Partition function (number theory): Difference between revisions

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In number theory the partition function p(n) counts the number of partitions of a positive integer n, that is, the number of ways of expressing n as a sum of positive integers (where order is not significant).

Thus p(3) = 3, since the number 3 has 3 partitions:

3
2+1
1+1+1

Properties

The partition function satisfies an asymptotic relation

p(n)\sim {\frac {\exp \left(\pi {\sqrt {2/3}}{\sqrt {n}}\right)}{4n{\sqrt {3}}}}.

References

Tom M. Apostol (1990). Modular functions and Dirichlet Series in Number Theory, 2nd ed. Springer-Verlag, 94-112. ISBN 0-387-97127-0.
G.H. Hardy; E. M. Wright (2008). An Introduction to the Theory of Numbers, 6th ed.. Oxford University Press, 361-392. ISBN 0-19-921986-5.

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	In [[number theory]] the '''partition function''' ''p''(''n'') counts the number of [[partition]]s of a positive integer ''n'', that is, the number of ways of expressing ''n'' as a sum of positive integers (where order is not significant).		In [[number theory]] the '''partition function''' ''p''(''n'') counts the number of [[partition]]s of a positive integer ''n'', that is, the number of ways of expressing ''n'' as a sum of positive integers (where order is not significant).

Partition function (number theory): Difference between revisions

Revision as of 16:25, 13 December 2008

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