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WHAT A WIN! MAX KALIEV! | AUSTRALIA vs ISRAEL 2024 IIHF Men’s World Championship SERBIA Division IIA
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MIKE LEVIN! | AUSTRALIA vs ISRAEL | 2024 IIHF Men’s World Championship SERBIA Division IIA
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AUSTRALIA vs ISRAEL | 2024 IIHF Men's World Championship SERBIA Division IIA | Highlights Chapters 0:00 Intro 0:04 1st ...
AUSTRALIA vs ISRAEL | 2024 IIHF Men’s World Championship SERBIA Division IIA | Highlights
AUSTRALIA vs ISRAEL | 2024 IIHF Men's World Championship SERBIA Division IIA | Highlights Chapters 0:00 Intro 0:04 1st ...
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HIGHLIGHTS | Auckland Tuatara vs Franklin Bulls | Sal's NBL Round 5 | Sky Sport NZ
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2024 Playoffs Winnipeg Jets vs Colorado Avalanche Pre-game Intro's Whiteout
2024 Playoffs Winnipeg Jets vs Colorado Avalanche pre-game and intro's for game 2.
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Novikov self-consistency principle
The Novikov self-consistency principle, also known as the Novikov self-consistency conjecture and Larry Niven's law of conservation of history, is a principle developed by Russian physicist Igor Dmitriyevich Novikov in the mid-1980s. Novikov intended it to solve the problem of paradoxes in time travel, which is theoretically permitted in certain solutions of general relativity that contain what are known as closed timelike curves.
Sergei Novikov (mathematician)
Sergei Petrovich Novikov (Russian: Серге́й Петро́вич Но́виков) (born 20 March 1938) is a Soviet and Russian mathematician, noted for work in both algebraic topology and soliton theory. In 1970, he won the Fields Medal.
Novikov conjecture
This page concerns mathematician Sergei Novikov's topology conjecture. For astrophysicist Igor Novikov's conjecture regarding time travel, see Novikov self-consistency principle.The Novikov conjecture is one of the most important unsolved problems in topology.
Adams spectral sequence
In mathematics, the Adams spectral sequence is a spectral sequence introduced by J. Frank Adams . Like all spectral sequences, it is a computational tool; it relates homology theory to what is now called stable homotopy theory.
Novikov
Novikov, Novikoff or Novikova (feminine) is one of the most common Russian surnames. Derived from novik - a teenager on military service who comes from a noble, boyar or cossack family in Russia of 16th-18th centuries.
Novikov ring
In mathematics, given an additive subgroup Γ ⊂ R {\displaystyle \Gamma \subset \mathbb {R} } , the Novikov ring Nov {\displaystyle \operatorname {Nov} (\Gamma )} of Γ {\displaystyle \Gamma } is the subring of Z [ [ Γ ] ] {\displaystyle \mathbb {Z} [\![\Gamma ]\!]} consisting of formal sums ∑ n γ i t γ i {\displaystyle \sum n_{\gamma _{i}}t^{\gamma _{i}}} such that γ 1 > γ 2 > ⋯ {\displaystyle \gamma _{1}>\gamma _{2}>\cdots } and γ i → − ∞ {\displaystyle \gamma _{i}\to -\infty } . The notion was introduced by S. P. Novikov in the papers that initiated the generalization of Morse theory using a closed one-form instead of a function.
Novikov's condition
In probability theory, Novikov's condition is the sufficient condition for a stochastic process which takes the form of the Radon–Nikodym derivative in Girsanov's theorem to be a martingale. If satisfied together with other conditions, Girsanov's theorem may be applied to a Brownian motion stochastic process to change from the original measure to the new measure defined by the Radon–Nikodym derivative.
Novikov's compact leaf theorem
In mathematics, Novikov's compact leaf theorem, named after Sergei Novikov, states that A codimension-one foliation of a compact 3-manifold whose universal covering space is not contractible must have a compact leaf.
Novikov–Veselov equation
In mathematics, the Novikov–Veselov equation is a natural (2+1)-dimensional analogue of the Korteweg–de Vries (KdV) equation. Unlike another (2+1)-dimensional analogue of KdV, the Kadomtsev–Petviashvili equation, it is integrable via the inverse scattering transform for the 2-dimensional stationary Schrödinger equation.
Novikov–Shubin invariant
In mathematics, a Novikov–Shubin invariant. introduced by Sergei Novikov and Mikhail Shubin , is an invariant of a compact Riemannian manifold related to the spectrum of the Laplace operator acting on square-integrable differential forms on its universal cover.