We investigate the regularity of functions $g$ such that $g^{2}=f$, where $f$ is a given nonnegative function of one variable. Assuming that $f$ is of class $C^{2m}$ ($m > 1$) and vanishes together with its derivatives up to order $2m-4$ at all its local minimum points, one can find a $g$ of class $C^{m}$. Under the same assumption on the minimum points, if $f$ is of class $C^{2m+2}$ then $g$ can be chosen such that it admits a derivative of order $m+1$ everywhere. Counterexamples show that these results are sharp.
On square roots of class $C^m$ of nonnegative functions of one variable
PERNAZZA, LUDOVICO
2010-01-01
Abstract
We investigate the regularity of functions $g$ such that $g^{2}=f$, where $f$ is a given nonnegative function of one variable. Assuming that $f$ is of class $C^{2m}$ ($m > 1$) and vanishes together with its derivatives up to order $2m-4$ at all its local minimum points, one can find a $g$ of class $C^{m}$. Under the same assumption on the minimum points, if $f$ is of class $C^{2m+2}$ then $g$ can be chosen such that it admits a derivative of order $m+1$ everywhere. Counterexamples show that these results are sharp.File in questo prodotto:
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