Along with the development of the theory of slice regular functions over the real algebra of quaternions H during the last decade, some natural questions arose about slice regular functions on the open unit ball B in H. This work establishes several new results in this context. Along with some useful estimates for slice regular self-maps of B fixing the origin, it establishes two variants of the quaternionic Schwarz-Pick lemma, specialized to maps B→B that are not injective. These results allow a full generalization to quaternions of two theorems proven by Landau for holomorphic self-maps f of the complex unit disk with f(0)=0. Landau had computed, in terms of a:=|f′(0)|, a radius ρ such that f is injective at least in the disk Δ(0,ρ) and such that the inclusion f(Δ(0,ρ))⊇Δ(0,ρ2) holds. The analogous result proven here for slice regular functions B→B allows a new approach to the study of Bloch-Landau-type properties of slice regular functions B→H.
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