「inequality」の共起表現(1語右で並び替え)

「inequality」の共起表現一覧(1語右で並び替え)

inequality

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The Hadwiger-Finsler inequality, a relation between the side lengths and are
a long history of economical and educational inequality accentuated by the gentrification and a nati
How does inequality affect cooperation in local communities, and
The inequality allows one to obtain bounds on a function us
The Gaussian isoperimetric inequality also follows from Ehrhard's inequality (cf.
Finally, this inequality also meant that the minority rights were not
Harnack's inequality also implies the regularity of the function
conomic Journal, and the Journal of Economic Inequality, among others.
t Movement in society were to be: no kind of inequality among people; no difference as rich and poor
Frank Parkin's Class Inequality and Political Order: Social Stratification i
wn into the world economy, credit, commerce, inequality and growth were interrelated.
Rage because of the inequality and injustice in the world, and a passion to
sses the fine points of the Hermite-Hadamard inequality and is published by Kluwer Academic Press.
involved in politics and enthralled with the inequality and poverty in Guatemala.
larly be heard in interviews railing against inequality and misogyny in the music industry.
, being a simple application of the triangle inequality and the convexity of
Inequality and Tax Policy.
nowned, synthesising a life's work, Economic Inequality and Income Distribution (Cambridge Universit
”Land Inequality and Political Violence.”
proof assumes knowledge of the rearrangement inequality and the arithmetic-geometric mean inequality
, focusing on research on issues of poverty, inequality and related issues.
poverty, inequality and the measurement of living standards
butions to the sociology of religion, social inequality, and ecological-evolutionary social theory (
lso known as the Chernoff bound, Hoeffding's inequality and Azuma's inequality.
reedom, and pursue the reduction of economic inequality and official corruption.
reiterates that inequality and diversity in the world are due to the fr
movements concerning temperance, protest on inequality, and other socialist causes, but gave specia
all differences in treatment will result in inequality and that identical treatment may result in i
ative because it takes advantage of economic inequality and the fact that much time is needed to ear
udience and the problem of class structures, inequality, and so on.
Douglas A. Hicks is author of books: Inequality and Christian Ethics (2000), Religion and th
By Doob's inequality, and since the exponential of Brownian motio
He was the author of Mekeo: Inequality and ambivalence in a village society; Tales
sting link between religion, socio-political inequality and ecological depredation).
K | D is a special divisor and the Clifford inequality applies, which gives
While poverty and inequality are important causes of child prostitution,
ment values which produce a true equation or inequality are called solutions of the equation or ineq
More generally, Penrose conjectured that an inequality as above should hold for spacelike submanifo
to refer to the quantity on each side of the inequality as an "average surprisal" measured in bits.
ia, in which she witnessed widespread social inequality, as a catalyst for founding the magazine.
said the general public should “tolerate the inequality as a way to achieve greater prosperity for a
The inequality at the heart of the uncertainty principle of
seen theorem, also known as the Berry-Esseen inequality, attempts to quantify the rate at which this
eight justices who struck down state senate inequality based their decision on the principle of "on
ux gave another proof of Bobkov's functional inequality based on the semigroup techniques which work
During this period his concern over social inequality became increasingly prominent.
cs for being promoters of poverty and social inequality, being against some of the basic tenants rec
processes involved in introducing functional inequality between two parental alleles of a gene.
The reason for this enormous inequality between households and families is due to th
as a result of the growing discontent at the inequality between the peasants and the contemporary di
He addressed the inequality between commercial legality and social accep
There was legal and social inequality between the sexes.
ight lead to discipline helped to reduce the inequality between employees and management as intended
he number of income earners, contributing to inequality between households based on the number of ea
There was also a significant inequality between the voting rights of men and women.
, this could possibly explain why the wealth inequality between whites and blacks is on the rise.
In mathematics, the Paley-Zygmund inequality bounds the probability that a positive rando
, would had occasioned an increase in social inequality, bringing a large number of importations (fi
a 1 in the second position due to the first inequality; but a 1 in the second position allows only
One can prove Carleman's inequality by starting with Hardy's inequality
We obtain Minkowski's inequality by multiplying both sides by
We may then deduce the original inequality by using the one-third trick.
his furthers the negative effects of housing inequality by restricting access to household wealth.
The constant involved in the Hausdorff-Young inequality can be made optimal by using careful estimat
This inequality can be thought of as analogous to Bonnesen's
The left-hand inequality can be roughly interpreted as saying that en
ity is that the relationships of equality or inequality can in principle be stated in comparisons be
Therefore the Noether inequality can also be expressed as
The inequality can be proved by considering the unitary dil
The log sum inequality can be used to prove several inequalities in
The right-hand side of the Paley-Zygmund inequality can be written as
it theorem, law of large numbers, Chernoff's inequality, Chebyshev's inequality or similar tools.
For a convex minimization problem with inequality constraints,
alone-formally, for two events A and B this inequality could be written as , and
rmulated his conjecture in 1966 based on the inequality described above.
In operator theory, von Neumann's inequality, due to John von Neumann, states that, for a
en recently applied more broadly than income inequality, e.g. to selection into and across lending c
Yet, other causes for income inequality, especially some of those behind its recent
general social theory and specific forms of inequality, especially gender.
second experiment in 1982 have used the CHSH inequality, estimating the terms using (3) and assuming
reasons for this persistent poverty: income inequality, ethnic conflict, and political instability.
ilded age", Bartels demonstrates that income inequality expanded under Republican presidential admin
Guy Robin showed in 1984 that the inequality fails for all larger numbers if and only if
For p > 2 the natural extrapolation of this inequality fails, and the fact that a function belongs
The inequality finds uses in the field of approximation the
In measure-theoretic terms, Boole's inequality follows from the fact that a measure (and ce
where the inequality follows from Jensen's inequality since , , a
The inequality follows from basic properties of the Fourier
The finite-dimensional case of this inequality for real vectors was proved by Cauchy in 182
This has ended many years of inequality for Discretionary Full Blue status Captains
In mathematics, historically Wirtinger's inequality for real functions was an inequality used in
Theorem (Modified Schwarz inequality for 2-positive maps) For a 2-positive map Φ
In mathematics, the Wirtinger inequality for 2-forms, named after Wilhelm Wirtinger,
using a more general version of the Clifford inequality for local complete intersections with a dual
t method is a simple application of Markov's inequality for integer-valued variables.
There is a similar inequality for the weighted arithmetic mean and weighte
There is a version of Harnack's inequality for linear parabolic PDEs such as heat equat
e painfully suffered long enough from social inequality, from religious rhetoric and political leade
heorem for the first equality, then the last inequality from above, and finally the definition of th
s due to Bobkov, who introduced a functional inequality generalizing the Gaussian isoperimetric ineq
the issues addressed are justice, power and inequality, geopolitics, social and individual identity
ions include: (co-editor with Ngaire Woods), Inequality, Globalization and World Politics (Oxford Un
nd caste hierarchy coupled with gross gender inequality has kept large sections of our population tr
and official estimates indicate that income inequality has increased.
Some dramatic violations of the inequality have been reported.
Equivalents of the Kantorovich inequality have arisen in a number of different fields.
oken into fragments by casteism and economic inequality, he emphasised the gospel of 'one caste, one
When t is an even positive integer, the inequality holds for all real numbers x, y and z.
≤ r < ∞ and all 1 ≤ q ≤ p < ∞ the following inequality holds
n measures depending on whether the triangle inequality holds.
If it is zero, then Minkowski's inequality holds.
erty are almost the same as measuring income inequality: If a society gets a more equal income distr
e Privy Council for redress of any perceived inequality, if done within a year and a day.
judge competent for redress of any perceived inequality, if done within a year and a day.
hs) shows that a d-dimensional isoperimetric inequality implies a d-dimensional volume growth, namel
The Gagliardo-Nirenberg-Sobolev inequality implies directly the Sobolev embedding
It aims to tackle poverty and inequality in London and its root causes.
writes about race relations, government and inequality in America, as well as housing segregation.
The Origins of the Urban Crisis: Race and Inequality in Postwar Detroit (1996, Princeton Classic
cted to the way in which it addressed social inequality in the United States.
e countries with the lowest levels of income inequality in the world
Reverdy C. Ransom recognized the inequality in American society, blaming it on capitalis
gister to vote, and marked the end of racial inequality in Chicago politics.
rinciple is derived using the Cauchy-Schwarz inequality in the Hilbert space of quantum observables.
s, an alternative formulation expresses this inequality in terms of topological invariants of the un
For convex sets A and B, the inequality in the theorem is strict for 0 < t < 1 unles
The Dole effect describes an inequality in the ratio of the heavy isotope 18O (a 'st
ated a natural tendency toward participation inequality in electoral politics".
d short stories were a critique of the era's inequality in industrial cities and of its attitudes to
as there is poverty, and as long as there is inequality in education, health and gender, it will be
to challenge segregation, discrimination and inequality in public education during the 1960s, accord
vocacy organization dedicated to eliminating inequality in North Carolina.
ibed the show as one which "addresses social inequality in Britain today."
ocial reforms designed to combat poverty and inequality, including the abolition of public health ca
The Gini index is the most frequently used inequality index.
In mathematics, the Kallman-Rota inequality, introduced by , is a generalization of the
ument that led Penrose to conjecture such an inequality invoked the Hawking area theorem and the Cos
In mathematics, Ono's inequality is a theorem about triangles in the Euclidea
In probability theory, Kolmogorov's inequality is a so-called "maximal inequality" that giv
ity theory, the multidimensional Chebyshev's inequality is a generalization of Chebyshev's inequalit
mathematics, Vitale's random Brunn-Minkowski inequality is a theorem due to Richard Vitale that gene
tively, then Vitale's random Brunn-Minkowski inequality is simply the original Brunn-Minkowski inequ
Since the inequality is symmetric in x,y,z we may assume without
The Kantorovich inequality is used in convergence analysis; it bounds t
The Paley-Zygmund inequality is sometimes used instead of Cauchy-Schwarz
The inequality is strict (it holds with "<" instead of "≤")
Borel and Hirzebruch showed that the inequality is best possible by finding infinitely many
In mathematics, the Brascamp-Lieb inequality is a result in geometry concerning integrabl
is notation, Vitale's random Brunn-Minkowski inequality is that, for any random compact set X with E
In linear algebra, Weyl's inequality is a theorem about the changes to eigenvalue
The Kantorovich inequality is named after Soviet economist, mathematici
cs, especially functional analysis, Bessel's inequality is a statement about the coefficients of an
In mathematics, the Bishop-Gromov inequality is a classical theorem in Riemannian geometr
In mathematics, the Hadwiger-Finsler inequality is a result on the geometry of triangles in
Markov's inequality is used to prove Chebyshev's inequality.
Eilenberg's inequality is a mathematical inequality for Lipschitz-c
In mathematics, the Bogomolov-Miyaoka-Yau inequality is the inequality
In mathematics, the entropy power inequality is a result in probability theory that relat
In probability and statistics, a correlation inequality is one of a number of inequalities satisfied
Hardy's inequality is an inequality in mathematics, named after
Carleman's inequality is an inequality in mathematics, named after
robability theory, Talagrand's concentration inequality, is an isoperimetric-type inequality for pro
The Hadwiger-Finsler inequality is a special case of Pedoe's inequality.
In mathematics, the Kantorovich inequality is a particular case of the Cauchy-Schwarz i
The inequality is named after the German mathematician Karl
This inequality is a specific case of Matsaev's conjecture.
The inequality is named after the Russian mathematician And
The Burkholder-Davis-Gundy inequality is co-named after him.
ervative social scientists argue that income inequality is mainly the result of more workers in the
This right hand inequality is known as subadditivity.
In mathematics, the log sum inequality is an inequality which is useful for proving
In information theory, Pinsker's inequality is an inequality that relates Kullback-Leibl
In probability theory, Etemadi's inequality is a so-called "maximal inequality", an ineq
athematics, Milman's reverse Brunn-Minkowski inequality is a result due to Vitali Milman that provid
Brunn-Minkowski theorem (or Brunn-Minkowski inequality) is an inequality relating the volumes (or m
In mathematics, the Borell-Brascamp-Lieb inequality is an integral inequality due to many differ
The constant e in the inequality is optimal, that is, the inequality does not
form, as conjectured by T. Ono in 1914, the inequality is actually false; however, the statement is
In mathematics, the Babenko-Beckner inequality is a sharpened form of the Hausdorff-Young i
Bonnesen's inequality is an inequality relating the length, the ar
arity of expectations, the left side of this inequality is the same as
Now, note that the left side of this inequality is the same as
te taxation of national bank shares when the inequality is so palpable as to show that the discrimin
The Cauchy-Schwarz inequality is met with equality when the two vectors in
In mathematics, Friedrichs' inequality is a theorem of functional analysis, due to
This inequality is an equality if and only if X and Y are st
the first inequality is to be proven for positive q, and the latt
In mathematical analysis, Bernstein's inequality is named after Sergei Natanovich Bernstein.
In mathematics, Korn's inequality is a result about the derivatives of Sobolev
ed space satisfying the ultrametric triangle inequality is called non-Archimedean.

1 2 次へ＞