Analytical Results for the Statistical Distribution Related to Memoryless Deterministic Tourist Walk: Dimensionality Effect and Mean Field Models
Abstract
Consider a medium characterized by N points whose coordinates are randomly generated by a uniform distribution along the edges of a unitary d-dimensional hypercube. A walker leaves from each point of this disordered medium and moves according to the deterministic rule to go to the nearest point which has not been visited in the preceding μ steps (deterministic tourist walk). Each trajectory generated by this dynamics has an initial non-periodic part of t steps (transient) and a final periodic part of p steps (attractor). The neighborhood rank probabilities are parameterized by the normalized incomplete beta function Id = I1/4[1/2,(d+1)/2]. The joint distribution Sμ,d(N)(t,p) is relevant, and the marginal distributions previously studied are particular cases. We show that, for the memory-less deterministic tourist walk in the euclidean space, this distribution is: S1,d(∞)(t,p) = [(1+Id-1) (t+Id-1)/(t+p+Id-1)] δp,2, where t=0,1,2,...,∞, (z) is the gamma function and δi,j is the Kronecker's delta. The mean field models are random link model, which corresponds to d ∞, and random map model which, even for μ = 0, presents non-trivial cycle distribution [S0,rm(N)(p) p-1]: S0,rm(N)(t,p) = (N)/\[N+1-(t+p)]Nt+p\. The fundamental quantities are the number of explored points ne=t+p and Id. Although the obtained distributions are simple, they do not follow straightforwardly and they have been validated by numerical experiments.
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