Compatibility of Kazhdan and Brauer homomorphism
Canadian mathematical bulletin, Tome 68 (2025) no. 1, pp. 19-43
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Let G be a split connected reductive group defined over $\mathbb {Z}$. Let F and $F'$ be two non-Archimedean m-close local fields, where m is a positive integer. D. Kazhdan gave an isomorphism between the Hecke algebras $\mathrm {Kaz}_m^F :\mathcal {H}\big (G(F),K_F\big ) \rightarrow \mathcal {H}\big (G(F'),K_{F'}\big )$, where $K_F$ and $K_{F'}$ are the mth usual congruence subgroups of $G(F)$ and $G(F')$, respectively. On the other hand, if $\sigma $ is an automorphism of G of prime order l, then we have Brauer homomorphism $\mathrm {Br}:\mathcal {H}(G(F),U(F))\rightarrow \mathcal {H}(G^\sigma (F),U^\sigma (F))$, where $U(F)$ and $U^\sigma (F)$ are compact open subgroups of $G(F)$ and $G^\sigma (F),$ respectively. In this article, we study the compatibility between these two maps in the local base change setting. Further, an application of this compatibility is given in the context of linkage – which is the representation theoretic version of Brauer homomorphism.
Mots-clés :
Hecke algebra, Kazhdan isomorphism, Brauer homomorphism, Tate cohomology, Linkage, Close local fields
Dhar, Sabyasachi. Compatibility of Kazhdan and Brauer homomorphism. Canadian mathematical bulletin, Tome 68 (2025) no. 1, pp. 19-43. doi: 10.4153/S0008439524000596
@article{10_4153_S0008439524000596,
author = {Dhar, Sabyasachi},
title = {Compatibility of {Kazhdan} and {Brauer} homomorphism},
journal = {Canadian mathematical bulletin},
pages = {19--43},
year = {2025},
volume = {68},
number = {1},
doi = {10.4153/S0008439524000596},
url = {http://geodesic.mathdoc.fr/articles/10.4153/S0008439524000596/}
}
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