Treated in this volume are selected topics in analytic &Ggr;-almost-periodic functions and their representations as &Ggr;-analytic functions in the big-plane; n -tuple Shilov boundaries of function spaces, minimal norm principle for vector-valued functions and their applications in the study of vector-valued functions and n -tuple polynomial and rational hulls. Applications to the problem of existence of n -dimensional complex analytic structures, analytic &Ggr;-almost-periodic structures and structures of &Ggr;-analytic ...
Read More
Treated in this volume are selected topics in analytic &Ggr;-almost-periodic functions and their representations as &Ggr;-analytic functions in the big-plane; n -tuple Shilov boundaries of function spaces, minimal norm principle for vector-valued functions and their applications in the study of vector-valued functions and n -tuple polynomial and rational hulls. Applications to the problem of existence of n -dimensional complex analytic structures, analytic &Ggr;-almost-periodic structures and structures of &Ggr;-analytic big-manifolds respectively in commutative Banach algebra spectra are also discussed.
Read Less
Add this copy of Big-Planes, Boundaries and Function Algebras (Volume to cart. $189.47, good condition, Sold by Bonita rated 4.0 out of 5 stars, ships from Newport Coast, CA, UNITED STATES, published 1992 by North Holland.