On the growth rate inequality for periodic points in the two sphere
Abstract
Let f:S2 S2 be a continuous map such that deg f = d, |d|>1. Suppose f has two attracting fixed points denoted N and S and let A=S2 \N,S\. Assume that if a loop γ⊂ f-1(A) is homotopically trivial in A, then f(γ) is also homotopically trivial in A. Then, for all n, f has at least |dn -1| fixed points.
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