Hyers-Ulam stability of loxodromic M\"obius difference equation

Abstract

Hyers-Ulam of the sequence \zn\n ∈ N satisfying the difference equation zi+1 = g(zi) where g(z) = az + bcz + d with complex numbers a , b , c and d is defined. Let g be loxodromic M\"obius map, that is, g satisfies that ad-bc =1 and a + d ∈ C [-2,2] . Hyers-Ulam stability holds if the initial point of \zn\n ∈ N is in the exterior of avoided region, which is the union of the certain disks of g-n(∞) for all n ∈ N .