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2008 The Euler characteristic of a category as the sum of a divergent series
Clemens Berger, Tom Leinster
Homology Homotopy Appl. 10(1): 41-51 (2008).

Abstract

The Euler characteristic of a cell complex is often thought of as the alternating sum of the number of cells of each dimension. When the complex is infinite, the sum diverges. Nevertheless, it can sometimes be evaluated; in particular, this is possible when the complex is the nerve of a finite category. This provides an alternative definition of the Euler characteristic of a category, which is in many cases equivalent to the original one.

Citation

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Clemens Berger. Tom Leinster. "The Euler characteristic of a category as the sum of a divergent series." Homology Homotopy Appl. 10 (1) 41 - 51, 2008.

Information

Published: 2008
First available in Project Euclid: 23 January 2008

zbMATH: 1132.18007
MathSciNet: MR2369022

Subjects:
Primary: 05C50 , 18F99 , 40A05 , 57N65

Keywords: divergent series , divergent su , Euler characteristic , finite category , Möbius inversion

Rights: Copyright © 2008 International Press of Boston

Vol.10 • No. 1 • 2008
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