- maximal inequality
- мат.максимальное неравенство
English-Russian scientific dictionary. 2008.
maximal inequality
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Maximal function — Maximal functions appear in many forms in harmonic analysis (an area of mathematics). One of the most important of these is the Hardy–Littlewood maximal function. They play an important role in understanding, for example, the differentiability… … Wikipedia
Hardy-Littlewood maximal function — In mathematics, the Hardy Littlewood maximal operator M is a significant non linear operator used in real analysis and harmonic analysis. It takes a function f (a complex valued and locally integrable function) : f:mathbb{R}^{d} ightarrow… … Wikipedia
Kolmogorov's inequality — In probability theory, Kolmogorov s inequality is a so called maximal inequality that gives a bound on the probability that the partial sums of a finite collection of independent random variables exceed some specified bound. The inequality is… … Wikipedia
Etemadi's inequality — In probability theory, Etemadi s inequality is a so called maximal inequality , an inequality that gives a bound on the probability that the partial sums of a finite collection of independent random variables exceed some specified bound. The… … Wikipedia
Lubell-Yamamoto-Meshalkin inequality — In combinatorial mathematics, the Lubell Yamamoto Meshalkin inequality, more commonly known as the LYM inequality, is an inequality on the sizes of sets in a Sperner family, proved by harvtxt|Bollobás|1965, harvtxt|Lubell|1966,… … Wikipedia
Isoperimetric inequality — The isoperimetric inequality is a geometric inequality involving the square of the circumference of a closed curve in the plane and the area of a plane region it encloses, as well as its various generalizations. Isoperimetric literally means… … Wikipedia
Noether inequality — In mathematics, the Noether inequality, named after Max Noether, is a property of compact minimal complex surfaces that restricts the topological type of the underlying topological 4 manifold. It holds more generally for minimal projective… … Wikipedia
Rearrangement inequality — In mathematics, the rearrangement inequality states that:x ny 1 + cdots + x 1y nle x {sigma (1)}y 1 + cdots + x {sigma (n)}y nle x 1y 1 + cdots + x ny nfor every choice of real numbers:x 1lecdotsle x nquad ext{and}quad y 1lecdotsle y nand every… … Wikipedia
Hardy space — In complex analysis, the Hardy spaces (or Hardy classes) Hp are certain spaces of holomorphic functions on the unit disk or upper half plane. They were introduced by Frigyes Riesz (Riesz 1923), who named them after G. H. Hardy, because of the… … Wikipedia
Dyadic cubes — In mathematics, the dyadic cubes are a collection of cubes in ℝn of different sizes or scales such that the set of cubes of each scale partition ℝn and each cube in one scale may be written as a union of cubes of a smaller scale. These are… … Wikipedia
Vitali covering lemma — In mathematics, the Vitali covering lemma is a combinatorial and geometric result commonly used in measure theory of Euclidean spaces. tatement of the lemma* Finite version: Let B {1},...,B {n} be any collection of d dimensional balls contained… … Wikipedia
