Hermann Render
will speak on
Fischer decomposition for entire functions and the Dirichlet problem for unbounded quadratic surfaces
Time: 3:00PM
Date: Tue 25th October 2022
Location: Seminar Room SCN 1.25
[map]
Further informationAbstract: Let $P_{2k}$ be a homogeneous non-negative polynomial of degree 2k and
assume that $P_j £ for j$=0,...,\beta <2k$ are homogeneous polynomials of degree $j$.
Further a certain integral inequality depending on a parameter \alpha and $P_2k$ is assumed which
is valid for all homogeneous polynomials of degree m.
The main result of the talk states that for any entire function f of order
$\rho < ( 2k-\beta ) / \alpha$ there exist entire functions $q$ and $r$
of finite order with
$f= ( P_2k-P_\beta -....-P_0 ) q+r$ and $\Delta ^{k}r=0$
where $\Delta$ is the Laplace operator.
This result is used to establish the existence of entire harmonic solutions
of the Dirichlet problem for cylinders and parabola-shaped domains for data
given by entire functions of order smaller than $1$ and $1/2$ respectively.
Join Zoom Meeting https://ucd-ie.zoom.us/j/66771287917
(This talk is part of the Analysis series.)
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