# Generalization of Partition Function, Introducing Smarandache Factor Partition

@inproceedings{Murthy2000GeneralizationOP, title={Generalization of Partition Function, Introducing Smarandache Factor Partition}, author={A. Savitri Murthy}, year={2000} }

- Published 2000
DOI:10.5281/zenodo.9124

Partition function P(n) is defined as the number of ways that a positive integer can be expressed as the sum of positive integers. Two partitions are not considered to be different if they differ only in the order of their summands. A number of results concerning the partition function were discovered using analytic functions by Euler, Jacobi, Hardy, Ramanujan and others. Also a number of congruence properties of the function were derived. In the paper Ref.[1] "SMARANDACHE RECIPROCAL PARTITION… CONTINUE READING

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## Generalized Partitions and New Ideas On Number Theory and Smarandache Sequences

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