More Like this

1. A lower bound on end-periodic stretch factors

   https://doi.org/10.1090/proc/17304  

   Loving, Marissa; Wu, Chenxi (July 2025, Proceedings of the American Mathematical Society)

   Given an end-periodic homeomorphism $f:S\to <\#comment/>S$we give a lower bound on the Handel–Miller stretch factor of $f$in terms of thecore characteristic of $f$, which is a measure of topological complexity for an end-periodic homeomorphism. We also show that the growth rate of this bound is sharp. 

   more » « less
2. First order rigidity of homeomorphism groups of manifolds

   https://doi.org/10.1090/cams/47  

   Kim, Sang-hyun; Koberda, Thomas; de_la_Nuez_González, J. (May 2025, Communications of the American Mathematical Society)

   For every compact, connected manifold $M$, we prove the existence of a sentence ${\mathrm{\varphi <\#comment/>}}_M$in the language of groups such that the homeomorphism group of another compact manifold $N$satisfies ${\mathrm{\varphi <\#comment/>}}_M$if and only if $N$is homeomorphic to $M$. We prove an analogous statement for groups of homeomorphisms preserving Oxtoby–Ulam probability measures. 

   more » « less
3. Finiteness properties for relatives of braided Higman–Thompson groups

   https://doi.org/10.4171/GGD/731  

   Skipper, Rachel; Wu, Xiaolei (September 2023, Groups, Geometry, and Dynamics)

   We study the finiteness properties of the braided Higman–Thompson groupbV_{d,r}(H)with labels inH\leq B_d, andbF_{d,r}(H)andbT_{d,r}(H)with labels inH\leq PB_d, whereB_dis the braid group withdstrings andPB_dis its pure braid subgroup. We show that for alld\geq 2andr\geq 1, the groupbV_{d,r}(H)(resp.bT_{d,r}(H)orbF_{d,r}(H)) is of typeF_nif and only ifHis. Our result in particular confirms a recent conjecture of Aroca and Cumplido. 

   more » « less
4. Random 3-manifolds have no totally geodesic submanifolds

   https://doi.org/10.1007/s10455-025-09998-9  

   El-Hasan, Hasan M; Wilhelm, Frederick (May 2025, Annals of Global Analysis and Geometry)

   Agricola, Ilka; Bögelein, Verena (Ed.)

   Abstract Murphy and the second author showed that a generic closed Riemannian manifold has no totally geodesic submanifolds, provided the ambient space is at least four dimensional. Lytchak and Petrunin established a similar result in dimension 3. For the higher dimensional result, the “generic set” is open and dense in the$$C^{q}$$ $C^q$–topology for any$$q\ge 2.$$ $q\ge 2.$In Lytchak and Petrunin’s work, the “generic set” is a dense$$G_{\delta }$$ $G_{\delta }$in the$$C^{q}$$ $C^q$–topology for any$$q\ge 2.$$ $q\ge 2.$Here we show that the set of such metrics on a compact 3–manifold actually contains a set that is that is open and dense set in the$$C^{q}$$ $C^q$–topology, provided$$q\ge 3.$$ $q\ge 3.$ 

   more » « less
5. Schatten Classes and Commutator in the Two Weight Setting, I. Hilbert Transform

   https://doi.org/10.1007/s11118-023-10072-x  

   Lacey, Michael; Li, Ji; Wick, Brett D. (April 2023, Potential Analysis)

   Abstract We characterize the Hilbert–Schmidt class membership of commutator with the Hilbert transform in the two weight setting. The characterization depends upon the symbol of the commutator being in a new weighted Besov space. This follows from a Schatten classS_presult for dyadic paraproducts, where$$1< p < \infty $$ $1<p<\infty$. We discuss the difficulties in extending the dyadic result to the full range of Schatten classes for the Hilbert transform. 

   more » « less