Document Type
Article
Publication Date
6-1-2025
Abstract
We show that Gromov–Thurston branched covers satisfy the Singer conjecture whenever the degree of the cover is not divisible by a finite set of primes determined by the base manifold and the branch locus.
Publication Source (Journal or Book title)
Mathematische Annalen
First Page
2621
Last Page
2634
Recommended Citation
Avramidi, G., Okun, B., & Schreve, K. (2025). L2-betti numbers of branched covers of hyperbolic manifolds. Mathematische Annalen, 392 (2), 2621-2634. https://doi.org/10.1007/s00208-025-03164-z
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