Entropy production in the cyclic lattice Lotka-Volterra model
Abstract
The cyclic Lotka-Volterra model in a D-dimensional regular lattice is considered. Its ``nucleus growth'' mode is analyzed under the scope of Tsallis' entropies Sq=(1-Σi piq)/(q-1), q∈ R. It is shown both numerically and by means of analytical considerations that a linear increase of entropy with time, meaning finite asymptotic entropy rate, is achieved for the entropic index qc=1-1/D. Although the lattice exhibits fractal patterns along its evolution, the characteristic value of q can be interpreted in terms of very simple features of the dynamics.
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