Critical Exponents for Branching Annihilating Random Walks with an Even Number of Offspring
Abstract
Recently, Takayasu and Tretyakov [Phys. Rev. Lett. 68, 3060 (1992)], studied branching annihilating random walks (BAW) with n=1-5 offspring. These models exhibit a continuous phase transition to an absorbing state. For odd n the models belong to the universality class of directed percolation. For even n the particle number is conserved modulo 2 and the critical behavior is not compatible with directed percolation. In this article I study the BAW with n=4 using time-dependent simulations and finite-size scaling obtaining precise estimates for various critical exponents. The results are consistent with the conjecture: β/ = 1/2, / = 7/4, γ = 0, δ = 2/7, η = 0, z = 8/7, and δh = 9/2.
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