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We show that ${\\rm h}_1(\\mathbb{R}^d, \\mathcal M)$ and ${\\rm bmo}(\\mathbb{R}^d, \\mathcal M)$ are also good endpoints of $L_p(L_\\infty(\\mathbb{R}^d) \\overline{\\otimes} \\mathcal M)$ for interpolation. 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These spaces are localizations of the Hardy spaces defined by Tao Mei, and share many properties with Mei's Hardy spaces. We prove the ${\\rm h}_1$-$\\rm bmo$ duality, as well as the ${\\rm h}_p$-${\\rm h}_q$ duality for any conjugate pair $(p,q)$ when $1<p< \\infty$. We show that ${\\rm h}_1(\\mathbb{R}^d, \\mathcal M)$ and ${\\rm bmo}(\\mathbb{R}^d, \\mathcal M)$ are also good endpoints of $L_p(L_\\infty(\\mathbb{R}^d) \\overline{\\otimes} \\mathcal M)$ for interpolation. 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