Effective ojasiewicz gradient inequality and finite determinacy of non-isolated Nash function singularities
Abstract
Let X⊂ Rn be a compact semialgebraic set and let f:X R be a nonzero Nash function. We give a Solern\'o and D'Acunto-Kurdyka type estimation of the exponent ∈[0,1) in the ojasiewicz gradient inequality |∇ f(x)| C|f(x)| for x∈ X, |f(x)|< for some constants C,>0, in terms of the degree of a polynomial P such that P(x,f(x))=0, x∈ X. As a corollary we obtain an estimation of the degree of sufficiency of non-isolated Nash functions singularities
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