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The 2-category $\\text{KV}$ of Kapranov-Voevodsky k-vector spaces may be equipped with a canonical strict duality involution. We show that the pseudofunctor $\\text{Rep}: \\text{Alg}^{fd} \\to \\text{KV}$ sending an algebra to its category of finite-dimensional modules may be canonically equipped with the structure of a duality pseudofunctor. 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We construct a weak duality involution on the fully dualisable part of $\\text{Alg}$, the Morita bicategory of finite-dimensional k-algebras. The 2-category $\\text{KV}$ of Kapranov-Voevodsky k-vector spaces may be equipped with a canonical strict duality involution. We show that the pseudofunctor $\\text{Rep}: \\text{Alg}^{fd} \\to \\text{KV}$ sending an algebra to its category of finite-dimensional modules may be canonically equipped with the structure of a duality pseudofunctor. 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