M. J. Kronenburg
Published 2011-05-18, updated 2015-03-30Version 2
The definition of the binomial coefficient in terms of gamma functions also allows non-integer arguments. For nonnegative integer arguments the gamma functions reduce to factorials, leading to the well-known Pascal triangle. Using a symmetry formula for the gamma function, this definition is extended to negative integer arguments, making the symmetry identity for binomial coefficients valid for all integer arguments. The agreement of this definition with some other identities and with the binomial theorem is investigated.
Comments: Corrected text on continuity
A combinatorial proof of strict unimodality for $q$-binomial coefficients
Some divisibility properties of binomial coefficients
A New Definition of the Dimension of Graphs
![QR code for arXiv:1105.3689 [math.CO]](http://oss.arxitics.com/images/favicon.svg)