Estimates for the ∂̄-Neumann problem for pseudoconvex domains in C2 of finite type
AUTOR(ES)
Chang, D. C.
RESUMO
We outline results obtained for the ∂̄-Neumann problem for an arbitrary pseudoconvex domain in C2 of finite type. We obtain an approximation to the Neumann operator. A number of sharp estimates for the solution of ∂̄u = f are a consequence; one of these is an extension of the L1 estimate of Henkin and Skoda used to characterize the zero sets of functions of the Nevanlinna class.
ACESSO AO ARTIGO
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