This document uses a custom class file (\texttt{mathreport.cls}). This keeps the main file clean. The typography is set to Bringhurst's standards: wide margins, Palatino font, and old-style figures (e.g., 12345).
\section{Mathematical Theory}
We define our primary operator in the Hilbert space $\mathcal{H}$.
Introduciamo alcuni concetti di teoria dei grafi e alcuni risultati del corso che verranno usati nel corso della sperimentazione.
Scopo del progetto è verificare numericamente i risultati
\begin{definition}[Compact Operator]
An operator $T: X \to Y$ is compact if $\overline{T(B_X)}$ is compact in $Y$.
\end{definition}
\begin{theorem}[Spectral Theorem]
There exists an orthonormal basis of eigenvectors.
\end{theorem}
Consider the harmonic series shown in \cref{eq:harmonic}. The styling is handled entirely by the external class file.
\begin{equation}\label{eq:harmonic}
H_n = \sum_{k=1}^n \frac{1}{k}\approx\ln n + \gamma
\end{equation}
\section{Results and Discussion}
\lipsum[2-4]
Nell'analisi consideriamo i grafi di Erdo''s-Reiny (Figura)
alberto
1 month ago