Philippe Carmona
Published 2008-08-28Version 1
The sequence of random probability measures $\nu_n$ that gives a path of length $n$, $\unsur{n}$ times the sum of the random weights collected along the paths, is shown to satisfy a large deviations principle with good rate function the Legendre transform of the free energy of the associated directed polymer in a random environment. Consequences on the asymptotics of the typical number of paths whose collected weight is above a fixed proportion are then drawn.
Hidden invariance of last passage percolation and directed polymers
Scaling limit of a directed polymer among a Poisson field of independent walks
Directed polymers in a random environment: a review of the phase transitions
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