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Homotopy theory, homological algebra, algebraic treatments of manifolds.

5 votes
2 answers
356 views

Is there an upper bound on the number of points in point cloud for which we compute the pers...

I am interested in the topic of persistent homology (topological data analysis). According to what I read, there is some roadblock in the analysis of "big data" using persistent homology as it is cons …
2 votes
1 answer
132 views

Persistent homology stability results (query about Lipschitz functions)

One of the beneficial properties of persistent homology is its stability results (so called robustness to noise). Usually the referenced paper is this paper titled "Lipschitz functions have $L_p$-st …
10 votes
1 answer
699 views

Persistent homology over the integers

Is it likely that in the future, there will be interest in computing persistent homology over the integers (or other PIDs)? Currently, persistent homology is usually done over a field (like $\mathbb{ …
35 votes
1 answer
4k views

Why is persistent cohomology so much faster than persistent homology

I refer to this paper: de Silva, Vin; Morozov, Dmitriy; Vejdemo-Johansson, Mikael. Dualities in persistent (co)homology. Inverse Problems 27 (2011), no. 12, 124003, 17 pp. (Journal link, arXiv link). …
7 votes
1 answer
422 views

Correspondence between persistence module and graded module over $R[t]$

In the paper "Computing Persistent Homology" by Zomorodian and Carlsson, it is stated as Theorem 3.1 that: The correspondence $\alpha$ defines an equivalence of categories between the category of …
24 votes
2 answers
2k views

Research directions in persistent homology

I am interested in what are the possible directions for new research in persistent homology (more of the mathematical theoretical aspects rather than the computer algorithm aspects). So far from goog …
3 votes
2 answers
339 views

Good, detailed references for "mod p lower central series"

I am looking for good, detailed references for "mod $p$ lower central series". So far I only find papers such as (https://core.ac.uk/download/pdf/81193793.pdf, https://www.sciencedirect.com/science/a …
4 votes
1 answer
574 views

Algorithm for computing fundamental group of simplicial complexes

For computing homology of a simplicial complex, there is the well-known reduction algorithm. How about for fundamental group of simplicial complexes? Is there any (implementable) algorithm to compute …
6 votes
0 answers
232 views

Explicit formula for higher order Bockstein

The formula for the Bockstein $\beta:H_n(X;\mathbb{Z}/p\mathbb{Z})\to H_{n-1}(X;\mathbb{Z}/p\mathbb{Z})$ is $$\beta[c\otimes 1]=[\frac{1}{p}\partial c\otimes 1]$$ (McCleary page 456) How about for th …
5 votes
0 answers
522 views

Strong Convergence vs Conditional Convergence for Spectral Sequences (Is there a simple expl...

I am curious if there is a relatively simple explanation of what is the difference between strong convergence and conditional convergence for Spectral Sequences? (Hopefully a simpler explanation than …
4 votes
1 answer
194 views

Can Bockstein Spectral Sequence detect multiple summands of the same power, in homology?

I understand that the differential $d^k$ of the Bockstein S.S. (mod p) is nonzero iff the homology $H_*(X;\mathbb{Z})$ has summand of the form $\mathbb{Z}/p^k$. How about for multiple summands in the …