The Banach space of quasinorms on a finite-dimensional space

Abstract

Our main result states that, given a finite-dimensional vector space E, the pseudometric defined in the set of continuous quasinorms Q0=\\|·\|:E\ as d(\|·\|X,\|·\|Y)=\μ:\|·\|X ≤λ\|·\|Y≤μ\|·\|X for some λ \ induces, in fact, a complete norm when we take the obvious quotient Q=Q0/\! and define the appropriate operations on Q. We finish the paper with a little explanation of how this space and the Banach-Mazur compactum are related.