preprint, 2016; PDF
- FENG QI, XIAO-TING SHI, AND BAI-NI GUO, Two explicit formulas of the Schroder numbers, Preprint, 2016; PDF
- 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
- Feng Qi, On multivariate logarithmic polynomials and their properties, Indagationes Mathematicae (2018) 29. doi:10.1016/j.indag.2018.04.002
- Lan Qi, Zhuoyu Chen, Identities Involving the Fourth-Order Linear Recurrence Sequence, Symmetry (2019) Vol. 11, No. 12, 1476. doi:10.3390/sym11121476 (A000078)
- 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
- 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.
- 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
- Dun Qiu, Classical pattern distributions in S_n(132) and S_n(123), arXiv:1810.10099 [math.CO], 2018. (A101399)
- Dun Qiu and Jeffrey B. Remmel, Quadrant marked mesh patterns in 123-avoiding permutations, arXiv:1705.00164 [math.CO], 2017.
- Dun Qiu, Jeffery Remmel, Patterns in words of ordered set partitions, arXiv:1804.07087 [math.CO], 2018. (A001263, A001519)
- Ke Qiu, Interesting sequences in star graphs, Congr. Numerantium 165 (2003) 111-121
- 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
- Jocelyn Quaintance, Letter Representations of m x n x p Proper Arrays (2004), arXiv:math/0412244.
- 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.
- Quaintance, Jocelyn, Combinatoric enumeration of two-dimensional proper arrays. Discrete Math. 307 (2007), no. 15, 1844-1864
- J. Quaintance, H. Kwong, Permutations and combinations of colored mulisets, JIS 13 (2010) #10.2.6
- Jocelyn Quaintance and Harris Kwong, A combinatorial interpretation of the Catalan and Bell number difference tables, Integers, 13 (2013), #A29.
- 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)
- 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)
- 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**.