On the bifurcation sets of functions definable in o-minimal structures
Abstract
Let g:X -> Y be a smooth (i.e. C∞ differentiable) map between two smooth manifolds. In analogy with the case of complex polynomial functions, we say that y0 in Y is a typical value of g if there exists an open neighbourhood U of y0 in Y, such that the restriction g:g-1(U) -> U is a C∞ trivial fibration. If y0 in Y is not a typical value of g, then y0 is called an atypical value of g. We denote by Bg the bifurcation set of g, i.e. the set of atypical values of g. In the case of a complex polynomial function f:Cn -> C it is known that Bf is a finite set. It was previously proved that the bifurcation sets of real polynomial functions are also finite. The aim of this note is to show that the bifurcation set Bf of a smooth definable function f:Rn -> R is finite .
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