For a convolution $$ f*h(x) = \sum_{s+t=x} f(s) h(t), $$ the dilated version of it is1 $$ f*_l h(x) …

Convolution and Fourier transform

For a given graph $\mathcal G$, we have an attribute on each node, denoted as $f_v$. All the node …

For a convolution $$ f*h(x) = \sum_{s+t=x} f(s) h(t), $$ the dilated version of it is1 $$ f*_l h(x) …

Convolution and Fourier transform

For a given graph $\mathcal G$, we have an attribute on each node, denoted as $f_v$. All the node …