Symmetric inclusion-exclusion
组合数学
2013-04-02 v2
摘要
One form of the inclusion-exclusion principle asserts that if A and B are functions of finite sets then A(S) is the sum of B(T) over all subsets T of S if and only if B(S) is the sum of (-1)^|S-T| A(T) over all subsets T of S. If we replace B(S) with (-1)^|S| B(S), we get a symmetric form of inclusion-exclusion: A(S) is the sum of (-1)^|T| B(T) over all subsets T of S if and only if B(S) is the sum of (-1)^|T| A(T) over all subsets T of S. We study instances of symmetric inclusion-exclusion in which the functions A and B have combinatorial or probabilistic interpretations. In particular, we study cases related to the Polya-Eggenberger urn model in which A(S) and B(S) depend only on the cardinality of S.
引用
@article{arxiv.math/0505255,
title = {Symmetric inclusion-exclusion},
author = {Ira M. Gessel},
journal= {arXiv preprint arXiv:math/0505255},
year = {2013}
}
备注
10 pages