El Teorema de Gelfand Naimark desde una perspectiva Categórica The Gelfand--Naimark Theorem from a Categorical Perspective

Abstract: Este art\'iculo presenta como resultado principal la equivalencia entre, las categor\'ias de espacios topol\'ogicos Hausdorff-Compactos y la categor\'ia de las $C^*-$\'algebras conmutativas con unidad, producto de la traducci\'on'' en este lenguaje del teorema de Gelfand--Naimark presentado en 1943. Haremos un recorrido sobre las principales ideas del an\'alisis y el \'algebra, conjugadas con \'exito, en el estudio de la teor\'ia de \'Algebras de Banach. As\'i mismo estableceremos, a forma de conclusi\'on, diversas aplicaciones que resultan naturalmente posibles a la luz de laanalog\'ia y generalizaci\'on'' que nos permiten la teor\'ia de categor\'ias. Palabras claves: $C^*$-algebras, Categor\'ias, Espacios Topol\'ogicos, Teorema de Gelfand-Naimark, Teor\'ia de Representaciones. The goal of this paper is to prove the categorical equivalence between the category of Hausdorff-Compact topological spaces and the category of Unital Commutative $C^*$-algebras. This equivalence can be interpreted as a way of rewriting the well known Gelfand-Naimark Theorem in a categorical language. We will present the basic concepts in the theory of Banach Algebras as a successful link between Analysis and Algebra. Likewise, we will show some applications due to this new perspective, highlighting the categorical connection through proofs of typical problems that don't have an easy solution in $C^*-$algebra. Keywords: Category Theory, $C^*$-algebras, Gelfand-Naimark Theorem, Topological Spaces, Representation Theory.