Real analytic extension of functions on normal crossings
Abstract
We consider a compact Cω manifold X and finitely many regular Cω submanifolds Y1, …, Yq of X, which are closed subsets in X, such that the union of Yj's has only normal crossings. We show that every continuous function on the union which is of class Cω on each Yj can be extended to a Cω function on X. A crucial feature of our proof is to employ basic tools of real analytic geometry -- Cartan Theorems A and B.
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