Convergence of iterates in nonlinear Perron-Frobenius theory

Abstract

Let C be a closed cone with nonempty interior C in a Banach space. Let f:C → C be an order-preserving subhomogeneous function with a fixed point in C. We introduce a condition which guarantees that the iterates fk(x) converge to a fixed point for all x ∈ C. This condition generalizes the notion of type K order-preserving for maps on Rn>0. We also prove that when iterates converge to a fixed point, the rate of convergence is always R-linear in two special cases: for piecewise affine maps and also for order-preserving, homogeneous, analytic, multiplicatively convex functions on Rn>0. This later category includes the maps associated with the homogeneous eigenvalue problem for nonnegative tensors.

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