Geodesic
A Cohomological Property of π-invariant Elements
Canadian mathematical bulletin, Tome 56 (2013) no. 3, pp. 534-543

Voir la notice de l'article provenant de la source Cambridge University Press

Let $A$ be a Banach algebra and let $\pi :\,A\,\to \,\mathcal{L}\left( H \right)$ be a continuous representation of $A$ on a separable Hilbert space $H$ with dim $H\,=\,\text{m}$ . Let ${{\pi }_{ij}}$ be the coordinate functions of $\pi $ with respect to an orthonormal basis and suppose that for each $1\,\le \,j\,\le \,\text{m,}\,{{C}_{j}}\,=\,\sum\nolimits_{i=1}^{\text{m}}{\left\| {{\pi }_{ij}} \right\|}{{A}^{*}}\,<\,\infty $ and ${{\sup }_{j}}\,{{C}_{j}}\,<\,\infty $ . Under these conditions, we call an element $\overline{\Phi }\,\in \,{{\iota }^{\infty }}\,\left( \mathfrak{m},\,{{A}^{**}} \right)$ left $\pi $ -invariant if $a\,\cdot \overline{\Phi }\,={{\,}^{^{t}\pi }}\left( a \right)\overline{\Phi }$ for all $a\in A$ In this paper we prove a link between the existence of left $\pi $ -invariant elements and the vanishing of certain Hochschild cohomology groups of $A$ . Our results extend an earlier result by Lau on $F$ -algebras and recent results of Kaniuth, Lau, Pym, and and the second author in the special case where $\pi :\,A\,\to \text{C}$ is a non-zero character on $A$ .
DOI : 10.4153/CMB-2011-184-7
Mots-clés : 46H15, 46H25, 13N15, Banach algebras, π-invariance, derivations, representations 
Filali, M.; Monfared, M. Sangani. A Cohomological Property of π-invariant Elements. Canadian mathematical bulletin, Tome 56 (2013) no. 3, pp. 534-543. doi: 10.4153/CMB-2011-184-7
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