Abstract
We give another proof of Poisson’s integral formula for harmonic functions
in a ball or a half space by using heat kernels with Green’s formula.
We wish to emphasize that this method works well even for a half space,
which is an unbounded domain;
the functions involved are integrable, since the heat kernel decays rapidly.
This method needs no trick such as the subordination identity,
which is indispensable when applying the Fourier transform method for a half space.