英语词汇“fourier analysis”的英英意思、用法、释义、翻译、读音、例句、短语、词组-英语词典

Used attributively or in the possessive to designate certain principles enunciated by Fourier and many mathematical expressions and techniques arising out of his work, as Fourier analysis, the analysis of a periodic function into a number of simple harmonic functions or, more generally, into a series of functions from any orthonormal set; Fourier's law, that any non-sinusoidal periodic vibration can be regarded as the sum of a number of sinusoidal vibrations each having a frequency that is an integral multiple of some fundamental frequency; Fourier('s) series, a series of the form ½a₀ + (a₁ cos x + b₁ sin x) + (a₂ cos 2x + b₂ sin 2x) + …, where the constants a₀, a₁, b₁, etc. are defined in terms of a function f(x) to which the series may converge; Fourier's theorem, (a) that if a function f(x) satisfies certain conditions within the interval −π ≤ x ≤ π, it can be represented within that interval by a Fourier series; (b) (see quot. 1880); Fourier transform, a function f(x) related to a given function g(t) by the equation (2π)^½f(x) = ∞−∞g(t)e^±itxdt, used to represent a non-periodic function by a spectrum of sinusoidal functions. Also Fourier coefficient, Fourier expansion, Fourier integral, Fourier transformation, etc.

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the world > relative properties > number > mathematics > [noun] > mathematical enquiry > proposition > theorem > specific theorem > relating to series

Fourier's theorem1834

the world > relative properties > number > mathematical number or quantity > numerical arrangement > [noun] > set > sequence > series > convergent

convergency1791

convergence1858

Fourier('s) series1877

the world > relative properties > number > mathematics > [noun] > mathematical enquiry > proposition > theorem > specific theorem

pons asinorum1718

Fermat's theorem1845

Bernoulli's theorem1865

Fermat's last theorem1865

Fourier's theorem1880

remainder theorem1886

Stokes' theorem1893

Jordan('s) (curve) theorem1900

Waring's theorem1920

Gödel's theorem1933

maximin1953

incompleteness theorem1955

Schwarz inequality1955

the world > relative properties > number > algebra > [noun] > expression > function

function1758

exponential1784

potential function1828

syzygy1850

permutant1852

Green function1863

theta-function1871

Greenian1876

Gudermannian1876

discriminoid1877

Weierstrassian function1878

gradient1887

beta function1888

distribution function1889

Riemann zeta function1899

Airy integral1903

Poisson bracket1904

Stirling approximation1908

functional1915

metric1921

Fourier transform1923

recursive function1934

utility function1934

Airy function1939

transfer function1948

objective function1949

restriction1949

multifunction1954

restriction mapping1956

scalar function1956

Langevin function1960

mass function1961

the world > relative properties > number > algebra > [noun] > expression > method of calculation or analysis

extrapolation1872

functional analysis1876

inversion1880

Fourier analysis1929

formalism1940

linear programming1949

quadratic programming1951

simplex method1951

convex programming1963

deconvolution1967

1834 Rep. Brit. Assoc. 1833 343 If the interval of the roots be determined, by the application of Fourier's theorem of the succession of signs of the original function X and its derivatives.

1842 A. De Morgan Differential & Integral Calculus xx. 641 In applying Fourier's theorem..to discontinuous functions, we find that at the point where the discontinuity takes place, and a function which generally can have but one value might be expected to have two, it takes neither, and gives only the mean between them.

1877 Ld. Rayleigh Theory of Sound I. ii. 24 The pre~eminent importance of Fourier's series in Acoustics.

1880 G. S. Carr Synopsis Elem. Results Math. I. 134 Fourier's Theorem.—Fourier's functions are..f(x), f′(x), f″(x)…fⁿ(x)…As x increases, Fourier's functions lose one change of sign for each root of the equation f(x) = 0, through which x passes, and r changes of sign for r repeated roots.

1884 A. Daniell Text-bk. Princ. Physics v. 127 Longitudinal vibrations of a string or rod..whose ends are held fixed obey the same principles as transverse vibrations. Fourier's law holds good.

1902 E. T. Whittaker Course Mod. Anal. vii. 152 The question arises..whether the Fourier expansion is unique.

1911 Proc. Royal Soc. A. 85 14 We can also sum the series of the products of the Fourier coefficients of two such functions.

1912 London, Edinb., & Dublin Philos. Mag. 6th Ser. 24 866 Fourier's integral.

1923 Proc. Cambr. Philos. Soc. 21 463 The notion of Fourier transforms arises from Fourier's integral formula,..which gives..reciprocal relations..connecting the two functions f(x) and F(x).

1929 V. Bush Operational Circuit Anal. x. 186 Direct operational methods may be regarded as shorthand processes of evaluating and tabulating the results of Fourier analysis.

1936 Discovery Apr. 114/2 All sound-waves (except those from a flute, closed organ-pipe, etc.) are composed of many combined vibrations whose composition follows Fourier's law.

1957 R. S. Longhurst Geom. & Physical Optics xi. 226 The Fraunhofer pattern is the Fourier transform of the amplitude across the diffracting aperture and vice versa.

1963 R. W. Ditchburn Light (ed. 2) iv. 89 The ‘top-hat curve’ shown in fig. 4.6 can be represented by an appropriate Fourier series..for all values of x₀ because the curve to be represented is periodic.

1964 Oceanogr. & Marine Biol. 2 14 The correlation coefficient f_u(τ) is related by a Fourier transformation to the spectrum function F_u(n).

1965 S. I. Pearson & G. J. Maler Introd. Circuit Anal. ix. 439 The Fourier transform..is useful in analyzing pulses from a frequency standpoint.

1967 E. U. Condon & H. Odishaw Handbk. Physics (ed. 2) ii. iii. 26/2 The part of F(t) effective in exciting the oscillator is the component in its Fourier integral representation associated with the natural frequency of the oscillator.

单词	fourier analysis
释义	> as lemmas Fourier analysis Used attributively or in the possessive to designate certain principles enunciated by Fourier and many mathematical expressions and techniques arising out of his work, as Fourier analysis, the analysis of a periodic function into a number of simple harmonic functions or, more generally, into a series of functions from any orthonormal set; Fourier's law, that any non-sinusoidal periodic vibration can be regarded as the sum of a number of sinusoidal vibrations each having a frequency that is an integral multiple of some fundamental frequency; Fourier('s) series, a series of the form ½a₀ + (a₁ cos x + b₁ sin x) + (a₂ cos 2x + b₂ sin 2x) + …, where the constants a₀, a₁, b₁, etc. are defined in terms of a function f(x) to which the series may converge; Fourier's theorem, (a) that if a function f(x) satisfies certain conditions within the interval −π ≤ x ≤ π, it can be represented within that interval by a Fourier series; (b) (see quot. 1880); Fourier transform, a function f(x) related to a given function g(t) by the equation (2π)^½f(x) = ∞−∞g(t)e^±itxdt, used to represent a non-periodic function by a spectrum of sinusoidal functions. Also Fourier coefficient, Fourier expansion, Fourier integral, Fourier transformation, etc. ΘΚΠ the world > relative properties > number > mathematics > [noun] > mathematical enquiry > proposition > theorem > specific theorem > relating to series Fourier's theorem1834 the world > relative properties > number > mathematical number or quantity > numerical arrangement > [noun] > set > sequence > series > convergent convergency1791 convergence1858 Fourier('s) series1877 the world > relative properties > number > mathematics > [noun] > mathematical enquiry > proposition > theorem > specific theorem pons asinorum1718 Fermat's theorem1845 Bernoulli's theorem1865 Fermat's last theorem1865 Fourier's theorem1880 remainder theorem1886 Stokes' theorem1893 Jordan('s) (curve) theorem1900 Waring's theorem1920 Gödel's theorem1933 maximin1953 incompleteness theorem1955 Schwarz inequality1955 the world > relative properties > number > algebra > [noun] > expression > function function1758 exponential1784 potential function1828 syzygy1850 permutant1852 Green function1863 theta-function1871 Greenian1876 Gudermannian1876 discriminoid1877 Weierstrassian function1878 gradient1887 beta function1888 distribution function1889 Riemann zeta function1899 Airy integral1903 Poisson bracket1904 Stirling approximation1908 functional1915 metric1921 Fourier transform1923 recursive function1934 utility function1934 Airy function1939 transfer function1948 objective function1949 restriction1949 multifunction1954 restriction mapping1956 scalar function1956 Langevin function1960 mass function1961 the world > relative properties > number > algebra > [noun] > expression > method of calculation or analysis extrapolation1872 functional analysis1876 inversion1880 Fourier analysis1929 formalism1940 linear programming1949 quadratic programming1951 simplex method1951 convex programming1963 deconvolution1967 1834 Rep. Brit. Assoc. 1833 343 If the interval of the roots be determined, by the application of Fourier's theorem of the succession of signs of the original function X and its derivatives. 1842 A. De Morgan Differential & Integral Calculus xx. 641 In applying Fourier's theorem..to discontinuous functions, we find that at the point where the discontinuity takes place, and a function which generally can have but one value might be expected to have two, it takes neither, and gives only the mean between them. 1877 Ld. Rayleigh Theory of Sound I. ii. 24 The pre~eminent importance of Fourier's series in Acoustics. 1880 G. S. Carr Synopsis Elem. Results Math. I. 134 Fourier's Theorem.—Fourier's functions are..f(x), f′(x), f″(x)…fⁿ(x)…As x increases, Fourier's functions lose one change of sign for each root of the equation f(x) = 0, through which x passes, and r changes of sign for r repeated roots. 1884 A. Daniell Text-bk. Princ. Physics v. 127 Longitudinal vibrations of a string or rod..whose ends are held fixed obey the same principles as transverse vibrations. Fourier's law holds good. 1902 E. T. Whittaker Course Mod. Anal. vii. 152 The question arises..whether the Fourier expansion is unique. 1911 Proc. Royal Soc. A. 85 14 We can also sum the series of the products of the Fourier coefficients of two such functions. 1912 London, Edinb., & Dublin Philos. Mag. 6th Ser. 24 866 Fourier's integral. 1923 Proc. Cambr. Philos. Soc. 21 463 The notion of Fourier transforms arises from Fourier's integral formula,..which gives..reciprocal relations..connecting the two functions f(x) and F(x). 1929 V. Bush Operational Circuit Anal. x. 186 Direct operational methods may be regarded as shorthand processes of evaluating and tabulating the results of Fourier analysis. 1936 Discovery Apr. 114/2 All sound-waves (except those from a flute, closed organ-pipe, etc.) are composed of many combined vibrations whose composition follows Fourier's law. 1957 R. S. Longhurst Geom. & Physical Optics xi. 226 The Fraunhofer pattern is the Fourier transform of the amplitude across the diffracting aperture and vice versa. 1963 R. W. Ditchburn Light (ed. 2) iv. 89 The ‘top-hat curve’ shown in fig. 4.6 can be represented by an appropriate Fourier series..for all values of x₀ because the curve to be represented is periodic. 1964 Oceanogr. & Marine Biol. 2 14 The correlation coefficient f_u(τ) is related by a Fourier transformation to the spectrum function F_u(n). 1965 S. I. Pearson & G. J. Maler Introd. Circuit Anal. ix. 439 The Fourier transform..is useful in analyzing pulses from a frequency standpoint. 1967 E. U. Condon & H. Odishaw Handbk. Physics (ed. 2) ii. iii. 26/2 The part of F(t) effective in exciting the oscillator is the component in its Fourier integral representation associated with the natural frequency of the oscillator. extracted from Fouriern. < as lemmas
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