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Sheaves of continuous definable functions

Published online by Cambridge University Press:  12 March 2014

Anand Pillay*
Affiliation:
Department of Mathematics, University of Notre Dame, Notre Dame, Indiana 46556

Extract

Let M be an o-minimal structure or a p-adically closed field. Let be the space of complete n-types over M equipped with the following topology: The basic open sets of are of the form Ũ = {pSn (M): Up} for U an open definable subset of Mn . is a spectral space. (For M = K a real closed field, is precisely the real spectrum of K[X 1, …, Xn ]; see [CR].) We will equip with a sheaf of LM -structures (where LM is a suitable language). Again for M a real closed field this corresponds to the structure sheaf on (see [S]). Our main point is that when Th(M) has definable Skolem functions, then if p, it follows that M(p), the definable ultrapower of M at p, can be factored through Mp , the stalk at p with respect to the above sheaf. This depends on the observation that if MN, aNn and f is an M-definable (partial) function defined at a, then there is an open M-definable set UNn with aU, and a continuous M-definable function g:UN such that g(a) = f(a).

In the case that M is an o-minimal expansion of a real closed field (or M is a p-adically closed field), it turns out that M(p) can be recovered as the unique quotient of Mp which is an elementary extension of M.

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 1988

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References

REFERENCES

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