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Bell, Steven R.- Department of Mathematics, Purdue University
MOBIUS TRANSFORMATIONS, THE CARATHEODORY METRIC, AND THE OBJECTS OF COMPLEX ANALYSIS AND
BERGMAN COORDINATES Steven R. Bell
RECIPES FOR CLASSICAL KERNEL FUNCTIONS ASSOCIATED TO A
THE GREEN'S FUNCTION AND THE AHLFORS MAP STEVEN R. BELL
SZEGO COORDINATES, QUADRATURE DOMAINS, AND DOUBLE QUADRATURE DOMAINS
THE SZEGO KERNEL AND PROPER HOLOMORPHIC MAPPINGS TO A HALF PLANE
DENSITY OF QUADRATURE DOMAINS IN ONE AND SEVERAL COMPLEX VARIABLES
THE STRUCTURE OF THE SEMIGROUP OF PROPER HOLOMORPHIC MAPPINGS OF A PLANAR DOMAIN TO
THE BERGMAN KERNEL AND QUADRATURE DOMAINS IN THE PLANE
QUADRATURE DOMAINS AND KERNEL FUNCTION ZIPPING Steven R. Bell
COMPLEXITY IN COMPLEX ANALYSIS Steven R. Bell
AHLFORS MAPS, THE DOUBLE OF A DOMAIN, AND COMPLEXITY IN
A RIEMANN SURFACE ATTACHED TO DOMAINS IN THE PLANE
FINITELY GENERATED FUNCTION FIELDS AND COMPLEXITY IN POTENTIAL THEORY IN THE PLANE
COMPLEXITY OF THE CLASSICAL KERNEL FUNCTIONS OF POTENTIAL THEORY
UNIQUE CONTINUATION THEOREMS FOR THE -OPERATOR AND APPLICATIONS
THE FUNDAMENTAL ROLE OF THE SZEGO KERNEL IN POTENTIAL THEORY AND COMPLEX ANALYSIS
A RIEMANN MAPPING THEOREM FOR TWO-CONNECTED DOMAINS IN THE PLANE
AN IMPROVED RIEMANN MAPPING THEOREM AND COMPLEXITY IN POTENTIAL THEORY
