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DM
2016
2016
Intersecting faces of a simplicial complex via algebraic shifting
A family A of sets is t-intersecting if the size of the intersection of every pair of sets in A is at least t, and it is an r-family if every set in A has size r. A wellknown theorem of Erd˝os, Ko, and Rado bounds the size of a t-intersecting r-family of subsets of an n-element set, or equivalently of (r −1)-dimensional faces of a simplex with n vertices. As a generalization of the Erd˝os-Ko-Rado theorem, Borg presented a conjecture concerning the size of a t-intersecting r-family of faces of an arbitrary simplicial complex. He proved his conjecture for shifted complexes. In this paper we give a new proof for this result based on work of Woodroofe. Using algebraic shifting we verify Borg’s conjecture in the case of sequentially Cohen-Macaulay i-near-cones for t = i.
Real-time TrafficDM 2016 |
| Added | 01 Apr 2016 |
| Updated | 01 Apr 2016 |
| Type | Journal |
| Year | 2016 |
| Where | DM |
| Authors | S. A. Seyed Fakhari |
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