Theorem 4.7 in the published paper should be replaced by the following statement and proof. The difference is that in the original, no condition was placed on [Formula presented]. We thank Brita Nucinkis for bringing to our attention the inaccuracy in the published paper. Theorem 1 Let G be a t.d.l.c. group and X an n-good discrete G-CW-complex over R with a filtration [Formula presented] of finite n-type. Then G has type [Formula presented] over R if and only if [Formula presented] is [Formula presented]-essentially trivial in all dimensions [removed]
Castellano, I., Corob Cook, G. (2024). Corrigendum to “Finiteness properties of totally disconnected locally compact groups” [J. Algebra 543 (2020) 54–97, (S0021869319305174), (10.1016/j.jalgebra.2019.09.017)] [Altro] [10.1016/j.jalgebra.2024.01.047].
Corrigendum to “Finiteness properties of totally disconnected locally compact groups” [J. Algebra 543 (2020) 54–97, (S0021869319305174), (10.1016/j.jalgebra.2019.09.017)]
Castellano I.;
2024
Abstract
Theorem 4.7 in the published paper should be replaced by the following statement and proof. The difference is that in the original, no condition was placed on [Formula presented]. We thank Brita Nucinkis for bringing to our attention the inaccuracy in the published paper. Theorem 1 Let G be a t.d.l.c. group and X an n-good discrete G-CW-complex over R with a filtration [Formula presented] of finite n-type. Then G has type [Formula presented] over R if and only if [Formula presented] is [Formula presented]-essentially trivial in all dimensions [removed]| File | Dimensione | Formato | |
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