Gottlieb's theorem for a periodic equivalence
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Publication:2087431
DOI10.1007/s11784-022-00990-5OpenAlexW4306156068WikidataQ115230393 ScholiaQ115230393MaRDI QIDQ2087431
Publication date: 20 October 2022
Published in: Journal of Fixed Point Theory and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11784-022-00990-5
Hochschild homologyGottlieb's theoremReidemeister traceBass conjecturetype FPHattori-Stallings traceperiodic equivalence
Classification of homotopy type (55P15) Homological methods in group theory (20J05) Fixed points and coincidences in algebraic topology (55M20)
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- The Farrell-Jones conjecture for arbitrary lattices in virtually connected Lie groups
- An extension theorem for Euler characteristics of groups
- Idempotent matrices over complex group algebras.
- Cyclic homology of groups and the Bass conjecture
- The homomorphism on fundamental group induced by a homotopy idempotent having essential fixed points
- Euler characteristics and characters of discrete groups
- Nilpotency of Connes' periodicity operator and the idempotent conjectures
- Higher Euler characteristics. I
- Centerless groups -- an algebraic formulation of Gottlieb's theorem
- A classification theorem for fibre spaces
- Decomposition of Augmentation Ideals and Relation Modules
- Homotopy idempotents on manifolds and Bass' conjectures
- Centralizers and homological dimension
- Homotopy periodicity and coherence
- A Certain Subgroup of the Fundamental Group
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