The structures of Hausdorff metric in non-Archimedean spaces

Abstract

For non-Archimedean spaces X and Y, let M (X), M(V → W) and D (X, Y) be the ballean of X (the family of the balls in X ), the space of mappings from X to Y, and the space of mappings from the ballen of X to Y, respectively. By studying explicitly the Hausdorff metric structures related to these spaces, we construct several families of new metric structures (e.g., u, β X, Yλ , β X, Y λ ) on the corresponding spaces, and study their convergence, structural relation, law of variation in the variable λ, including some normed algebra structure. To some extent, the class β X, Yλ is a counterpart of the usual Levy-Prohorov metric in the probability measure spaces, but it behaves very differently, and is interesting in itself. Moreover, when X is compact and Y = K is a complete non-Archimedean field, we construct and study a Dudly type metric of the space of K-valued measures on X.