the Ginzburg–Landau theory of superconductivity, the theory of Fermi liquids, the explanation of Landau damping in plasma physics, the Landau pole in...
42 KB (4,116 words) - 14:06, 26 September 2024
Darrieus–Landau instability Derjaguin–Landau–Verwey–Overbeek theory Ivanenko–Landau–Kähler equation Ginzburg–Landau theory Guderley–Landau–Stanyukovich...
2 KB (155 words) - 14:08, 6 July 2024
Kontsevich proposed a model for Landau–Ginzburg models which was worked out to the following definition: a Landau–Ginzburg model is a smooth variety X {\displaystyle...
26 KB (4,702 words) - 03:51, 1 July 2024
Diamagnetism (redirect from Landau diamagnetism)
consumption. Earnshaw's theorem seems to preclude the possibility of static magnetic levitation. However, Earnshaw's theorem applies only to objects with...
22 KB (2,404 words) - 19:56, 3 October 2024
Erdős–Anning theorem (discrete geometry) Erdős–Dushnik–Miller theorem (set theory) Erdős–Gallai theorem (graph theory) Erdős–Ginzburg–Ziv theorem (number theory)...
73 KB (6,015 words) - 12:17, 2 August 2024
Hohenberg–Mermin–Wagner theorem or Mermin–Wagner theorem (also known as Mermin–Wagner–Berezinskii theorem or Coleman theorem) states that continuous symmetries...
30 KB (4,312 words) - 08:41, 4 October 2024
expect to find in a grand unified theory. The Lagrangian density for Ginzburg–Landau theory combines the Lagrangian for the scalar field theory with the...
35 KB (5,951 words) - 16:28, 19 June 2024
for surface ships Lev Landau, theoretical physicist, developed the Ginzburg–Landau theory of superconductivity, explained the Landau damping in plasma physics...
13 KB (1,370 words) - 23:35, 9 August 2024
Goldstone boson (redirect from Goldstone's theorem)
(expressed as magnetic flux exclusion from a superconductor), cf. the Ginzburg–Landau theory. Primordial fluctuations during inflation can be viewed as Goldstone...
27 KB (3,717 words) - 08:49, 12 June 2024
Higgs mechanism (section Landau model)
theories arose to explain this during the 1950s, first for fermions (Ginzburg–Landau theory, 1950), and then for bosons (BCS theory, 1957). In these theories...
56 KB (6,713 words) - 14:56, 29 September 2024
Small set (combinatorics) Erdős–Ginzburg–Ziv theorem Polynomial method Van der Waerden's theorem Szemerédi's theorem Collatz conjecture Gilbreath's conjecture...
10 KB (937 words) - 23:04, 14 September 2024
Classical mechanics Classical field theory Dynamo theory Field theory Ginzburg–Landau theory Kinetic theory of gases Classical electromagnetism Perturbation...
24 KB (2,624 words) - 03:03, 18 October 2024
Fermi liquid theory (redirect from Landau's Fermi-liquid theory)
Fermi liquid theory (also known as Landau's Fermi-liquid theory) is a theoretical model of interacting fermions that describes the normal state of the...
23 KB (3,041 words) - 08:41, 18 October 2024
and climatologist Lev Landau, theoretical physicist, developed the Ginzburg–Landau theory of superconductivity, explained the Landau damping in plasma physics...
94 KB (9,592 words) - 11:51, 17 August 2024
effect. 1950 – The Ginzburg–Landau theory phenomenological theory of superconductors is formulated by Vitaly Ginzburg and Landau. 1950 – Tomonaga introduces...
59 KB (6,205 words) - 16:48, 9 October 2024
{\displaystyle q=2e} is the charge of the Cooper pair. The wave function is the Ginzburg–Landau order parameter: Ψ ( r ) = ρ ( r ) e i θ ( r ) . {\displaystyle \Psi...
14 KB (1,750 words) - 04:36, 27 September 2024
equation Mathisson–Papapetrou–Dixon equations Schrödinger–Newton equation Ginzburg–Landau equations in superconductivity London equations in superconductivity...
13 KB (1,095 words) - 04:32, 24 August 2024
Josephson junction is shown at right. Assume that superconductor A has Ginzburg–Landau order parameter ψ A = n A e i ϕ A {\displaystyle \psi _{A}={\sqrt {n_{A}}}e^{i\phi...
28 KB (4,270 words) - 11:23, 20 July 2024
followed included Nobel prize winners Nikolay Semyonov, Lev Landau, Alexandr Prokhorov, Vitaly Ginzburg; and Academy of Sciences members Sergey Khristianovich...
43 KB (4,495 words) - 10:59, 13 September 2024
collected in (Jaffe & Taubes 1980) about the existence of solutions to the Landau–Ginzburg vortex equations and the Bogomol'nyi monopole equations. Soon, he began...
8 KB (807 words) - 23:49, 15 September 2024
Alberti has given contributions to the study of various aspects of Ginzburg-Landau vortices and of the continuity equation. Alberti has been awarded the...
5 KB (475 words) - 07:51, 9 April 2024
with a PhD supervised by Amir Dembo with dissertation Limit theorems for Ginzburg–Landau ∇ φ {\displaystyle \nabla \varphi } random surfaces . Miller...
6 KB (672 words) - 19:42, 2 October 2024
bilinear estimates." 2002 Lin Fanghua for Some dynamical properties of Ginzburg-Landau vortices. Comm. Pure Appl. Math. 49 (1996), no. 4, 323–359. Gradient...
16 KB (2,145 words) - 16:20, 13 October 2024
been developed to study the physics of phase transitions, such as the Ginzburg–Landau theory, critical exponents and the use of mathematical methods of quantum...
61 KB (6,691 words) - 11:22, 7 September 2024
lifetime of these fluctuations increase, and becomes comparable to the Ginzburg-Landau time τ G L = π ℏ 8 k B ( T c 0 − T ) {\displaystyle \tau _{\mathrm...
5 KB (769 words) - 12:02, 12 January 2024
arXiv:0901.1859. doi:10.1016/j.aim.2010.06.016. Orlov, Dmitri (2012). "Landau-Ginzburg Models, D-branes, and Mirror Symmetry" (PDF). Matemática Contemporânea...
9 KB (796 words) - 21:38, 8 June 2024
nonlinear Schrödinger equation is a simplified 1+1-dimensional form of the Ginzburg–Landau equation introduced in 1950 in their work on superconductivity, and...
25 KB (3,387 words) - 07:49, 19 September 2024
Uncertainty principle (redirect from Uncertainty theorems in harmonic analysis)
For the number of electrons in a superconductor and the phase of its Ginzburg–Landau order parameter Δ N Δ φ ≥ 1. {\displaystyle \Delta N\,\Delta \varphi...
139 KB (19,260 words) - 21:39, 13 October 2024
paramagnetic susceptibility is a macroscopic effect and has to be contrasted with Landau diamagnetic susceptibility which is equal to minus one third of Pauli's...
28 KB (4,336 words) - 02:21, 27 March 2024
to obtain the critical dimension within mean field theory is due to V. Ginzburg. Since the renormalization group sets up a relation between a phase transition...
10 KB (1,611 words) - 19:00, 17 September 2024