Tesi etd-09102019-012740 |
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Tipo di tesi
Tesi di laurea magistrale
Autore
PAPPALETTERA, UMBERTO
URN
etd-09102019-012740
Titolo
Large Deviations for SDEs
Dipartimento
MATEMATICA
Corso di studi
MATEMATICA
Relatori
relatore Prof. Flandoli, Franco
Parole chiave
- Friedlin-Wentzell theorem
- large deviations
- Peano phenomenon
- stochastic differential equations
Data inizio appello
25/10/2019
Consultabilità
Completa
Riassunto
Large Deviations concern about giving sharp logarithmic asymptotics as $\varepsilon \to 0$ for the probabilities $\mu^\varepsilon(A)$, where $\mu^\varepsilon$ is a family of probability measures on a metric space indexed by $\varepsilon>0$. We consider mostly the case where $\mu^\varepsilon$ is the law of a random process, solution to certain SDE, with noise intensity equal to $\varepsilon$. Starting from the classical Friedlin-Wentzell Theorem, that treats the case of drift $b$ bounded and Lipschitz continuous ,we find weaker sufficient conditions on $b$ which guarantee the validity of a Large Deviations Principle.
Moreover, in the particular case $b(x) = x \|x\|^{\gamma-1}$, $\gamma \in (0,1)$, in addition to the previous one we establish a second Large Deviation Principle, strictly related to the Peano phenomenon.
Moreover, in the particular case $b(x) = x \|x\|^{\gamma-1}$, $\gamma \in (0,1)$, in addition to the previous one we establish a second Large Deviation Principle, strictly related to the Peano phenomenon.
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