Grothendieck's theorem and factorization for operators in Jordan triples.
Spectral theory for facially homogenous symmetric self-dual cones.
Banach-power-associative algebras and J-B algebras
Banach power - associative algebras : the complex and (or) non commutative cases
Remarks on the bidual of Banach algebras (the case)
Weakly Compact Operators on Jordan Triples.
The Dunford-Pettis property in C*-algebras
κ-deformation, affine group and spectral triples
A regular spectral triple is proposed for a two-dimensional κ-deformation. It is based on the naturally associated affine group G, a smooth subalgebra of C*(G), and an operator 𝓓 defined by two derivations on this subalgebra. While 𝓓 has metric dimension two, the spectral dimension of the triple is one. This bypasses an obstruction described in [35] on existence of finitely-summable spectral triples for a compactified κ-deformation.
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