We prove the scale-invariant elliptic Harnack inequality (EHI) for nonnegative harmonic
functions on
.
The purpose of this note is to provide a simplified self-contained probabilistic proof of
the EHI in
that is accessible at the undergraduate level. We use the local
central limit theorem for simple symmetric random walks on
to establish Gaussian
bounds for the
-step
probability function. The uniform Green inequality and the classical balayage formula
then imply the EHI.
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