Proceedings of the 28-th International Conference on Formal Power Series and Algebraic Combinatorics

4-8 Jul 2016 Vancouver, British Columbia (Canada)

Extended abstracts listed by author > Samper Jose

sciencesconf.org:fpsac2016:113691

The topology of the external activity complex of a matroid

Federico Ardila 1, 2 , Federico Castillo 3 , Jose Samper 4

1 : San Francisco State University (SFSU)

1600 Holloway AveSan FranciscoCA 94132 - États-Unis

2 : Universidad de los Andes [Bogota] - Website

3 : University of California [Davis] (UC Davis) - Website

One Shields Avenue, Davis, CA 95616-5294 - États-Unis

4 : University of Washington [Seattle] - Website

Seattle, Washington 98105 - États-Unis

We prove that the external activity complex Act<(M) of a matroid is shellable. In fact, we show that every linear extension of Las Vergnas's external/internal order <ext/int on M provides a shelling of Act<(M). We also show that every linear extension of Las Vergnas's internal order <int on M provides a shelling of the independence complex IN(M). As a corollary, Act<(M) and M have the same h-vector. We prove that, after removing its cone points, the external activity complex is contractible if M contains U3,1 as a minor, and a sphere otherwise.

Subject :	:	Poster
Topics	:	Combinatorics
PDF version	:	PDF version

Poster

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