Invariant means on weakly almost periodic functionals with application to quantum groups
Canadian mathematical bulletin, Tome 66 (2023) no. 3, pp. 927-936
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Let ${\mathcal A}$ be a Banach algebra, and let $\varphi $ be a nonzero character on ${\mathcal A}$. For a closed ideal I of ${\mathcal A}$ with $I\not \subseteq \ker \varphi $ such that I has a bounded approximate identity, we show that $\operatorname {WAP}(\mathcal {A})$, the space of weakly almost periodic functionals on ${\mathcal A}$, admits a right (left) invariant $\varphi $-mean if and only if $\operatorname {WAP}(I)$ admits a right (left) invariant $\varphi |_I$-mean. This generalizes a result due to Neufang for the group algebra $L^1(G)$ as an ideal in the measure algebra $M(G)$, for a locally compact group G. Then we apply this result to the quantum group algebra $L^1({\mathbb G})$ of a locally compact quantum group ${\mathbb G}$. Finally, we study the existence of left and right invariant $1$-means on $ \operatorname {WAP}(\mathcal {T}_{\triangleright }({\mathbb G}))$.
Mots-clés :
Closed ideal, locally compact quantum group, invariant mean, weakly almost periodic functional
Esfahani, Ali Ebrahimzadeh; Nemati, Mehdi; Ghanei, Mohammad Reza. Invariant means on weakly almost periodic functionals with application to quantum groups. Canadian mathematical bulletin, Tome 66 (2023) no. 3, pp. 927-936. doi: 10.4153/S0008439523000061
@article{10_4153_S0008439523000061,
author = {Esfahani, Ali Ebrahimzadeh and Nemati, Mehdi and Ghanei, Mohammad Reza},
title = {Invariant means on weakly almost periodic functionals with application to quantum groups},
journal = {Canadian mathematical bulletin},
pages = {927--936},
year = {2023},
volume = {66},
number = {3},
doi = {10.4153/S0008439523000061},
url = {http://geodesic.mathdoc.fr/articles/10.4153/S0008439523000061/}
}
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