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Right inverses for partial differential operators on Fourier hyperfunctions

Tom 183 / 2007

Michael Langenbruch Studia Mathematica 183 (2007), 273-299 MSC: Primary 35E20; Secondary 46A63, 46F15. DOI: 10.4064/sm183-3-5

Streszczenie

We characterize the partial differential operators $P(D)$ admitting a continuous linear right inverse in the space of Fourier hyperfunctions by means of a dual $( \overline{\Omega})$-type estimate valid for the bounded holomorphic functions on the characteristic variety $V_P$ near $\mathbb R^d$. The estimate can be transferred to plurisubharmonic functions and is equivalent to a uniform (local) Phragmén–Lindelöf-type condition.

Autorzy

  • Michael LangenbruchDepartment of Mathematics
    University of Oldenburg
    D-26111 Oldenburg, Germany
    e-mail

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