arXiv:1911.08702 Abstract | arXiv Analytics

arXiv:1911.08702 [math.HO]Abstract References Reviews Resources

Harmonic Partitions of Positive Integers and Bosonic Extension of Euler's Pentagonal Number Theorem

Published 2019-11-20Version 1

In this note, we first propose a cohomological derivation of the celebrated Euler's Pentagonal Number Theorem. Then we prove an identity that corresponds to a bosonic extension of the theorem. The proof corresponds to a cohomological re-derivation of Euler's another celebrated identity.

Comments: 11pages, Latex

Categories: math.HO, math-ph, math.CO, math.MP

Subjects: 05A17

Keywords: bosonic extension, harmonic partitions, positive integers, celebrated eulers pentagonal number theorem, proof corresponds

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arXiv:1911.08702 [math.HO]Abstract References Reviews Resources

Harmonic Partitions of Positive Integers and Bosonic Extension of Euler's Pentagonal Number Theorem

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arXiv:1911.08702 [math.HO]AbstractReferencesReviewsResources

Harmonic Partitions of Positive Integers and Bosonic Extension of Euler's Pentagonal Number Theorem

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arXiv:1911.08702 [math.HO]Abstract References Reviews Resources