To Atenea.

The purpose of this paper is to lay the foundations for the construction of the category of exact sequences of Banach spaces; the construction for quasi-Banach spaces is analogous and thus we omit it. The construction of a category associated to a theory, in addition to its intrinsic value, provides the right context to study, among others, isomorphic and universal objects. In our particular case, let us describe a couple of phenomena often encountered when working with exact sequences of Banach spaces for which the categorical approach provides rigorous explanations.

If one “multiplies” an exact sequence 0 → Y → X → Z → 0 by the left (resp. right) by a given space E, the resulting exact sequence 0 → E ⊕ Y → E ⊕ X → Z → 0 (resp. 0 → Y → X ⊕ E → Z ⊕ E → 0) is “the same”. And this holds despite the fact that the original and the “multiplied” sequences are not equivalent under any known definition. The categorical approach provides the simplest explanation: the two sequences are isomorphic objects in the category.