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| Format: | Preprint |
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2025
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| Online Access: | https://arxiv.org/abs/2508.19635 |
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| _version_ | 1866915466089332736 |
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| author | Caković, Milica Lučić, Danka Pasqualetto, Enrico |
| author_facet | Caković, Milica Lučić, Danka Pasqualetto, Enrico |
| contents | We study injective and projective tensor products of measurable Banach bundles. More precisely, given two separable measurable Banach bundles ${\bf E}$, ${\bf F}$ defined over a probability space $({\rm X},Σ,\mathfrak m)$, we construct two measurable Banach bundles ${\bf E}\hat\otimes_\varepsilon{\bf F}$ and ${\bf E}\hat\otimes_π{\bf F}$ over $({\rm X},Σ,\mathfrak m)$ such that $Γ({\bf E}\hat\otimes_\varepsilon{\bf F})\congΓ({\bf E})\hat\otimes_\varepsilonΓ({\bf F})$ and $Γ({\bf E}\hat\otimes_π{\bf F})\congΓ({\bf E})\hat\otimes_πΓ({\bf F})$, where ${\bf G}\mapstoΓ({\bf G})$ is the map assigning to a measurable Banach bundle ${\bf G}$ its space of $L^\infty(\mathfrak m)$-sections, while $Γ({\bf E})\hat\otimes_\varepsilonΓ({\bf F})$ and $Γ({\bf E})\hat\otimes_πΓ({\bf F})$ denote the injective and projective tensor products, respectively, of $Γ({\bf E})$ and $Γ({\bf F})$ in the sense of $L^\infty(\mathfrak m)$-Banach $L^\infty(\mathfrak m)$-modules. In combination with previous results, this provides a fiberwise representation of the injective tensor product $\mathscr M\hat\otimes_\varepsilon\mathscr N$ and the projective tensor product $\mathscr M\hat\otimes_π\mathscr N$ of two countably-generated $L^\infty(\mathfrak m)$-Banach $L^\infty(\mathfrak m)$-modules $\mathscr M$, $\mathscr N$. |
| format | Preprint |
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arxiv_https___arxiv_org_abs_2508_19635 |
| institution | arXiv |
| publishDate | 2025 |
| record_format | arxiv |
| spellingShingle | Tensor products of measurable Banach bundles Caković, Milica Lučić, Danka Pasqualetto, Enrico Functional Analysis 46M05, 47A80, 18F15, 53C23, 28A51, 46G15 We study injective and projective tensor products of measurable Banach bundles. More precisely, given two separable measurable Banach bundles ${\bf E}$, ${\bf F}$ defined over a probability space $({\rm X},Σ,\mathfrak m)$, we construct two measurable Banach bundles ${\bf E}\hat\otimes_\varepsilon{\bf F}$ and ${\bf E}\hat\otimes_π{\bf F}$ over $({\rm X},Σ,\mathfrak m)$ such that $Γ({\bf E}\hat\otimes_\varepsilon{\bf F})\congΓ({\bf E})\hat\otimes_\varepsilonΓ({\bf F})$ and $Γ({\bf E}\hat\otimes_π{\bf F})\congΓ({\bf E})\hat\otimes_πΓ({\bf F})$, where ${\bf G}\mapstoΓ({\bf G})$ is the map assigning to a measurable Banach bundle ${\bf G}$ its space of $L^\infty(\mathfrak m)$-sections, while $Γ({\bf E})\hat\otimes_\varepsilonΓ({\bf F})$ and $Γ({\bf E})\hat\otimes_πΓ({\bf F})$ denote the injective and projective tensor products, respectively, of $Γ({\bf E})$ and $Γ({\bf F})$ in the sense of $L^\infty(\mathfrak m)$-Banach $L^\infty(\mathfrak m)$-modules. In combination with previous results, this provides a fiberwise representation of the injective tensor product $\mathscr M\hat\otimes_\varepsilon\mathscr N$ and the projective tensor product $\mathscr M\hat\otimes_π\mathscr N$ of two countably-generated $L^\infty(\mathfrak m)$-Banach $L^\infty(\mathfrak m)$-modules $\mathscr M$, $\mathscr N$. |
| title | Tensor products of measurable Banach bundles |
| topic | Functional Analysis 46M05, 47A80, 18F15, 53C23, 28A51, 46G15 |
| url | https://arxiv.org/abs/2508.19635 |