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Abstract
The distributive property can be studied through bilinear maps and various morphisms between these maps. The adjoint-morphisms between bilinear maps establish a complete abelian category with projectives and admits a duality. Thus the adjoint category is not a module category but nevertheless it is suitably familiar. The universal properties have geometric perspectives. For example, products are orthogonal sums. The nonsingular bilinear maps are the simple bimaps with respect to nondegenerate adjoint-morphisms. That formalizes the understanding that the atoms of linear geometries are algebraic objects with no zero-divisors. Adjoint-isomorphism coincides with principal isotopism; hence, semifields can be studied within this framework.
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2000 Mathematics Subject Classification:
ACKNOWLEDGMENTS
Thanks to the referee for better reasoning, to D. Oury for helpful discussion, and to W. Kantor and D. Shapiro for remarks on semifields and nonsingular bimaps.
Notes
1Here a form means a bimap B: U × V → W where W, is a cyclic (bi-)module; cf. Section 1.1.
Indeed, Adj(W) cannot be a Grothendieck category since then it would also be a co-Grothendieck; in such categories all objects are zero [Citation9, p. 116].
We resist writing this product with ⊕ since the product in the category of homotopisms on bimaps has a superseding requirement that B: U × V → W and C: X × Y → Z have a product B ⊕ C: (U ⊕ X) × (V ⊕ Y) → (W ⊕ X).
Note that construction cannot be modified to show is injective in Mod
S
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Communicated by A. Elduque.