A division's theorem on some class of C∞-functions
Abstract
Let En be the ring of the germs of C∞-functions at the origin in n. It is well known that if I is an ideal of En, generated by a finite number of germs of analytic functions, then I is closed. In this paper we consider an ideal of En generated by a finite number of germs in some class of C∞-functions that are not analytic in \`a, but quasi-analytic and we shall prove that the result holds in this general situation. We remark that the result is not true for a general ideal of finite type of En.
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