-
1 неравенство Гронуолла
Mathematics: Gronwall's inequality, Gronwall's lemmaУниверсальный русско-английский словарь > неравенство Гронуолла
См. также в других словарях:
Grönwall's inequality — In mathematics, Grönwall s lemma allows one to bound a function that is known to satisfy a certain differential or integral inequality by the solution of the corresponding differential or integral equation. There are two forms of the lemma, a… … Wikipedia
Thomas Hakon Grönwall — (January 16, 1877, Dylta bruk, Sweden May 9, 1932, New York, USA) was a . He studied at the University College of Stockholm and Uppsala University and completed his Ph.D. at Uppsala in 1898. Grönwall worked for about a year as a civil engineer in … Wikipedia
Lemme de Grönwall — En mathématiques, le lemme de Grönwall, nommé d après Thomas Hakon Grönwall (en) qui l établit en 1919, permet l estimation d une fonction qui vérifie une certaine inégalité différentielle. Le lemme existe sous deux formes, intégrale et… … Wikipédia en Français
List of inequalities — This page lists Wikipedia articles about named mathematical inequalities. Inequalities in pure mathematics =Analysis= * Askey–Gasper inequality * Bernoulli s inequality * Bernstein s inequality (mathematical analysis) * Bessel s inequality *… … Wikipedia
List of mathematics articles (G) — NOTOC G G₂ G delta space G networks Gδ set G structure G test G127 G2 manifold G2 structure Gabor atom Gabor filter Gabor transform Gabor Wigner transform Gabow s algorithm Gabriel graph Gabriel s Horn Gain graph Gain group Galerkin method… … Wikipedia
List of lemmas — This following is a list of lemmas (or, lemmata , i.e. minor theorems, or sometimes intermediate technical results factored out of proofs). See also list of axioms, list of theorems and list of conjectures. 0 to 9 *0/1 Sorting Lemma ( comparison… … Wikipedia
Divisor function — σ0(n) up to n = 250 Sigma function σ … Wikipedia
Colossally abundant number — In mathematics, a colossally abundant number (sometimes abbreviated as CA) is a natural number that, in some rigorous sense, has a lot of divisors. Formally, a number n is colossally abundant if and only if there is an ε > 0 such… … Wikipedia
Riemann hypothesis — The real part (red) and imaginary part (blue) of the Riemann zeta function along the critical line Re(s) = 1/2. The first non trivial zeros can be seen at Im(s) = ±14.135, ±21.022 and ±25.011 … Wikipedia
