Foundations of potential theory
- Publisher: Springer(Berlin [u.a.])
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topBook Parts
top- CHAPTER: Chapter I. The Force of Gravity.Access to Book Part
- CHAPTER: Chapter II. Fields of Force.Access to Book Part
- CHAPTER: Chapter III. The Potential.Access to Book Part
- CHAPTER: Chapter IV. The Divergence Theorem.Access to Book Part
- CHAPTER: Chapter V. Properties of Newtonian Potentials at points of free space.Access to Book Part
- CHAPTER: Chapter VI. Properties of Newtonian Potentials at Points Occupied by Masses.Access to Book Part
- CHAPTER: Chapter VII. Potentials as Solutions of Laplace's Equation; Electrostatics.Access to Book Part
- CHAPTER: Chapter VIII. Harmonic Functions.Access to Book Part
- CHAPTER: Chapter IX. Electric Image; Green's Function.Access to Book Part
- CHAPTER: Chapter X. Sequences of harmonic functions.Access to Book Part
- CHAPTER: Chapter XI. Fundamental Existence Theorems.Access to Book Part
- CHAPTER: Chapter XII. The logarithmic potential.Access to Book Part
How to cite
topKellogg, Oliver Dimon. Foundations of potential theory. Berlin [u.a.]: Springer, null. <http://eudml.org/doc/203661>.
@book{Kellogg,
author = {Kellogg, Oliver Dimon},
language = {eng},
location = {Berlin [u.a.]},
publisher = {Springer},
title = {Foundations of potential theory},
url = {http://eudml.org/doc/203661},
}
TY - BOOK
AU - Kellogg, Oliver Dimon
TI - Foundations of potential theory
CY - Berlin [u.a.]
PB - Springer
LA - eng
UR - http://eudml.org/doc/203661
ER -
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- Bruce Calvert, Harnack's Theorems on convergence for non linear operators
- Martina Šimůnková, On Kelvin type transformation for Weinstein operator
- André Somen, Emploi des harmoniques sphériques
- Ivan Hlaváček, Some variational principles for nonlinear elastodynamics
- Ivan Hlaváček, Variational principles in the linear theory of elasticity for general boundary conditions
- Miroslav Hlaváček, Uniqueness of the solution of the boundary-initial value problem for a linear elastic Cosserat continuum
- Adriano Montanaro, A completion of A. Bressan's work on axiomatic foundations of the Mach Painlevé type for various classical theories of continuous media. Part 1. Completion of Bressan's work based on the notion of gravitational equivalence of affine inertial frames
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