Asymptotic topology of random subcomplexes in a finite simplicial complex
Abstract
We consider a finite simplicial complex K together with its successive barycentric subdivisions Sdd(K), d≥0, and study the expected topology of a random subcomplex in Sdd(K), d0. We get asymptotic upper and lower bounds for the expected Betti numbers of those subcomplexes, together with the average Morse inequalities and expected Euler characteristic.
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