The
$$\bar \partial $$
-problem with support conditions on some weakly pseudoconvex domainswith support conditions on some weakly pseudoconvex domains |
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Authors: | Judith Brinkschulte |
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Institution: | 1.Mathematisches Institut,Universit?t Leipzig,Leipzig,Germany |
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Abstract: | We consider a domain Ω with Lipschitz boundary, which is relatively compact in ann-dimensional Kähler manifold and satisfies some “logδ-pseudoconvexity” condition. We show that the\(\bar \partial \)-equation with exact support in ω admits a solution in bidegrees (p, q), 1≤q≤n?1. Moreover, the range of\(\bar \partial \) acting on smooth (p, n?1)-forms with support in\(\bar \Omega \) is closed. Applications are given to the solvability of the tangential Cauchy-Riemann equations for smooth forms and currents for all intermediate bidegrees on boundaries of weakly pseudoconvex domains in Stein manifolds and to the solvability of the tangential Cauchy-Riemann equations for currents on Levi flatCR manifolds of arbitrary codimension. |
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