Convergence of the Non-Uniform Physarum Dynamics

Abstract

Let c ∈ Zm> 0, A ∈ Zn× m, and b ∈ Zn. We show under fairly general conditions that the non-uniform Physarum dynamics \[ xe = ae(x,t) (|qe| - xe) \] converges to the optimum solution x* of the weighted basis pursuit problem minimize cT x subject to A f = b and |f| x. Here, f and x are m-vectors of real variables, q minimizes the energy Σe (ce/xe) qe2 subject to the constraints A q = b and supp(q) ⊂eq supp(x), and ae(x,t) > 0 is the reactivity of edge e to the difference |qe| - xe at time t and in state x. Previously convergence was only shown for the uniform case ae(x,t) = 1 for all e, x, and t. We also show convergence for the dynamics \[ xe = xe · ( ge (|qe|xe) - 1),\] where ge is an increasing differentiable function with ge(1) = 1. Previously convergence was only shown for the special case of the shortest path problem on a graph consisting of two nodes connected by parallel edges.