Potential Theory in the Complex Plane

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Cambridge University Press, 16 mar 1995 - 232 páginas
Potential theory is the broad area of mathematical analysis encompassing such topics as harmonic and subharmonic functions.
 

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Índice

The Dirichlet Problem
85
Capacity
127
Applications
161
A Borel Measures
209
Bibliography
219
Index
225
Glossary of Notation
231
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Potential Theory in the Complex Plane
Thomas Ransford
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Términos y frases comunes

Applying Theorem Banach algebra Borel measure Borel polar set Borel probability measure bounded capacity compact set compact subset conformal mapping constant continuous function convergence convex function Corollary countable D₁ deduce define Definition denote Dirichlet problem disc dµ(w equilibrium measure example Exercise exists extended maximum principle finite Borel measure function h given gives Green's function h is harmonic harmonic function harmonic majorant harmonic measure Hence holomorphic function identity principle implies integral Julia set L¹(R Lebesgue measure Lemma Let f lim inf lim sup u(z locally uniformly log c(K maximum principle monic non-polar non-thin open set open subset peio polar set polynomial of degree positive harmonic function potential theory principle Theorem Proof of Theorem proper subdomain prove result follows satisfies simply connected subharmonic function submean inequality suppose TD(z theorem Theorem unique upper semicontinuous

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Información bibliográfica

TítuloPotential Theory in the Complex Plane
Número 28 de London Mathematical Society Student Texts, London Mathematical Society, ISSN 0963-1631
Volumen 28 de London Mathematical Society: London Mathematical Society student texts
Potential Theory in the Complex Plane, Thomas Ransford
AutorThomas Ransford
Ediciónilustrada
EditorCambridge University Press, 1995
ISBN0521466547, 9780521466547
N.º de páginas232 páginas
  
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