An example of a non non-archimedean Polish group with ample generics
Abstract
For an analytic P-ideal I, SI is the Polish group of all the permutations of N whose support is in I, with Polish topology given by the corresponding submeasure on I. We show that if Fin ⊂neq I, then SI has ample generics. This implies that there exists a non non-archimedean Polish group with ample generics.
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