The Schwarz-Pick Theorem for the Unit Disk of the Projective Matrix Space

The group of all holomorphic automorphisms of the complex unit disk consists of Mobius transformations involving translation-like holomorphic automorphisms and rotations. The former are called gyrotranslations. As opposed to translations of the Ž complex plane, which are associative-commutative oper

## Abstract Let ‖ · ‖ denote the uniform norm in the unit disk of the complex plane ℂ. The main result in this note is as follows: __For any complex polynomial P of degree at most n and any α__ ∈ ℂ __the inequality__ ‖__P__ ‖ ⩽ (__n__ + 1)(‖__z P__ (__z__) + __α__ ‖ ‐ |__α__ |) __holds.__ For any

Let X be a complex strictly convex Banach space with an open unit ball B. For each compact, holomorphic and fixed-point-free mapping f: B Ä B there exists ! # B such that the sequence [ f n ] of iterates of f converges locally uniformly on B to the constant map taking the value !.

## Abstract **BACKGROUND**: The recurrence risk for neural tube defects (NTDs) in subsequent pregnancies is approximately 3%, or 40 times the background risk. Prevention projects target these high‐risk women to increase their folic acid consumption during the periconceptional period, a behavior whi

## Abstract Let 1 ≤ __p__ < ∞ and let __T__ be an ergodic measure‐preserving transformation of the finite measure space (__X__, __μ__). The classical __L^p^__ ergodic theorem of von Neumann asserts that for any __f__ ϵ __L^p^__ (__X__, __μ__), equation image When __X__ = 𝕊^__n__^ (the unit spher