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The Boggess-Polking extension theorem for<Emphasis Type="Italic">CR</Emphasis> functions on manifolds with corners

Authors:	Luca Baracco Giuseppe Zampieri

Institution:	(1) Dipartimento di Matematica, Università di Padova, via Belzoni 7, 35131 Padova, Italy

Abstract:	We give the “boundary version” of the Boggess-PolkingCR extension theorem. LetM andN be real generic submanifolds of ℂⁿ withN ⊂M and letV be a “wedge” inM with “edge”N and “profile” Σ ⊂T _NM in a neighborhood of a pointz _o.We identify in natural manner $T_N M_ \to ^{ k} \frac{{T^\mathbb{C} M\backslash N}}{{T^\mathbb{C} N}}, \frac{{TM}}{{T^\mathbb{C} M}}\mathop \to \limits_j^ \sim T_M X$ and assume that for a holomorphic vector fieldL tangent toM and verifying $L\left( {z_0 } \right) + \bar L\left( {z_0 } \right) \in kL\left( {\Sigma z_0 } \right)$ we have that the Levi form $j\mathcal{L}\left( L \right)z_0 : = j\left( {\frac{1}{{2i}}\left {L,\bar L} \right]z_0 } \right)$ takes a value $\in T_M Xz_0 ,iv_0 \ne 0 (say \left\| {v_0 } \right\| = 1)$ . Then we prove thatCR functions onV extend ∀_ω to a wedgeV ₁ “attached” toV in direction of a vector fieldiV such that \|pr(iV(z ₀))−iv ₀\| < ε (where pr is the projection pr:T _NX →T _MX \|_N).We then prove that when the Levi cone “relative to Σ”iZ _Σ = convex hull $\left\{ {j\mathcal{L}(L)z_0 \left\| {L(z_0 ) + } \right.\bar L(z_0 ) \in k(\Sigma )z_0 } \right\}$ is open inT _MX, thenCR functions extend to a “full” wedge with edgeN (that is, with a profile which is an open cone ofT _NX). Finally, we prove that iff is defined in a couple of wedges ±V with profiles ±Σ such thatiZ _Σ =T _MX, and is continuous up toN, thenf is in fact holomorphic atz _o.

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