Equivalence Relations and Bell Numbers

Authors

  • Dr. R. Sivaraman Department of Mathematics, D. G. Vaishnav College, Chennai, India Author

DOI:

https://doi.org/10.61841/0hn45477

Keywords:

Partitions, Equivalence relations,, Stirling’s numbers of second kind, Recurrence relation, , Bell numbers, Exponential generating function.

Abstract

It is well known that for a given finite set, an equivalence relation induces a partition of the set. This paper addresses the question of counting the number of equivalence relations that can be defined on a given finite set. Interestingly enough the answer lies in special class of numbers called “Bell Numbers”. In this paper, we witness this amusing connection obtained through another special class of numbers called Stirling’s numbers of second kind. Some of the basic properties of Stirling’s numbers and Bell numbers were proved.

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References

1. W. Chu and C. Wei, Set partitions with restrictions, Discrete Math. 308 (2008), pp. 3163–3168.

2. T. Mansour, Combinatorics of Set Partitions, CRC Press, 2013.

3. R.P. Stanley, Enumerative Combinatorics, Volume 1, Cambridge University Press,1997.

4. D. I.A. Cohen, Basic Techniques of Combinatorial Theory, John Wiley & Sons, 1978.

5. J. DOBSON, A Note on Stirling Numbers of the Second Kind, J. Combinatorial Theory,5(1968), pp. 212- 214.

6. https://www.whitman.edu/mathematics/cgt_online/book/section01.04.html

7. https://en.wikipedia.org/wiki/Stirling_numbers_of_the_second_kind

8. https://en.wikipedia.org/wiki/Dobi%C5%84ski%27s_formula

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Published

30.06.2020

Issue

Vol. 24 No. 4 (2020): 24 (4) 2020

Section

Articles

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How to Cite

Sivaraman, D. R. (2020). Equivalence Relations and Bell Numbers. International Journal of Psychosocial Rehabilitation, 24(4), 10639-10647. https://doi.org/10.61841/0hn45477