Coincidence of critical points for directed polymers for general environments and random walks
Abstract
For the directed polymer in a random environment (DPRE), two critical inverse-temperatures can be defined. The first one, βc, separates the strong disorder regime (in which the normalized partition function Wβn tends to zero) from the weak disorder regime (in which Wβn converges to a nontrivial limit). The other, βc, delimits the very strong disorder regime (in which Wβn converges to zero exponentially fast). It was proved previously that βc= βc when the random environment is upper-bounded for the DPRE based on the simple random walk. We extend this result to general environment and arbitrary reference walk. We also prove that βc=0 if and only the L2-critical point is trivial.
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