BBot
Apr 22'25
Exercise
[math]
\newcommand{\mathds}{\mathbb}[/math]
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Prove that the inverse of the adjacency matrix of [math]P(k)[/math], given by
[[math]]
A_k(\pi,\sigma)=\begin{cases}
1&{\rm if}\ \pi\leq\sigma\\
0&{\rm if}\ \pi\not\leq\sigma
\end{cases}
[[/math]]
is the Möbius matrix of [math]P[/math], given by [math]M_k(\pi,\sigma)=\mu(\pi,\sigma)[/math].