The Chabauty space of Qp×
Abstract
Let C(G) denote the Chabauty space of closed subgroups of the locally compact group G. In this paper, we first prove that C (Qp×) is a proper compactification of N, identified with the set N of open subgroups with finite index. Then we identify the space C(Qp×) N up to homeomorphism: e.g. for p=2, it is the Cantor space on which 2 copies of N (the 1-point compactification of N) are glued.
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