Tilings of the infinite p-ary tree and Cantor homeomorphisms
Abstract
We define a notion of tiling of the full infinite p-ary tree, establishing a series of equivalent criteria for a subtree to be a tile, each of a different nature; namely, geometric, algebraic, graph-theoretic, order-theoretic, and topological. We show how these results can be applied in a straightforward and constructive manner to define homeomorphisms between two given spaces of p-adic integers, Zp and Zq, endowed with their corresponding standard non-archimedean metric topologies.
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