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Concept in probability theory
In probability theory, Dudley's theorem is a result relating the expected upper bound and regularity properties of a Gaussian process to its entropy and
Dudley's_theorem
theorem (logic) Diaconescu's theorem (mathematical logic) Easton's theorem (set theory) Erdős–Dushnik–Miller theorem (set theory) Erdős–Rado theorem (set
List_of_theorems
Branch of statistical computational learning theory
{\mathcal {F}},L_{1}(Q))<\infty .} The next condition is a version of Dudley's theorem. If F {\displaystyle {\mathcal {F}}} is a class of functions such that
Vapnik–Chervonenkis_theory
Statement in probability theory
probability theory, Donsker's theorem (also known as Donsker's invariance principle, or the functional central limit theorem), named after Monroe D. Donsker
Donsker's_theorem
the mathematician R. M. Dudley, who introduced the integral as part of his work on the uniform central limit theorem. The Dudley's entropy integral is defined
Dudley's_entropy_integral
Central limit theorem Central limit theorem (illustration) – redirects to Illustration of the central limit theorem Central limit theorem for directional
List_of_statistics_articles
Characterization by prime factors of sums of two squares
In number theory, the sum of two squares theorem relates the prime decomposition of any integer n > 1 to whether it can be written as a sum of two squares
Sum_of_two_squares_theorem
Theory of probability
theory of probability, the Glivenko–Cantelli theorem (sometimes referred to as the fundamental theorem of statistics), named after Valery Ivanovich Glivenko
Glivenko–Cantelli_theorem
Number divisible only by 1 and itself
ISBN 978-1-4704-2849-5. Dudley 1978, Theorem 3, p. 28. Shahriari 2017, pp. 27–28. Ribenboim 2004, Fermat's little theorem and primitive roots modulo
Prime_number
inequality Chernoff bound / (F:B) Doob's martingale inequality / (FU:R) Dudley's theorem / Gau Entropy power inequality Etemadi's inequality / (F:R) Gauss's
Catalog of articles in probability theory
Catalog_of_articles_in_probability_theory
Theorem in measure theory
In measure theory Prokhorov's theorem relates tightness of measures to relative compactness (and hence weak convergence) in the space of probability measures
Prokhorov's_theorem
Mathematical theorem
In mathematics, the structure theorem for Gaussian measures shows that the abstract Wiener space construction is essentially the only way to obtain a
Structure theorem for Gaussian measures
Structure_theorem_for_Gaussian_measures
American mathematician and professor (1938–2020)
doi:10.1007/bfb0100744. ISBN 978-3-540-65975-4. Dudley, R. M. (1999-07-28). Uniform Central Limit Theorems (1 ed.). Cambridge University Press. doi:10
Richard_M._Dudley
1992 book by Underwood Dudley
by Dudley, include calculations for the perimeter of an ellipse, roots of quintic equations, Fermat's little theorem, Gödel's incompleteness theorems, Goldbach's
Mathematical_Cranks
Stochastic process in probability theory
mean field theory, limit theorems (as the number of objects becomes large) are considered and generalise the central limit theorem for empirical measures
Empirical_process
Textbook by Patrick Billingsley
The second edition includes Skorokhod's representation theorem. Though criticized by Dudley for insufficient generality, a reviewer wrote "the subject
Convergence of Probability Measures
Convergence_of_Probability_Measures
4 Dudley (1989, Theorem 7.1.1) Dudley 1989, Example after Theorem 7.1.1 Dudley 1989, Theorem 7.1.5 Dudley 1989, Theorem 7.3.1 Dudley 1989, Theorem 12
Baire_set
Classes of functions
a Donsker class if it satisfies Donsker's theorem, a functional generalization of the central limit theorem. Let F {\displaystyle {\mathcal {F}}} be a
Donsker_classes
Problem of constructing equal-area shapes
proven to be impossible, as a consequence of the Lindemann–Weierstrass theorem, which proves that pi ( π {\displaystyle \pi } ) is a transcendental number
Squaring_the_circle
The Minlos–Sasonov theorem is a result from measure theory in topological vector spaces. It provides a sufficient condition for a cylindrical measure
Minlos–Sazonov_theorem
Formula whose values are the prime numbers
by Underwood Dudley (1983) have further discussion about the worthlessness of such formulas. A shorter formula based on Wilson's theorem was given by
Formula_for_primes
Method of mathematical integration
under the integral sign (via the monotone convergence theorem and dominated convergence theorem). While the Riemann integral considers the area under
Lebesgue_integral
Method of drawing geometric objects
be transferred even with a collapsing compass; see compass equivalence theorem. Note however that whilst a non-collapsing compass held against a straightedge
Straightedge and compass construction
Straightedge_and_compass_construction
measurable bijective function between two standard Borel spaces. By Souslin's theorem in standard Borel spaces (which says that a set that is both analytic and
Borel_isomorphism
American economist (1930–2014)
basis of figures for United States families in 1981, is the "rotten kid theorem". He applied the economics of an altruist to a family, wherein a person
Gary_Becker
Field of knowledge
and proof to study and establish their properties, often expressed as theorems, formulas, and equations. Mathematics is used to model and solve problems
Mathematics
American mathematician
Two-Dimensional Analysis Situs with Special Reference to the Jordan Curve Theorem, and was advised by John R. Kline. During his lifetime, he published three
Dudley_Weldon_Woodard
In mathematics, a non-algebraic number
by Karl Weierstrass to what is now known as the Lindemann–Weierstrass theorem. The transcendence of π implies that geometric constructions involving
Transcendental_number
Work of mathematical cranks
mathematical institutions with requests to check their proofs of Fermat's Last Theorem. Another common approach is to misapprehend standard mathematical methods
Pseudomathematics
Notions of probabilistic convergence, applied to estimation and asymptotic analysis
2 Dudley 2002, Chapter 9.2, page 287 Dudley 2002, p. 289 van der Vaart 1998, Theorem 2.7 Gut, Allan (2005). Probability: A graduate course. Theorem 3
Convergence of random variables
Convergence_of_random_variables
Generalization of mass, length, area and volume
the Theorem in Section 245E, p. 182. Fremlin 2016, Section 245M, p. 188. Berberian 1965, Theorem 39.1, p. 129. Fremlin 2016, part (b) of Theorem 243G
Measure_(mathematics)
Property of being an even or odd number
understanding the configuration space of these puzzles. The Feit–Thompson theorem states that a finite group is always solvable if its order is an odd number
Parity_(mathematics)
Curve where spinning and moving lines cross
of squaring the circle, hence its name as a quadratrix. Dinostratus's theorem, used by Dinostratus to square the circle, relates an endpoint of the curve
Quadratrix_of_Hippias
Class of mathematical sets
( B ) {\displaystyle f^{-1}(B)} is measurable in X {\displaystyle X} . Theorem. Let X {\displaystyle X} be a Polish space, that is, a topological space
Borel_set
American tennis player and mathematician (1916-2008)
doctoral students include Robert McCallum Blumenthal and Richard M. Dudley. Hunt's theorem states that for a large class of positive kernels V {\displaystyle
Gilbert_Hunt
Unexpectedly large transient ocean surface wave
ISSN 1561-8633. Fedele, Francesco; Brennan, Joseph; Ponce de León, Sonia; Dudley, John; Dias, Frédéric (2016-06-21). "Real world ocean rogue waves explained
Rogue_wave
Upper class Bostonians
in England to elevate and cement their social standing. The Winthrops, Dudleys, Saltonstalls, Winslows, and Lymans (descended from English magistrates
Boston_Brahmin
Random measure in probability theory
Kolmogorov–Smirnov theorems". Annals of Mathematical Statistics. 23 (2): 277–281. doi:10.1214/aoms/1177729445. Dudley, R. M. (1978). "Central limit theorems for empirical
Empirical_measure
1902 crime detective novel by Arthur Conan Doyle
The Dynamics of an Asteroid Reichenbach Falls A Treatise on the Binomial Theorem Studies Sherlockian game Holmesian studies The New Annotated Sherlock Holmes
The_Hound_of_the_Baskervilles
and the Mackey theorem. Restriction to a normal subgroup behaves particularly well and is often called Clifford theory after the theorem of A. H. Clifford
Restricted_representation
Construction of an angle equal to one third a given angle
Constructible number Constructible polygon Morley's trisector theorem Trisectrix Dudley, Underwood (1994), The trisectors, Mathematical Association of
Angle_trisection
Works in Oxford University Press series
Hannah Arendt Dana Villa 26 January 2023 Philosophy/Biography 718 Gödel's Theorem A. W. Moore 24 November 2022 Mathematics 719 Microbiomes Angela E. Douglas
List of Very Short Introductions books
List_of_Very_Short_Introductions_books
Concept in scattering theory
Feshbach–Fano partitioning Resonances in scattering from potentials Levinson's theorem Relativistic Breit–Wigner distribution Zhou, Bei; Beacom, John F. (2020-02-18)
Resonance_(particle_physics)
Teaching, learning, and scholarly research in mathematics
the Pythagorean theorem was well known to the mathematicians of the Old Babylonian period." Høyrup, Jens. "Pythagorean 'Rule' and 'Theorem' – Mirror of the
Mathematics_education
Overuse of a shared resource
OCLC 237794267. Retrieved 2016-03-13. Hoskins, W.G.; Stamp, L. Dudley (1963). Hoskins, W.G.; Stamp, L. Dudley (eds.). The Common Lands of England and Wales. London:
Tragedy_of_the_commons
East Asian ethnic group
numbers or a prime number and a semiprime, a concept now known as Chen's theorem. The 1978 Wolf Prize in Physics inaugural recipient and physicist Chien-Shiung
Han_Chinese
Mathematical measure for topological spaces
Lebesgue measure on the real line is a regular measure: see the regularity theorem for Lebesgue measure. Any Baire probability measure on any locally compact
Regular_measure
American mathematician
Stanley Ogilvy. Fermat's Last Theorem Odd greedy expansion Armacost, David; Denton, James; Romer, Robert; Towne, Dudley, "Robert Breusch", Memorial Minutes
Robert_Breusch
Test of normality in frequentist statistics
doi:10.1093/biomet/52.3-4.591. JSTOR 2333709. MR 0205384. p. 593 Richard M. Dudley (2015). "The Shapiro-Wilk and related tests for normality" (PDF). Archived
Shapiro–Wilk_test
Catalan mathematician and statistician (1944-2015)
until his death. Araujo, Aloisio; Giné, Evarist (1980). The central limit theorem for real and Banach valued random variables. Wiley series in probability
Evarist_Giné
(July 22, 2019). "Goursat, Pringsheim, Walsh, and the Cauchy Integral Theorem". The Mathematical Intelligencer. 22 (4): 60–66. doi:10.1007/bf03026773
Connections of Jeffrey Epstein
Connections_of_Jeffrey_Epstein
Philosophical problem-solving principle
Retrieved 2 September 2015. Adam, S., and Pardalos, P. (2019), No-free lunch Theorem: A review, in "Approximation and Optimization", Springer, 57–82 Wolpert
Occam's_razor
Algebraic structure in linear algebra
of this, many statements such as the first isomorphism theorem (also called rank–nullity theorem in matrix-related terms) V / ker ( f ) ≡ im ( f )
Vector_space
Numerological practice of reading a word or phrase as a number
English magician John Dee, who makes reference to the Agrippa code in Theorem XVI of his 1564 book, Monas Hieroglyphica. Although Aleister Crowley, as
Gematria
Scottish-born mathematician and science fiction writer
Constance Reid finds it has fewer weaknesses. His book on Fermat's Last Theorem, The Last Problem, was published the year after his death and is a hybrid
Eric_Temple_Bell
Atomic model introduced by Niels Bohr in 1913
of the electron. This is also true for noncircular orbits by the virial theorem. A quantum rule The angular momentum L = mevr is an integer multiple of
Bohr_model
Topics referred to by the same term
tradition, an archaeological culture from the North American Arctic Norton's theorem in electronics Norton's Star Atlas, a set of 16 celestial charts Norton
Norton
14th–16th-century Asian cultural movement
Science in Theistic Contexts: Cognitive Dimensions, pp. 49–64, 66–71. Edith Dudley Sylla (2003), "Creation and nature", in Arthur Stephen McGrade (ed.), The
Timurid_Renaissance
Statistical model
necessary. A necessary and sufficient condition, sometimes called Dudley–Fernique theorem, involves the function σ {\displaystyle \sigma } defined by σ (
Gaussian_process
Gottfried Leibniz) of differential calculus. He also created the binomial theorem, worked extensively on optics, and created a law of cooling. Figures from
Culture_of_the_United_Kingdom
Mathematical formalization of card shuffling
1023/A:1021636902356, MR 1729462, S2CID 123898250. This follows immediately from Theorem 1 of Bayer & Diaconis (1992) together with the observation that the identity
Gilbert–Shannon–Reeds_model
American tennis player and mathematician
Ph.D. in 1975. Her dissertation, supervised by Richard M. Dudley, was Central Limit Theorems for D[0,1]-Valued Random Variables. After postdoctoral study
Marjorie_Hahn
Scheme for controlling errors in data over noisy communication channels
the received effective signal-to-noise ratio. The noisy-channel coding theorem of Claude Shannon can be used to compute the maximum achievable communication
Error_correction_code
Association football club in Wolverhampton, England
to demonstrate an understanding of Blaise Pascal's Hexagrammum Mysticum Theorem, and entered it in an art competition advertised in the Express and Star
Wolverhampton_Wanderers_F.C.
Kind of mathematical function
However, a measurable function is nearly a continuous function; see Luzin's theorem. If a Borel function happens to be a section of a map Y → π X , {\displaystyle
Measurable_function
sacrifice in celebration of discovering Thales' theorem just as Pythagoras had the Pythagorean theorem. Thales is the first known individual to use deductive
History_of_logic
(1702–1761) - British mathematician and Presbyterian minister, known for Bayes' theorem Gerard Ben-Arous (born 1957) Itai Benjamini Jakob Bernoulli (1654–1705)
List of mathematical probabilists
List_of_mathematical_probabilists
American political economist (1839–1897)
equal amount. This result has been dubbed by economists the Henry George theorem, as it characterizes a situation where Henry George's "single tax" is not
Henry_George
English theoretical physicist (1942–2018)
included a collaboration with Roger Penrose on gravitational singularity theorems in the framework of general relativity, and the theoretical prediction
Stephen_Hawking
Area of geometry, about angles and lengths
properties of chords and inscribed angles in circles, and they proved theorems that are equivalent to modern trigonometric formulae, although they presented
Trigonometry
Electrical transmission without physical connection
1884 John Henry Poynting defined the Poynting vector and gave Poynting's theorem, which describe the flow of power across an area within electromagnetic
Wireless_power_transfer
Quantum field theory of electromagnetism
conserved U ( 1 ) {\displaystyle {\text{U}}(1)} current arising from Noether's theorem. It is written j μ = ψ ¯ γ μ ψ . {\displaystyle j^{\mu }={\bar {\psi }}\gamma
Quantum_electrodynamics
Curve which could be used to trisect an angle with compass and straightedge
and straightedge constructions, so they do not contradict the well known theorem which states that an arbitrary angle cannot be trisected with that type
Trisectrix
Probability metric in mathematics
theorem Tightness of measures Weak convergence of measures Wasserstein metric Radon distance Total variation distance of probability measures Dudley 1989
Lévy–Prokhorov_metric
Undergraduate math course at Harvard University
algebra, tensors, differential forms, manifolds, and the generalized Stokes theorem. Although both were demanding courses that presented calculus from a rigorous
Math_55
Statistical relationship
multivariate normal distribution. This is an implication of the No free lunch theorem. To detect all kinds of relationships, these measures have to sacrifice
Correlation
Area of physical and philosophical debate
Journal of Physics. 69: 413–421. Bub, J.; Clifton, R. (1996). "A uniqueness theorem for interpretations of quantum mechanics". Studies in History and Philosophy
Interpretations of quantum mechanics
Interpretations_of_quantum_mechanics
Genevan philosopher, writer, and composer (1712–1778)
feeling and knowledge that this Life of ours is true: not a Scepticism, Theorem, or Persiflage, but a Fact, an awful Reality. Nature had made that revelation
Jean-Jacques_Rousseau
Mathematical function generalizing the determinant and permanent
immanant of a Gram matrix to be 0 {\displaystyle 0} are given by Gamas's Theorem. The immanant generalizes both the determinant and the permanent, and this
Immanant
Private day school in Wolverhampton, West Midlands, England
professor of pure mathematics at the University of Leeds; author of Goldie's theorem Robert Jenrick (born 1982), Reform UK Member of Parliament for Newark since
Wolverhampton_Grammar_School
Specific phase in a political system
Lecture Series. University of Oklahoma Press. ISBN 978-0-8061-8604-7. Kirk, Dudley (1996). "Demographic Transition Theory". Population Studies. 50 (3). Informa
Democratic_transition
Prize from University of Cambridge in mathematics and theoretical physics
examination question on a particular theorem that William Thomson had written to him about, which is now known as Stokes' theorem. T. W. Körner notes Only a small
Smith's_Prize
Female given name
Home All pages with titles beginning with Anne Ann Arbor, Michigan Anne's theorem, result from Euclidean geometry, due to Pierre-Leon Anne (1806–1850) Lady
Anne
concept of a zombie), Margery Allingham's crime novel The Crime at Black Dudley, Ludwig Wittgenstein's essay Some Remarks on Logical Form, the first part
2025_in_public_domain
Choosing a candidate other than preferred to undercut a less desired one
to maximize one's satisfaction with the election's results. Gibbard's theorem shows that no voting system has a single "always-best" strategy, i.e. one
Strategic_voting
American scholar. Haïm Brezis, 80, French mathematician (Bony–Brezis theorem, Brezis–Gallouët inequality, Brezis–Lieb lemma). Claude Ferragne, 71, Canadian
Deaths_in_July_2024
Tool for trisecting angles
used to trisect an angle, it does not contradict Pierre Wantzel's 1837 theorem that arbitrary angles cannot be trisected by compass and unmarked straightedge
Tomahawk_(geometry)
Horton Cameron (1908–1989) – mathematician known for the Cameron–Martin theorem Sean Cameron (born 1985) – soccer player who represented Guyana Duncan
List_of_people_from_Brooklyn
Mathematics for a general audience
Harper Collins. ISBN 0-06-093558-8. Simon Singh (2002). Fermat's Last Theorem. Fourth Estate. ISBN 1-84115-791-0. Rucker, Rudy (1984), The Fourth Dimension:
Popular_mathematics
German-Chilean mathematician
to become an emeritus professor in 1970. Frucht is known for Frucht's theorem, the result that every group can be realized as the group of symmetries
Robert_Frucht
Peter Lax, 99, Hungarian-born American mathematician (Lax equivalence theorem, Lax–Friedrichs method), Abel Prize laureate (2005), cardiac amyloidosis
Deaths_in_May_2025
1702–11, theologian Andrew Wiles, mathematician who proved Fermat's Last Theorem Lauren Winner, professor of theology at Duke University Simon Wren-Lewis
List of alumni of Clare College, Cambridge
List_of_alumni_of_Clare_College,_Cambridge
subsequently known as Ribet's theorem confirming Gerhard Frey's suggestion that the Taniyama–Shimura conjecture implies Fermat's Last Theorem. Lawrence Paulson makes
1986_in_science
Groups who share a common perspective
space and time. The school rejected the universal validity of economic theorems. They saw economics as arising from careful empirical and historical analysis
Schools_of_economic_thought
Community school in Penistone, South Yorkshire, England
alumni including Nicholas Saunderson, the probable inventor of Bayes' theorem, in the 18th century. At various times in its history it has been single-sex
Penistone_Grammar_School
Falsifiable explanation of natural phenomena
axioms: predicted observations are derived from the theories much like theorems are derived in Euclidean geometry. However, the predictions are then tested
Scientific_theory
glassmaking Walther Nernst (1864–1941), German physical chemist whose heat theorem led the way to the third law of thermodynamics, 1920 Nobel Prize in Chemistry
List_of_chemists
Non-mathematical introduction
EHRENFEST'S THEOREM" (PDF). Archived (PDF) from the original on 10 July 2021. Retrieved 5 August 2022. Friedrich, Bretislav; Herschbach, Dudley (December
Introduction to quantum mechanics
Introduction_to_quantum_mechanics
Study of research methods
this new formula until it has traced back all the way to already proven theorems. The difference between the two methods concerns primarily how mathematicians
Methodology
Electrical conductivity with exactly zero resistance
first practical application of superconductivity was developed in 1954 with Dudley Allen Buck's invention of the cryotron. Two superconductors with greatly
Superconductivity
DUDLEYS THEOREM
DUDLEYS THEOREM
Boy/Male
English
Gathering field; meeting field.
Surname or Lastname
English
English : apparently a habitational name from a lost or unidentified place, possibly in southeastern England, where the modern surname is most frequent.
Male
English
Short form of English Dudley, DUD means "Dudda's meadow."
Boy/Male
English American
From the people's meadow. From a surname and place name derived from the Old English, meaning...
Boy/Male
English Anglo Saxon
Old friend.
Surname or Lastname
English
English : topographic name for someone living by a Roman road or other great highway, from Old English brÄd ‘broad’ + strÇ£t ‘paved highway’, ‘Roman road’ (see Street), or habitational name from some minor place named with these elements.The poet Anne Bradstreet (1612–72) was born Anne Dudley, probably in Northampton, England. She and her husband Simon Bradstreet came to MA with Winthrop in 1630. Simon (1603–97) came from an old Suffolk family. He served in various public offices and was governor of MA from 1679 to 1686 and again in 1686–92.
Surname or Lastname
English (of Norman origin)
English (of Norman origin) : variant of Duley.
Boy/Male
British, Christian, English
From the People's Meadow; From a Surname and Place Name Derived from the Old English; Diminutive of Dudley
Surname or Lastname
English
English : (of Norman origin): habitational name from any of several places in Calvados, France, called Ouilly, named with the Gallo-Roman personal name Ollius + the locative suffix -acum.English : Possibly also an altered spelling of Dooley.
Boy/Male
American, Anglo, British, Christian, English
Prosperous Guardian; Old Friend; From the Old Meadow
Boy/Male
American, Australian, British, Christian, English, French, Irish
From the People's Field; People; S Field; Wood; Clearing of Dudda; Meadow
Surname or Lastname
English and Irish
English and Irish : habitational name from Dudley in the West Midlands, named from the Old English personal name Dudda (see Dodd) + Old English lēah ‘woodland clearing’.Irish (County Cork) : English name adopted by bearers of Gaelic Ó Dubhdáleithe ‘descendant of Dubhdáleithe’, a personal name composed of the elements dubh ‘black’ + dá ‘two’ + léithe ‘sides’.Thomas Dudley (1576–1653), born at Northampton, England, sailed on the Arbella to Salem, MA, in 1630 with the chief men of the Massachusetts Bay Company. They first settled at Newtown. Dudley subsequently moved to Ipswich but then permanently settled at Roxbury. He was elected four times as governor of the Massachusetts Bay Colony and as one of the two commissioners for the colony when the New England Confederation was formed in 1643. He was one of the first overseers of Harvard University, and in 1650, as governor, signed the charter for that institution. Dudley’s seventh and most noted child, Joseph (1647–1720) was also governor of MA (1702–15).
Surname or Lastname
English
English : habitational name from Audley in Staffordshire, named from the Old English female personal name Aldḡth + Old English lēah ‘woodland clearing’.
Surname or Lastname
English (East Anglia)
English (East Anglia) : variant of Duley, without the preposition d’.
Surname or Lastname
Irish (of English origin)
Irish (of English origin) : habitational name from Dovedale in Derbyshire, ‘valley (Middle English dale) of the river Dove’ (see Dove 1).Irish : English surname adopted by bearers of Gaelic Ó Dubhdáleithe (see Dudley 2).English : habitational name from a lost place Ovedale or Uvedale, which gave rise to the 14th-century surname de Uvedale alias de Ovedale, connected with the manor of D’Oversdale in Litlington, Cambridgeshire; this is first recorded as ‘manor of Overdale otherwise Dowdale’ in 1408.
Surname or Lastname
English
English : in examples such as William de la Winche (Worcestershire 1275) evidently a topographic name, perhaps for someone who lived at a spot where boats were hauled up onto the land by means of pulleys, from Middle English winche ‘reel’, ‘roller’. However, Old English wince as an element of place names may also have meant ‘corner’ or ‘nook’, and in some cases the surname may be derived from this sense.English : in examples such as William le Wynch (Sussex 1327) it appears to be a nickname, perhaps from the lapwing, Old English (hlēap)wince.
Surname or Lastname
Irish
Irish : reduced Anglicized form of Gaelic Ó Dubhurthuille ‘descendant of Dubhurthuille’, a personal name of unexplained origin.English : habitational name from Durley in Hampshire or Durleigh in Somerset, both named from Old English dēor ‘deer’ + lēah ‘woodland clearing’, or from Durley in Wiltshire, so named from Old English dierne ‘hidden’ + lēah.
Boy/Male
Christian & English(British/American/Australian)
Residence Name
Boy/Male
American, British, Celtic, English
From the Hill Meadow; Meadow with the Hill
Boy/Male
Celtic English
From the hill meadow.
DUDLEYS THEOREM
DUDLEYS THEOREM
Girl/Female
Indian
A queen of Saba in the days
Boy/Male
Tamil
Kalidas | காலிதாஸ
Great poet, Dramatist, Slave of Goddess Kali
Female
Irish
Variant spelling of Irish Gaelic RÃoghnach, RÃONACH means "queen."
Boy/Male
Tamil
Kind of seasons
Boy/Male
Russian
gift from God'.
Girl/Female
Latin American
The moon. In Mythology Luna is one of the names of Artemis the moon goddess.
Boy/Male
Muslim
Victorious, Sikander is also the Persian and hindustani version of the name alexander, After alexander the great
Boy/Male
Indian
Gift of Guru
Boy/Male
Bengali, Hindu, Indian, Telugu
A Forest; Foreign Land; Desert
Girl/Female
Tamil
Triumphant, Flute
DUDLEYS THEOREM
DUDLEYS THEOREM
DUDLEYS THEOREM
DUDLEYS THEOREM
DUDLEYS THEOREM
n.
A cylinder on a revolving shaft, generally for the purpose of driving several pulleys, by means of belts or straps passing around its periphery; also, the barrel of a hoisting machine, on which the rope or chain is wound.
n.
Ropes passing through pulleys, and used to haul in or up the leeches, bottoms, or corners of sails, preparatory to furling.
n.
A machine consisting of many pulleys; specifically, an apparatus formerly used for reducing luxations.
n.
A purchase with five pulleys.
n.
A machine for raising or moving heavy weights, consisting of a tripod formed of poles united at the top, with a windlass, pulleys, ropes, etc.
n.
One who constructs theorems.
pl.
of Medley
n.
A numerical coefficient in any particular case of the binomial theorem.
n.
A machine in which four pulleys act together.
n.
A compact group of pulleys, gears, springs, etc., working together or collectively.
a.
Theorematic.
n.
A peculiar tackle, formed of two or more blocks, or pulleys, the weight being suspended to a hook block in the bight of the running part.
a.
Of or pertaining to a theorem or theorems; comprised in a theorem; consisting of theorems.
a.
Alt. of Theorematical
n.
A peculiar combination of pulleys.
v. t.
To formulate into a theorem.
n.
A machine with three pulleys which act together for raising great weights.
a.
Relating to a system for transmitting power to a distance by means of swiftly moving ropes or cables driving grooved pulleys of large diameter.
n.
A statement of a principle to be demonstrated.
pl.
of Pulley