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Lorentz
Lorentz Physics. (ləˈrɛnts) The name of H. A. Lorentz (1853–1928), Dutch physicist, used attrib. to designate various concepts and phenomena described by him, as Lorentz (–FitzGerald) contraction = FitzGerald contraction; so Lorentz-contract vb. trans.; Lorentz-covariant, -invariant adjs., covariant...
Oxford English Dictionary
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Friedrich Lorentz
Friedrich Lorentz (18 December 1870, Güstrow – 29 March 1937) was a German historian. Kaszubi: kultura ludowa i język, translated as The Cassubian Civilization by Friedrich Lorentz and A.
wikipedia.org
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Hendrik A. Lorentz - Nobel Lecture - NobelPrize.org
When Prof. Zeeman made his discovery, the electron theory was complete in its main features and in a position to interpret the new phenomenon. A man who has peopled the whole world with electrons and made them covibrate with light will not scruple to assume that it is also electrons which vibrate within the particles of an incandescent ...
www.nobelprize.org
2.1: Lorentz Force - Physics LibreTexts
The term "Lorentz force" is simply a concise way to refer to the combined contributions of the electric and magnetic fields. A common application of the Lorentz force concept is in analysis of the motions of charged particles in electromagnetic fields. The Lorentz force causes charged particles to exhibit distinct rotational ("cyclotron ...
phys.libretexts.org
Lore Lorentz
Lore Lorentz (12 September 1920 – 22 February 1994) was a German Kabarett artist and standup comedian. Until 1983 Lore and Kay Lorentz were directors of the Kommödchen and part of the ensemble.
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Proof of Lorentz(seconde grade) cone is convex and self-dual Given Lorentz cone $L^{n+1}=\\{(x,t)\in \mathbb R^{n+1}: ||x||_2 \leq t\\}$ How can i proof the convexity and self duality? I tried to do it from definitio...
Assume $\|y\|_2\le s$, $s\ge0$. Then $$ (x,y) + st \ge -\|x\|_2\|y\|_2 +st \ge0 \quad \forall \|x\|_2\le t, $$ hence $(y,s)$ in the dual cone of $L^{n+1}$. Conversely, let $(y,s)$ be in the dual cone. Then $$ (x,y)+st \ge 0\quad \forall \|x\|_2\le t. $$ Setting $x=-y$, $t=\|y\|$, shows $-\|y\|_2^2 +...
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Dominique Lorentz
Dominique Lorentz is a French investigative journalist who has written books on the stakes and reality of nuclear proliferation, as well as a film documentary This, according to Lorentz, explains how 44 states today have the capacity of developing weapons of mass destruction.
wikipedia.org
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Lie Algebra of the Lorentz Group $SO(1,3)^{\uparrow}$ I'm trying to get my head around the Lie algebra of the Lorentz group once and for all, but have got tied up in knots. Where is my error in the following? The uni...
In your second paragraph, you are viewing $SL(2,\mathbb C)$ as a _real_ Lie group. Its Lie algebra is $\mathfrak{sl}_2(\mathbb C)$ viewed as a _real_ Lie algebra. The complexification is therefore $\mathfrak{sl}_2(\mathbb C)\otimes_{\mathbb R}\mathbb C$. This is not the complex Lie algebra $\mathfra...
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Lorentz Lange
Lorentz Lange (23 December 1783 – 8 March 1860) was a Norwegian judge and politician.
He was born in Vang, Hedmark.
wikipedia.org
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Is hyperbolic distance on the hyperboloid model holds good even after lorentz transformation I found the below link to calculate hyperbolic distance in hyperboloid model but I am looking is this formula is invariant e...
Yes, Lorentz transformations prserve distances, they describe the isometries of the hyperbolic plane. A Matrix $\Lambda$ is a Lorentz transformation if $\Lambda^T\,\eta\,\Lambda=\eta$.
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Lorentz Schmidt
Lorenz Schmidt or Lorentz Schmidt (1884 - 1952) was a prominent architect in Kansas. His firm was Lorentz Schmidt & Co.
He graduated from the University of Illinois in 1913.
Harry Overend worked for his firm.
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Lorentz curve
Lorentz curve may refer to
the Cauchy–Lorentz distribution, a probability distribution
the Lorenz curve, a graphical representation of the inequality
wikipedia.org
en.wikipedia.org
Instituut-Lorentz for theoretical physics, Universiteit Leiden
A legacy of excellence. Follow the Leiden footprints of Lorentz, Einstein, Ehrenfest, Kramers, Uhlenbeck, Casimir, Tinbergen ... The oldest institute for theoretical physics in The Netherlands.
www.lorentz.leidenuniv.nl
Constructing a bilinear form on $\mathbb{R}^2$ that gives rise to a particular matrix As the title says, I'm trying to create a bilinear form $B(\cdot, \cdot)$ on $\mathbb{R}^2$ with some particular constraints (which...
. $$
This demonstrates bilinearity, and I don't think you need positive-definiteness since this is a Lorentz metric.
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(PDF) Decoupling control and control parameter calibration for Lorentz ...
The strategy of decoupling control and the calibration technology of control parameters are pivotal to realize ultra-precision motion control for Lorentz planar motors. In this paper, a 3-DOF ...
www.researchgate.net