Solvable model of a polymer in random media with long ranged disorder correlations
Abstract
We present an exactly solvable model of a Gaussian (flexible) polymer chain in a quenched random medium. This is the case when the random medium obeys very long range quadratic correlations. The model is solved in d spatial dimensions using the replica method, and practically all the physical properties of the chain can be found. In particular the difference between the behavior of a chain that is free to move and a chain with one end fixed is elucidated. The interesting finding is that a chain that is free to move in a quadratically correlated random potential behaves like a free chain with R2 L, where R is the end to end distance and L is the length of the chain, whereas for a chain anchored at one end R2 L4. The exact results are found to agree with an alternative numerical solution in d=1 dimensions. The crossover from long ranged to short ranged correlations of the disorder is also explored.
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