On harmonic renewal measures (Q1071403)

For a given probability measure \(\mu\) the author defines the corresponding harmonic renewal measure \(\nu_ h\) defined by \(\nu_ h=\sum^{\infty}_{n=1}n^{-1}\mu^{*n}\) (where * denotes convolution). He proves renewal theorems of the elementary type and the Blackwell type for certain nonlattice random walks.