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Fori≥0, if the stepX i →X i+1 is a contraction, say contracting a subgraphG

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Contraction and Hourglass Persistence for Learning on Graphs, Simplices, and Cells

cs.LG · 2026-04-19 · unverdicted · novelty 7.0 · 2 refs

Hourglass Persistence interleaves sequences of graph inclusions and contractions to produce more expressive topological features than standard persistent homology for learning on graphs and higher-order complexes.

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Contraction and Hourglass Persistence for Learning on Graphs, Simplices, and Cells cs.LG · 2026-04-19 · unverdicted · none · ref 11 · 2 links
Hourglass Persistence interleaves sequences of graph inclusions and contractions to produce more expressive topological features than standard persistent homology for learning on graphs and higher-order complexes.

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