Schrödinger–Newton equation
The Schrödinger–Newton equation, sometimes referred to as the Newton–Schrödinger or Schrödinger–Poisson equation, is a nonlinear modification of the Schrödinger equation with a Newtonian gravitational potential, where the gravitational potential emerges from the treatment of the wave function as a mass density, including a term that represents interaction of a particle with its own gravitational field. The inclusion of a self-interaction term represents a fundamental alteration of quantum mechanics. It can be written either as a single integro-differential equation or as a coupled system of a Schrödinger and a Poisson equation. In the latter case it is also referred to in the plural form.
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Choquard equationNewton-Schrödinger equationNewton-Schrödinger equationsSchrodinger-Newton EquationSchrodinger-Newton equationSchrodinger-Newton equationsSchrodinger–Newton equationSchrodinger–Newton equationsSchroedinger-Newton equationsSchrödinger-Newton equationSchrödinger-Newton equationsSchrödinger-Poisson equationSchrödinger–Newton equations
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Choquard equationElliott H. LiebFuzzy cold dark matterIndex of physics articles (S)Irene MorozList of scientific equations named after peopleList of things named after Erwin SchrödingerList of things named after Isaac NewtonNewton-Schrödinger equationNewton-Schrödinger equationsPenrose interpretationRemo RuffiniRoger PenroseSchrodinger-Newton EquationSchrodinger-Newton equationSchrodinger-Newton equationsSchrodinger–Newton equationSchrodinger–Newton equationsSchroedinger-Newton equationsSchrödinger-Newton equationSchrödinger-Newton equationsSchrödinger-Poisson equationSchrödinger–Newton equations
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Schrödinger–Newton equation
The Schrödinger–Newton equation, sometimes referred to as the Newton–Schrödinger or Schrödinger–Poisson equation, is a nonlinear modification of the Schrödinger equation with a Newtonian gravitational potential, where the gravitational potential emerges from the treatment of the wave function as a mass density, including a term that represents interaction of a particle with its own gravitational field. The inclusion of a self-interaction term represents a fundamental alteration of quantum mechanics. It can be written either as a single integro-differential equation or as a coupled system of a Schrödinger and a Poisson equation. In the latter case it is also referred to in the plural form.
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Die Schrödinger-Newton-Gleichu ...... ßen Anzahl Teilchen verwendet.
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The Schrödinger–Newton equatio ...... tion as the Choquard equation.
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Рівняння Шредінгера — Ньютона ...... в йому назву рівняння Шокарда.
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معادلة شرودنغر-نيوتن (Schrödin ...... ويتغير طور الموجه خلال الزمن.
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Die Schrödinger-Newton-Gleichu ...... ngleichung geschrieben werden.
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The Schrödinger–Newton equatio ...... eferred to in the plural form.
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Рівняння Шредінгера — Ньютона ...... рівнянь Шредінгера і Пуассона.
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معادلة شرودنغر-نيوتن (Schrödin ...... ويتغير طور الموجه خلال الزمن.
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Schrödinger-Newton-Gleichung
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Schrödinger–Newton equation
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Рівняння Шредінгера — Ньютона
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معادلة شرودنغر-نيوتن
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