Ernst denklemi

Ernst denklemi, matematik'te doğrusal-olmayan bir kısmi diferansiyel denklem'dir.

Ünlü fizikçi Frederick J. Ernst^[1] tarafından bulunmuş olduğundan, "Ernst denklemi" olarak adlandırılmıştır.

Sağ tarafında Birinci dereceden kısmî türevler içeren ve doğrusal olmayan terimleri olan bir denklemdir. Çözümü aranan u karmaşık fonksiyonunun gerçel kısmı R(u), denklemin sol tarafındaki İkinci dereceden kısmî türevlerin çarpımı halinde belirdiğinden, denklemin her iki tarafı da doğrusal-olmayan (non-linear) terimler ihtivâ etmektedir. Denklem aşağıdaki şekilde verilmektedir:^[2]

${\displaystyle {\displaystyle \mathrm{\Re }(u)(u_{rr}+u_r/r+u_{zz})=(u_r{)}^2+(u_z{)}^2.}}$

Einstein alan denklemlerinin noksansız çözümlerini elde etmek için kullanılan doğrusal olmayan bir kısmi türevsel denklemdir.

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• 1971: Frederick J. Ernst, Exterior-Algebraic Derivation of Einstein Field Equations Employing a Generalized Basis
• 1974: Frederick J. Ernst, Complex potential formulation of the axially symmetric gravitational field problem
• 1974: Frederick J. Ernst, Weyl conform tensor for stationary gravitational fields
• 1975: Frederick J. Ernst, Black holes in a magnetic universe
• 1975: Frederick J. Ernst, Erratum: Complex potential formulation of the axially symmetric gravitational field problem
• 1975: John E. Economou & Frederick J. Ernst, Weyl conform tensor of =2 Tomimatsu–Sato spinning mass gravitational field
• 1976: Frederick J. Ernst & Walter J. Wild, Kerr black holes in a magnetic universe
• 1976: Frederick J. Ernst, New representation of the Tomimatsu–Sato solution
• 1976: Frederick J. Ernst, Removal of the nodal singularity of the C-metric
• 1977: Frederick J. Ernst, A new family of solutions of the Einstein field equations
• 1978: Frederick J. Ernst, Coping with different languages in the null tetrad formulation of general relativity
• 1978: Frederick J. Ernst & I. Hauser, Field equations and integrability conditions for special type N twisting gravitational fields
• 1978: Frederick J. Ernst, Generalized C-metric
• 1978: Isidore Hauser & Frederick J. Ernst, On the generation of new solutions of the Einstein–Maxwell field equations
• 1979: I. Hauser & Frederick J. Ernst, SU(2,1) generation of electrovacs from Minkowski space
• 1979: (Erratum) Coping with different languages in the null tetrad formulation of general relativity
• 1979: (Erratum) Generalized C metric
• 1980: Isidore Hauser & Frederick J. Ernst, A homogeneous Hilbert problem for the Kinnersley–Chitre transformations of electrovac space-times
• 1980: Isidore Hauser & Frederick J. Ernst, A homogeneous Hilbert problem for the Kinnersley–Chitre transformations
• 1981: Isidore Hauser & Frederick J. Ernst, Proof of a Geroch conjecture
• 1982: Dong-sheng Guo & Frederick J. Ernst, Electrovac generalization of Neugebauer's N = 2 solution of the Einstein vacuum field equations
• 1983: Y. Chen, Dong-sheng Guo & Frederick J. Ernst, Charged spinning mass field involving rational functions
• 1983: Cornelius Hoenselares & Frederick J. Ernst, Remarks on the Tomimatsu–Sato metrics
• 1987: Frederick J. Ernst, Alberto Garcia D & Isidore Hauser, Colliding gravitational plane waves with noncollinear polarization. I
• 1987: Frederick J. Ernst, Alberto Garcia D & Isidore Hauser, Colliding gravitational plane waves with noncollinear polarization. II
• 1988: Frederick J. Ernst, Alberto Garcia D & Isidore Hauser, Colliding gravitational plane waves with noncollinear polarization. III
• 1989: Wei Li & Frederick J. Ernst, A family of electrovac colliding wave solutions of Einstein's equations
• 1989: Isidore Hauser & Frederick J. Ernst, Initial value problem for colliding gravitational plane waves. I
• 1989: Isidore Hauser & Frederick J. Ernst, Initial value problem for colliding gravitational plane waves. II
• 1990: Isidore Hauser & Frederick J. Ernst, Initial value problem for colliding gravitational plane waves. III
• 1990: Cornelius Hoenselares & Frederick J. Ernst, Matching pp waves to the Kerr metric
• 1991: Wei Li, Isidore Hauser & Frederick J. Ernst, Colliding gravitational plane waves with noncollinear polarizations
• 1991: Wei Li, Isidore Hauser & Frederick J. Ernst, Colliding gravitational waves with Killing–Cauchy horizons
• 1991: Wei Li, Isidore Hauser & Frederick J. Ernst, Colliding wave solutions of the Einstein–Maxwell field equations
• 1991: Isidore Hauser & Frederick J. Ernst, Initial value problem for colliding gravitational plane waves. IV
• 1991: Wei Li, Isidore Hauser & Frederick J. Ernst, Nonimpulsive colliding gravitational waves with noncollinear polarizations
• 1993: Frederick J. Ernst & Isidore Hauser, On Gürses's symmetries of the Einstein equations

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