cantorn.¹

Brit.

/ˈkantɔː/,

/ˈkantə/, U.S.

/ˈkæn(t)ər/,

/ˈkæn(t)ɔr/

Forms: Also 1600s canter.

Etymology: < Latin cantor singer, agent-noun < canĕre to sing.

†1. A singer. Obsolete.

ΘΚΠ

society > leisure > the arts > music > musician > singer > [noun]

songsterOE

singerc1330

chantera1387

singster1388

voicea1513

modulatora1527

chorister1589

songman1603

cantor1609

warbler1611

melodist1789

vocalist1790

cantator1866

vocaller1876

1609 J. Dowland tr. A. Ornithoparchus Micrologus 4 A Cantor, who doth..sing those things, which the Musitian..doth set downe.

1631 R. Brathwait Whimzies ii. 10 Stanza's, which halt and hobble as lamely as that one legg'd Cantor that sings them.

1656 T. Blount Glossographia Cantor, a singer.

2. He whose duty it is to lead the singing in a church; a precentor.

ΘΚΠ

society > faith > church government > member of the clergy > other clergy > [noun] > precentor

arch-chantera1387

chanterc1390

chanterer1482

ruler1485

precentor1516

cantora1552

taker-up1578

uptaker1620

praise leader1920

society > leisure > the arts > music > musician > singer > singer of church music > [noun] > cantor or precentor

arch-chantera1387

chanterc1390

chanterer1482

ruler1485

precentor1516

cantora1552

taker-up1578

uptaker1620

precentorial1825

praise leader1920

a1552 J. Leland Itinerary (1711) V. 22 The Cantor of S. Davids.

a1661 T. Fuller Worthies (1662) Wilts. 155 Being Canter of that Church.

1789 C. Burney Gen. Hist. Music III. 255 The Cantor or Chanter, who directs the singing in Lutheran churches.

1867 M. E. Herbert Cradle Lands vii. 176 The pillars where the Cantors stand during service.

1887 J. Baden Powell in Ch. Union Gaz. XVII. 145 A prose consists of a chorus, with intervening verses sung by cantors.

3. = chazzan n.

ΘΚΠ

society > faith > church government > member of the clergy > other clergy > [noun] > precentor > Jewish

chazzan1650

cantor1893

society > leisure > the arts > music > musician > singer > singer of church music > [noun] > cantor or precentor > Jewish

shaliach tzibur1609

chazzan1650

shaliach1865

cantor1893

1893 I. Zangwill Ghetto Trag. 3 The quaint monotonous sing-song of the Cantor reading the Law.

1945 A. Kober Parm Me 120 Cards which she had received from the rabbis and cantors she had interviewed.

1958 Times 23 Sept. 2/7 A wandering synagogue-cantor.

Derivatives

ˈcantorship n.

ΘΚΠ

society > faith > church government > member of the clergy > other clergy > [noun] > precentor > office of

chantership1529

precentorship1692

cantorship1884

society > leisure > the arts > music > musician > singer > singer of church music > [noun] > cantor or precentor > office of

chantership1529

precentorship1692

cantorship1884

1884 Edinb. Rev. July 227 [Bach's] appointment to the Cantorship at Leipzig.

This entry has not yet been fully updated (first published 1888; most recently modified version published online December 2021).

Cantorn.²

Brit.

/ˈkantɔː/,

/ˈkantə/, U.S.

/ˈkæn(t)ər/,

/ˈkæn(t)ɔr/

Etymology: < the name of Georg Cantor (1845–1918), Russian-born German mathematician.

Mathematics.

Used in the possessive and attributively to designate various concepts relating to the theory of sets and infinite numbers arising out of Cantor's work, as Cantor set n. (also Cantor's set, Cantor's ternary set, Cantor ternary set) the set of points left by removing from a line of unit length all points whose distance from one end is greater than ¹/ ₃ and less than ²/ ₃, then removing similarly the middle third of the two segments so formed, and so on indefinitely.

ΘΚΠ

the world > relative properties > number > mathematics > [adjective] > characterized by theories of or approaches to

physico-mathematical1660

analytical1694

Bernoulli1749

analytic1761

Boolean1851

Sturmian1853

Bernoullian1876

Fermatian1887

Grassmannian1894

number-theoretic1899

Cantor1902

Cantorian1912

Tauberian1913

Thiessen1923

intuitionist1926

metamathematical1926

finitist1931

number-theoretical1936

finitistic1937

proof-theoretic1940

formalistic1941

Gödelian1942

constructivist1943

constructivistic1944

game-theoretical1946

game-theoretic1950

finitary1952

perturbation-theoretic1964

perturbation-theoretical1968

constructive1979

the world > relative properties > number > geometry > point > [noun] > sets or groups of points

umbilic point1586

involution1847

triad1850

range1859

point group1887

tetrad1889

tristigm1889

neighbourhood1891

trinode1891

trigraphy1895

Cantor set1902

web1909

limit cycle1918

Leech lattice1968

1902 Proc. London Math. Soc. 34 286 H. J. S. Smith's ternary derived set is to all intents and purposes the same as Cantor's ternary set of numbers.

1902 Proc. London Math. Soc. 34 286 The generalization of Cantor's set.

1902 Proc. London Math. Soc. 35 248 Cantor's Theorem. Every set of intervals on a straight line is countable, provided no two overlap.

1903 B. Russell Princ. Math. xlii. 347 The thesis of the present chapter is, that Cantor's continuum is free from contradictions.

1903 B. Russell Princ. Math. 527 There is a one-one relation of all ranges of propositions to some propositions, which is directly contradictory to Cantor's theorem.

1906 Proc. London Math. Soc. 4 272 We can prove..that every ordinal number is a Cantor's ordinal number.

1940 Amer. Math. Monthly 47 549 (heading) Distances between points of the Cantor set.

1953 A. A. Fraenkel Abstr. Set Theory ii. 94 The highly comprehensive answer, often called Cantor's theorem, runs:..To any set S there exist sets having larger cardinals than S; in particular, the set US, whose elements are all the subsets of S, is of a larger cardinal than S.

1960 P. R. Halmos Naive Set Theory xxv. 101 The contradiction, based on the assumption that there is such a set [of all cardinal numbers], is known as Cantor's paradox.

1975 I. Stewart Concepts Mod. Math. ix. 143 Prior to Cantor's theorem, mathematicians had become accustomed to thinking of transcendental numbers as being very rare, because they seldom seemed to use any.

1979 D. R. Hofstadter Gödel, Escher, Bach (1980) v. 142 When α is irrational, the bands shrink to points, of which there are infinitely many, very sparsely distributed in a so-called ‘Cantor set’—another recursively defined entity which springs up in topology.

1987 Nature 24 Dec. 695/1 The resulting function resembles a mathematical function called a Cantor function or, more picturesquely, a ‘devil's staircase’.

Derivatives

Canˈtorian adj. (also Canˈtorean) of or pertaining to Cantor or his work; having the attributes of a Cantor set.

ΘΚΠ

the world > relative properties > number > mathematics > [adjective] > characterized by theories of or approaches to

physico-mathematical1660

analytical1694

Bernoulli1749

analytic1761

Boolean1851

Sturmian1853

Bernoullian1876

Fermatian1887

Grassmannian1894

number-theoretic1899

Cantor1902

Cantorian1912

Tauberian1913

Thiessen1923

intuitionist1926

metamathematical1926

finitist1931

number-theoretical1936

finitistic1937

proof-theoretic1940

formalistic1941

Gödelian1942

constructivist1943

constructivistic1944

game-theoretical1946

game-theoretic1950

finitary1952

perturbation-theoretic1964

perturbation-theoretical1968

constructive1979

1912 A. N. Whitehead & B. Russell Principia Mathematica II. v. 614 A compact Dedekindian series is said to possess ‘Dedekindian continuity’; such series have many important properties. They are a wider class than series possessing Cantorian continuity.

1946 Mind 55 367 His theory made it impossible to prove the existence of the continuum and thus curtailed the Cantorean theory of sets.

1963 W. V. Quine Set Theory 294 Classes that are not Cantorian behave unconventionally.

1982 W. S. Hatcher Logical Found. Math. vii. 225 A set x is ‘Cantorian’ if it is similar to its set of unit subsets.

This entry has not yet been fully updated (first published 1993; most recently modified version published online December 2021).

单词	cantor
释义	cantorn.¹ Brit. /ˈkantɔː/, /ˈkantə/, U.S. /ˈkæn(t)ər/, /ˈkæn(t)ɔr/ Forms: Also 1600s canter. Etymology: < Latin cantor singer, agent-noun < canĕre to sing. †1. A singer. Obsolete. ΘΚΠ society > leisure > the arts > music > musician > singer > [noun] songsterOE singerc1330 chantera1387 singster1388 voicea1513 modulatora1527 chorister1589 songman1603 cantor1609 warbler1611 melodist1789 vocalist1790 cantator1866 vocaller1876 1609 J. Dowland tr. A. Ornithoparchus Micrologus 4 A Cantor, who doth..sing those things, which the Musitian..doth set downe. 1631 R. Brathwait Whimzies ii. 10 Stanza's, which halt and hobble as lamely as that one legg'd Cantor that sings them. 1656 T. Blount Glossographia Cantor, a singer. 2. He whose duty it is to lead the singing in a church; a precentor. ΘΚΠ society > faith > church government > member of the clergy > other clergy > [noun] > precentor arch-chantera1387 chanterc1390 chanterer1482 ruler1485 precentor1516 cantora1552 taker-up1578 uptaker1620 praise leader1920 society > leisure > the arts > music > musician > singer > singer of church music > [noun] > cantor or precentor arch-chantera1387 chanterc1390 chanterer1482 ruler1485 precentor1516 cantora1552 taker-up1578 uptaker1620 precentorial1825 praise leader1920 a1552 J. Leland Itinerary (1711) V. 22 The Cantor of S. Davids. a1661 T. Fuller Worthies (1662) Wilts. 155 Being Canter of that Church. 1789 C. Burney Gen. Hist. Music III. 255 The Cantor or Chanter, who directs the singing in Lutheran churches. 1867 M. E. Herbert Cradle Lands vii. 176 The pillars where the Cantors stand during service. 1887 J. Baden Powell in Ch. Union Gaz. XVII. 145 A prose consists of a chorus, with intervening verses sung by cantors. 3. = chazzan n. ΘΚΠ society > faith > church government > member of the clergy > other clergy > [noun] > precentor > Jewish chazzan1650 cantor1893 society > leisure > the arts > music > musician > singer > singer of church music > [noun] > cantor or precentor > Jewish shaliach tzibur1609 chazzan1650 shaliach1865 cantor1893 1893 I. Zangwill Ghetto Trag. 3 The quaint monotonous sing-song of the Cantor reading the Law. 1945 A. Kober Parm Me 120 Cards which she had received from the rabbis and cantors she had interviewed. 1958 Times 23 Sept. 2/7 A wandering synagogue-cantor. Derivatives ˈcantorship n. ΘΚΠ society > faith > church government > member of the clergy > other clergy > [noun] > precentor > office of chantership1529 precentorship1692 cantorship1884 society > leisure > the arts > music > musician > singer > singer of church music > [noun] > cantor or precentor > office of chantership1529 precentorship1692 cantorship1884 1884 Edinb. Rev. July 227 [Bach's] appointment to the Cantorship at Leipzig. This entry has not yet been fully updated (first published 1888; most recently modified version published online December 2021). Cantorn.² Brit. /ˈkantɔː/, /ˈkantə/, U.S. /ˈkæn(t)ər/, /ˈkæn(t)ɔr/ Etymology: < the name of Georg Cantor (1845–1918), Russian-born German mathematician. Mathematics. Used in the possessive and attributively to designate various concepts relating to the theory of sets and infinite numbers arising out of Cantor's work, as Cantor set n. (also Cantor's set, Cantor's ternary set, Cantor ternary set) the set of points left by removing from a line of unit length all points whose distance from one end is greater than ¹/ ₃ and less than ²/ ₃, then removing similarly the middle third of the two segments so formed, and so on indefinitely. ΘΚΠ the world > relative properties > number > mathematics > [adjective] > characterized by theories of or approaches to physico-mathematical1660 analytical1694 Bernoulli1749 analytic1761 Boolean1851 Sturmian1853 Bernoullian1876 Fermatian1887 Grassmannian1894 number-theoretic1899 Cantor1902 Cantorian1912 Tauberian1913 Thiessen1923 intuitionist1926 metamathematical1926 finitist1931 number-theoretical1936 finitistic1937 proof-theoretic1940 formalistic1941 Gödelian1942 constructivist1943 constructivistic1944 game-theoretical1946 game-theoretic1950 finitary1952 perturbation-theoretic1964 perturbation-theoretical1968 constructive1979 the world > relative properties > number > geometry > point > [noun] > sets or groups of points umbilic point1586 involution1847 triad1850 range1859 point group1887 tetrad1889 tristigm1889 neighbourhood1891 trinode1891 trigraphy1895 Cantor set1902 web1909 limit cycle1918 Leech lattice1968 1902 Proc. London Math. Soc. 34 286 H. J. S. Smith's ternary derived set is to all intents and purposes the same as Cantor's ternary set of numbers. 1902 Proc. London Math. Soc. 34 286 The generalization of Cantor's set. 1902 Proc. London Math. Soc. 35 248 Cantor's Theorem. Every set of intervals on a straight line is countable, provided no two overlap. 1903 B. Russell Princ. Math. xlii. 347 The thesis of the present chapter is, that Cantor's continuum is free from contradictions. 1903 B. Russell Princ. Math. 527 There is a one-one relation of all ranges of propositions to some propositions, which is directly contradictory to Cantor's theorem. 1906 Proc. London Math. Soc. 4 272 We can prove..that every ordinal number is a Cantor's ordinal number. 1940 Amer. Math. Monthly 47 549 (heading) Distances between points of the Cantor set. 1953 A. A. Fraenkel Abstr. Set Theory ii. 94 The highly comprehensive answer, often called Cantor's theorem, runs:..To any set S there exist sets having larger cardinals than S; in particular, the set US, whose elements are all the subsets of S, is of a larger cardinal than S. 1960 P. R. Halmos Naive Set Theory xxv. 101 The contradiction, based on the assumption that there is such a set [of all cardinal numbers], is known as Cantor's paradox. 1975 I. Stewart Concepts Mod. Math. ix. 143 Prior to Cantor's theorem, mathematicians had become accustomed to thinking of transcendental numbers as being very rare, because they seldom seemed to use any. 1979 D. R. Hofstadter Gödel, Escher, Bach (1980) v. 142 When α is irrational, the bands shrink to points, of which there are infinitely many, very sparsely distributed in a so-called ‘Cantor set’—another recursively defined entity which springs up in topology. 1987 Nature 24 Dec. 695/1 The resulting function resembles a mathematical function called a Cantor function or, more picturesquely, a ‘devil's staircase’. Derivatives Canˈtorian adj. (also Canˈtorean) of or pertaining to Cantor or his work; having the attributes of a Cantor set. ΘΚΠ the world > relative properties > number > mathematics > [adjective] > characterized by theories of or approaches to physico-mathematical1660 analytical1694 Bernoulli1749 analytic1761 Boolean1851 Sturmian1853 Bernoullian1876 Fermatian1887 Grassmannian1894 number-theoretic1899 Cantor1902 Cantorian1912 Tauberian1913 Thiessen1923 intuitionist1926 metamathematical1926 finitist1931 number-theoretical1936 finitistic1937 proof-theoretic1940 formalistic1941 Gödelian1942 constructivist1943 constructivistic1944 game-theoretical1946 game-theoretic1950 finitary1952 perturbation-theoretic1964 perturbation-theoretical1968 constructive1979 1912 A. N. Whitehead & B. Russell Principia Mathematica II. v. 614 A compact Dedekindian series is said to possess ‘Dedekindian continuity’; such series have many important properties. They are a wider class than series possessing Cantorian continuity. 1946 Mind 55 367 His theory made it impossible to prove the existence of the continuum and thus curtailed the Cantorean theory of sets. 1963 W. V. Quine Set Theory 294 Classes that are not Cantorian behave unconventionally. 1982 W. S. Hatcher Logical Found. Math. vii. 225 A set x is ‘Cantorian’ if it is similar to its set of unit subsets. This entry has not yet been fully updated (first published 1993; most recently modified version published online December 2021). < n.¹a1552n.²1902
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cantorn.1

Derivatives

Cantorn.2

Derivatives

cantorn.¹

Cantorn.²