The anomalous exponent, eta p, for the decay of the reunion probability of p vicious walkers, each of length N, in d (=2- epsilon ) dimensions, is shown to come from the multiplicative renormalization constant of a p directed polymer partition function. Using renormalization group (RG) we evaluate eta p to O( epsilon 2). The survival probability exponent is eta p/2. For p=2, our RG is exact and eta p stops at O( epsilon ). For d=2, the log corrections are also determined. The number of walkers that are sure to reunite is 2 and has no epsilon expansion
In this article we study a one dimensional model for a polymer in a poor solvent: the random walk on...
Abstract. We prove the scaling relation = 2 1 between the transversal expo-nent and the uctuati...
Abstract We give evidence that the functional renormalization group (FRG), developed to study disord...
The reunion and survival probabilities of p random walkers in d dimensions with a mutual repulsive i...
We use a renormalization group to calculate the reunion and survival exponents of a set of random wa...
The average size of long chains below the theta point is discussed in terms of a continuum model in ...
The end vector distribution function of the self-avoiding polymer chain is investigated using the re...
Abstract. We study a 1+1-dimensional directed polymer in a random environment on the integer lattice...
We compute the exponent fl for self-avoiding walks in three dimensions. We get fl = 1:1575 \Sigma 0:...
A vicious-walker system consists of N random walkers on a line with any two walkers annihilating eac...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
In this paper we investigate the survival probability, \theta_n, in high-dimensional statistical phy...
Using a renormalization group method of analysis of series, in which the order of truncation plays t...
We calculate the survival probability of a diffusing test particle in an environment of diffusing pa...
In this article we study a one dimensional model for a polymer in a poor solvent: the random walk on...
Abstract. We prove the scaling relation = 2 1 between the transversal expo-nent and the uctuati...
Abstract We give evidence that the functional renormalization group (FRG), developed to study disord...
The reunion and survival probabilities of p random walkers in d dimensions with a mutual repulsive i...
We use a renormalization group to calculate the reunion and survival exponents of a set of random wa...
The average size of long chains below the theta point is discussed in terms of a continuum model in ...
The end vector distribution function of the self-avoiding polymer chain is investigated using the re...
Abstract. We study a 1+1-dimensional directed polymer in a random environment on the integer lattice...
We compute the exponent fl for self-avoiding walks in three dimensions. We get fl = 1:1575 \Sigma 0:...
A vicious-walker system consists of N random walkers on a line with any two walkers annihilating eac...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
We introduce a random walk in random environment associated to an underlying directed polymer model ...
In this paper we investigate the survival probability, \theta_n, in high-dimensional statistical phy...
Using a renormalization group method of analysis of series, in which the order of truncation plays t...
We calculate the survival probability of a diffusing test particle in an environment of diffusing pa...
In this article we study a one dimensional model for a polymer in a poor solvent: the random walk on...
Abstract. We prove the scaling relation = 2 1 between the transversal expo-nent and the uctuati...
Abstract We give evidence that the functional renormalization group (FRG), developed to study disord...