AI & ChatGPT searches , social queriess for DIGAMMA FUNCTION

Search references for DIGAMMA FUNCTION. Phrases containing DIGAMMA FUNCTION

See searches and references containing DIGAMMA FUNCTION!

AI searches containing DIGAMMA FUNCTION

DIGAMMA FUNCTION

  • Digamma function
  • Mathematical function

    In mathematics, the digamma function is defined as the logarithmic derivative of the gamma function: ψ ( z ) = d d z ln ⁡ Γ ( z ) = Γ ′ ( z ) Γ ( z )

    Digamma function

    Digamma function

    Digamma_function

  • Polygamma function
  • Meromorphic function

    {\Gamma '(z)}{\Gamma (z)}}} holds where ψ(z) is the digamma function and Γ(z) is the gamma function. They are holomorphic on C ∖ Z ≤ 0 {\displaystyle \mathbb

    Polygamma function

    Polygamma function

    Polygamma_function

  • Trigamma function
  • Mathematical function

    {\displaystyle \psi _{1}(z)={\frac {d}{dz}}\psi (z)} where ψ(z) is the digamma function. It may also be defined as the sum of the series ψ 1 ( z ) = ∑ n =

    Trigamma function

    Trigamma function

    Trigamma_function

  • Beta distribution
  • Probability distribution

    the digamma function. Therefore, the geometric mean of a beta distribution with shape parameters α and β is the exponential of the digamma functions of

    Beta distribution

    Beta distribution

    Beta_distribution

  • Digamma
  • Archaic letter of the Greek alphabet

    Digamma, or wau (uppercase: Ϝ, lowercase: ϝ, numeral: ϛ), is an archaic letter of the Greek alphabet. It originally stood for the sound /w/ but it has

    Digamma

    Digamma

  • Gamma function
  • Extension of the factorial function

    of the gamma function is called the digamma function; higher derivatives are the polygamma functions. The analog of the gamma function over a finite

    Gamma function

    Gamma function

    Gamma_function

  • Beta function
  • Mathematical function

    1\leq m\leq n,} where ψ ( z ) {\displaystyle \psi (z)} denotes the digamma function. Stirling's approximation gives the asymptotic formula B ( x , y )

    Beta function

    Beta function

    Beta_function

  • Bessel function
  • Family of solutions to related differential equations

    where ψ ( z ) {\displaystyle \psi (z)} is the digamma function, the logarithmic derivative of the gamma function. There is also a corresponding integral formula

    Bessel function

    Bessel function

    Bessel_function

  • Harmonic series (mathematics)
  • Divergent sum of positive unit fractions

    numbers, but this remains unproven. The digamma function is defined as the logarithmic derivative of the gamma function ψ ( x ) = d d x ln ⁡ ( Γ ( x ) ) =

    Harmonic series (mathematics)

    Harmonic_series_(mathematics)

  • Factorial
  • Product of numbers from 1 to n

    that are divisible by p. The digamma function is the logarithmic derivative of the gamma function. Just as the gamma function provides a continuous interpolation

    Factorial

    Factorial

  • List of mathematical functions
  • coefficient analogue. Digamma function, Polygamma function Incomplete beta function Incomplete gamma function K-function Multivariate gamma function: A generalization

    List of mathematical functions

    List_of_mathematical_functions

  • Euler's constant
  • Difference between logarithm and harmonic series

    x-\gamma } . Evaluations of the digamma function at rational values. The Laurent series expansion for the Riemann zeta function*, where it is the first of

    Euler's constant

    Euler's constant

    Euler's_constant

  • Harmonic number
  • Sum of the first n whole number reciprocals; 1/1 + 1/2 + 1/3 + ... + 1/n

    than the negative integers x. The interpolating function is in fact closely related to the digamma function H x = ψ ( x + 1 ) + γ , {\displaystyle H_{x}=\psi

    Harmonic number

    Harmonic number

    Harmonic_number

  • Gamma distribution
  • Probability distribution

    than zero, and E[ln X] = ψ(α) + ln θ = ψ(α) − ln β is fixed (ψ is the digamma function). The parameterization with α and θ appears to be more common in econometrics

    Gamma distribution

    Gamma distribution

    Gamma_distribution

  • Hypergeometric function
  • Function defined by a hypergeometric series

    multiplied by ln(z), plus another series in powers of z, involving the digamma function. See Olde Daalhuis (2010) for details. Around z = 1, if c − a − b is

    Hypergeometric function

    Hypergeometric function

    Hypergeometric_function

  • Dirichlet distribution
  • Probability distribution

    _{0})} where ψ {\displaystyle \psi } is the digamma function, ψ ′ {\displaystyle \psi '} is the trigamma function, and δ i j {\displaystyle \delta _{ij}}

    Dirichlet distribution

    Dirichlet distribution

    Dirichlet_distribution

  • Binomial coefficient
  • Number of subsets of a given size

    previous generating function after the substitution ⁠ x → x y {\displaystyle x\to xy} ⁠. A symmetric exponential bivariate generating function of the binomial

    Binomial coefficient

    Binomial coefficient

    Binomial_coefficient

  • Indefinite sum
  • Inverse of a finite difference

    Hurwitz zeta function, and ψ ( z ) {\displaystyle \psi (z)} is the digamma function. This is related to the generalized harmonic numbers. Combined with

    Indefinite sum

    Indefinite sum

    Indefinite_sum

  • Inverse-gamma distribution
  • Two-parameter family of continuous probability distributions

    \end{aligned}}} where ψ ( α ) {\displaystyle \psi (\alpha )} is the digamma function. The Kullback-Leibler divergence of Inverse-Gamma(αp, βp) from Inverse-Gamma(αq

    Inverse-gamma distribution

    Inverse-gamma distribution

    Inverse-gamma_distribution

  • Multivariate gamma function
  • Multivariate generalization of the gamma function

    gamma function insofar as the latter is obtained by a particular choice of multivariate argument of the former. We may define the multivariate digamma function

    Multivariate gamma function

    Multivariate_gamma_function

  • Hadamard's gamma function
  • Extension of the factorial function

    where ψ(x) denotes the digamma function, and L {\displaystyle L} denotes the Lerch zeta function. Gamma function Pseudogamma function Alzer, Horst (January

    Hadamard's gamma function

    Hadamard's gamma function

    Hadamard's_gamma_function

  • Exponential distribution
  • Probability distribution

    Euler-Mascheroni constant, and ψ ( ⋅ ) {\displaystyle \psi (\cdot )} is the digamma function. In the case of equal rate parameters, the result is an Erlang distribution

    Exponential distribution

    Exponential distribution

    Exponential_distribution

  • Pseudogamma function
  • Function that interpolates the factorial

    gamma function and ψ(x) denotes the digamma function. Other related pseudogamma functions are also known. However, by adding conditions to the function interpolating

    Pseudogamma function

    Pseudogamma_function

  • List of indefinite sums
  • {\displaystyle \zeta (s,a)} is the Hurwitz zeta function, and ψ ( z ) {\displaystyle \psi (z)} is the digamma function. This is related to the generalized harmonic

    List of indefinite sums

    List_of_indefinite_sums

  • Psi function
  • Topics referred to by the same term

    Chebyshev function ψ ( x ) {\displaystyle \psi (x)} the polygamma function ψ m ( z ) {\displaystyle \psi ^{m}(z)} or its special cases the digamma function ψ

    Psi function

    Psi_function

  • Bernoulli number
  • Rational number sequence

    example is the classical Poincaré-type asymptotic expansion of the digamma function ψ. ψ ( z ) ∼ ln ⁡ z − ∑ k = 1 ∞ B k + k z k {\displaystyle \psi (z)\sim

    Bernoulli number

    Bernoulli_number

  • Psi
  • Topics referred to by the same term

    Melchior Islands, Antarctica Chebyshev function Dedekind psi function Digamma function Polygamma functions Stream function, in two-dimensional flows Polar tangential

    Psi

    Psi

  • Student's t-distribution
  • Probability distribution

    instance of the hypergeometric function. For information on its inverse cumulative distribution function, see quantile function § Student's t-distribution

    Student's t-distribution

    Student's t-distribution

    Student's_t-distribution

  • Particular values of the Riemann zeta function
  • Constants of the mathematical zeta function

    (k)x^{k-1}=-\psi _{0}(1-x)-\gamma } where ψ 0 {\displaystyle \psi _{0}} is the digamma function. ∑ k = 2 ∞ ( ζ ( k ) − 1 ) = 1 ∑ k = 1 ∞ ( ζ ( 2 k ) − 1 ) = 3 4 ∑

    Particular values of the Riemann zeta function

    Particular values of the Riemann zeta function

    Particular_values_of_the_Riemann_zeta_function

  • Hurwitz zeta function
  • Special function in mathematics

    {\displaystyle \Gamma } is the gamma function and ψ = Γ ′ / Γ {\displaystyle \psi =\Gamma '/\Gamma } is the digamma function. As a special case, γ 0 ( 1 ) =

    Hurwitz zeta function

    Hurwitz zeta function

    Hurwitz_zeta_function

  • Negative binomial distribution
  • Probability distribution

    {\displaystyle \psi (k)={\frac {\Gamma '(k)}{\Gamma (k)}}\!} is the digamma function. Solving the first equation for p gives: p = N r N r + ∑ i = 1 N k

    Negative binomial distribution

    Negative binomial distribution

    Negative_binomial_distribution

  • Greek letters used in mathematics, science, and engineering
  • Symbols for constants, special functions

    symbols in mathematics, in particular for ε/ϵ and π/ϖ. The archaic letter digamma (Ϝ/ϝ/ϛ) is sometimes used. The Bayer designation naming scheme for stars

    Greek letters used in mathematics, science, and engineering

    Greek_letters_used_in_mathematics,_science,_and_engineering

  • Particular values of the gamma function
  • Mathematical constants

    negative real axis, the first local maxima and minima (zeros of the digamma function) are: The only values of x > 0 for which Γ(x) = x are x = 1 and x ≈

    Particular values of the gamma function

    Particular_values_of_the_gamma_function

  • Explicit formulae for L-functions
  • Mathematical concept

    \psi } is the digamma function Γ′/Γ. Roughly speaking, the explicit formula says the Fourier transform of the zeros of the zeta function is the set of

    Explicit formulae for L-functions

    Explicit_formulae_for_L-functions

  • Differentiation rules
  • Rules for computing derivatives of functions

    (x)\psi (x),\end{aligned}}} with ψ ( x ) {\textstyle \psi (x)} being the digamma function, expressed by the parenthesized expression to the right of Γ ( x )

    Differentiation rules

    Differentiation_rules

  • Kelvin functions
  • integral n, the Kelvin functions have a branch point at x = 0. Below, Γ(z) is the gamma function and ψ(z) is the digamma function. For integers n, bern(x)

    Kelvin functions

    Kelvin functions

    Kelvin_functions

  • Differential entropy
  • Concept in information theory

    digamma function, B ( p , q ) = Γ ( p ) Γ ( q ) Γ ( p + q ) {\displaystyle B(p,q)={\frac {\Gamma (p)\Gamma (q)}{\Gamma (p+q)}}} is the beta function,

    Differential entropy

    Differential_entropy

  • Barnes G-function
  • Extension of superfactorials to the complex numbers

    G(z)} Taking the logarithm of both sides introduces the analog of the Digamma function ψ ( x ) {\displaystyle \psi (x)} , φ ( x ) ≡ d d x log ⁡ G ( x ) ,

    Barnes G-function

    Barnes G-function

    Barnes_G-function

  • Chi-squared distribution
  • Probability distribution and special case of gamma distribution

    {k}{2}}\right),\end{aligned}}} where ψ ( x ) {\displaystyle \psi (x)} is the Digamma function. The chi-squared distribution is the maximum entropy probability distribution

    Chi-squared distribution

    Chi-squared distribution

    Chi-squared_distribution

  • Combinatorics
  • Branch of discrete mathematics

    combinatorics, which uses explicit combinatorial formulae and generating functions to describe the results, analytic combinatorics aims at obtaining asymptotic

    Combinatorics

    Combinatorics

  • Lerch transcendent
  • Special mathematical function

    ^{n-1}(z)}{(n-1)!}}\right\},} where ψ ( n ) {\displaystyle \psi (n)} is the digamma function. A Taylor series in the third variable is given by Φ ( z , s , a +

    Lerch transcendent

    Lerch_transcendent

  • Table of Newtonian series
  • } The log {\displaystyle \log } of the gamma function, and its derivative the digamma function, can both have Newtonian series found by taking their

    Table of Newtonian series

    Table_of_Newtonian_series

  • Generalized Pareto distribution
  • Family of probability distributions often used to model tails or extreme values

    parameters, while the ξ {\displaystyle \xi } participates through the digamma function: E ⁡ [ Y ] = { log ⁡ ( − σ ξ ) + ψ ( 1 ) − ψ ( − 1 / ξ + 1 ) for  ξ

    Generalized Pareto distribution

    Generalized Pareto distribution

    Generalized_Pareto_distribution

  • List of things named after Carl Friedrich Gauss
  • {\displaystyle \scriptstyle {\sqrt {2}}} Gauss's digamma theorem, a theorem about the digamma function Gauss's generalization of Wilson's theorem Gauss's

    List of things named after Carl Friedrich Gauss

    List of things named after Carl Friedrich Gauss

    List_of_things_named_after_Carl_Friedrich_Gauss

  • Exponential family
  • Family of probability distributions related to the normal distribution

    \beta ,\end{aligned}}} Where ψ ( x ) {\displaystyle \psi (x)} is the digamma function (derivative of log gamma), and we used the reverse substitutions in

    Exponential family

    Exponential_family

  • Logarithmic derivative
  • Mathematical operation in calculus

    needed] The digamma function, and by extension the polygamma function, is defined in terms of the logarithmic derivative of the gamma function. Generalizations

    Logarithmic derivative

    Logarithmic_derivative

  • F
  • Sixth letter of the Latin alphabet

    from digamma and closely resembles it in form. After sound changes eliminated /w/ from most dialects of Greek (Doric Greek retained it), digamma was used

    F

    F

    F

  • Euler–Maclaurin formula
  • Summation formula

    _{k=1}{\frac {B_{2k}}{2kn^{2k}}},} These harmonic numbers are related to the digamma function: ∑ k = 1 n 1 k = γ + ψ ( n + 1 ) {\displaystyle \sum _{k=1}^{n}{\frac

    Euler–Maclaurin formula

    Euler–Maclaurin_formula

  • Wishart distribution
  • Generalization of gamma distribution to multiple dimensions

    {\displaystyle \psi _{p}} is the multivariate digamma function (the derivative of the log of the multivariate gamma function). The following variance computation

    Wishart distribution

    Wishart_distribution

  • Stigma (ligature)
  • Ligature of Greek alphabet letters sigma and tau

    numeral symbol for the number 6. In this unrelated function, it is a continuation of the old letter digamma (originally Ϝ, cursive form ), which had served

    Stigma (ligature)

    Stigma_(ligature)

  • Period (number theory)
  • Numbers expressible as integrals of algebraic functions

    integral of γ {\displaystyle \gamma } one obtains all positive rational digamma values as a sum of two exponential period integrals. PlanetMath: Period

    Period (number theory)

    Period (number theory)

    Period_(number_theory)

  • Multiplication theorem
  • Identity obeyed by many special functions related to the gamma function

    {\displaystyle m>1} , and, for m = 1 {\displaystyle m=1} , one has the digamma function: k [ ψ ( k z ) − log ⁡ ( k ) ] = ∑ n = 0 k − 1 ψ ( z + n k ) . {\displaystyle

    Multiplication theorem

    Multiplication_theorem

  • Gautschi's inequality
  • (x+s)}}\leq \exp((1-s)\psi (x+1)),} where ψ {\displaystyle \psi } is the digamma function. Neither of these upper bounds is always stronger than the other. Kershaw

    Gautschi's inequality

    Gautschi's_inequality

  • List of factorial and binomial topics
  • system De Polignac's formula Difference operator Difference polynomials Digamma function Egorychev method Erdős–Ko–Rado theorem Euler–Mascheroni constant Faà

    List of factorial and binomial topics

    List_of_factorial_and_binomial_topics

  • Capacitance
  • Ability of a body to store an electrical charge

    {\textstyle V} is the voltage, in volts. Any two adjacent conductors can function as a capacitor, though the capacitance is small unless the conductors are

    Capacitance

    Capacitance

    Capacitance

  • Polygonal number
  • Type of figurate number

    also gives a general formula for any number of sides, in terms of the digamma function. The On-Line Encyclopedia of Integer Sequences eschews terms using

    Polygonal number

    Polygonal_number

  • Generalized gamma distribution
  • Probability distribution

    {\displaystyle \psi (\cdot )} is the digamma function. In the R programming language, there are a few packages that include functions for fitting and generating

    Generalized gamma distribution

    Generalized gamma distribution

    Generalized_gamma_distribution

  • Chinese restaurant process
  • Discrete-time stochastic process

    ))\end{aligned}}} where Ψ ( θ ) {\displaystyle \Psi (\theta )} is the digamma function. For the two-parameter case, for α ≠ 0 {\displaystyle \alpha \neq 0}

    Chinese restaurant process

    Chinese_restaurant_process

  • Normal-gamma distribution
  • Family of continuous probability distributions

    ,} where ψ ( α ) {\displaystyle \psi \left(\alpha \right)} is the digamma function, E ⁡ ( T ) = α β , E ⁡ ( T X ) = μ α β , E ⁡ ( T X 2 ) = 1 λ + μ 2

    Normal-gamma distribution

    Normal-gamma_distribution

  • Stieltjes constants
  • Constants in the zeta function's Laurent series expansion

    Hurwitz zeta function is a generalization of the Riemann zeta function, we have γn(1)=γn . The zeroth constant is simply the digamma-function γ0(a)=-Ψ(a)

    Stieltjes constants

    Stieltjes constants

    Stieltjes_constants

  • Weak localization
  • Quantum physical phenomenon

    }}{B}}\right)\right],\end{aligned}}} where ψ {\displaystyle \psi } is the digamma function, B ϕ {\displaystyle B_{\phi }} is the phase-coherence characteristic

    Weak localization

    Weak localization

    Weak_localization

  • Generalized normal distribution
  • Probability distribution

    {\displaystyle \psi } and ψ ′ {\displaystyle \psi '} are the digamma function and trigamma function respectively. Given a value for ⁠ β {\displaystyle \textstyle

    Generalized normal distribution

    Generalized_normal_distribution

  • Volkenborn integral
  • Mathematical integration method

    {\displaystyle \log _{p}} the p-adic logarithmic function and ψ p {\displaystyle \psi _{p}} the p-adic digamma function. ∫ Z p f ( x + m ) d x = ∫ Z p f ( x ) d

    Volkenborn integral

    Volkenborn_integral

  • Maximum entropy probability distribution
  • Probability distribution that has the most entropy of a class

    (x)={\frac {d}{dx}}\ln \Gamma (x)={\frac {\Gamma '(x)}{\Gamma (x)}}} is the digamma function, B ( p , q ) = Γ ( p ) Γ ( q ) Γ ( p + q ) {\displaystyle B(p,q)={\frac

    Maximum entropy probability distribution

    Maximum_entropy_probability_distribution

  • Bernoulli umbra
  • x)-1} , where ψ − 1 ( x ) {\displaystyle \psi ^{-1}(x)} is inverse digamma function. Since Bernoulli polynomials is a generalization of Bernoulli numbers

    Bernoulli umbra

    Bernoulli umbra

    Bernoulli_umbra

  • Koppa
  • Archaic letter of the Greek alphabet

    "P", or a "5" turned upside down. As with the numeral usage of stigma (digamma) and sampi, modern typographical practice normally does not observe a contrast

    Koppa

    Koppa

  • Eta
  • Seventh letter in the Greek alphabet

    Greek dialects to represent the voiceless glottal fricative, [h]. In this function, it was borrowed in the 8th century BC by the Etruscan and other Old Italic

    Eta

    Eta

  • Archaic Greek alphabets
  • Local variants of the ancient Greek alphabet

    functional values of the classic eta versus epsilon system. The letter Digamma (Ϝ) for the sound /w/ was generally used only in those local scripts where

    Archaic Greek alphabets

    Archaic Greek alphabets

    Archaic_Greek_alphabets

  • Havriliak–Negami relaxation
  • Model in electromagnetism

    is the digamma function and E u {\displaystyle {\rm {Eu}}} the Euler constant. The inverse Fourier transform of the Havriliak-Negami function (the corresponding

    Havriliak–Negami relaxation

    Havriliak–Negami_relaxation

  • Theta
  • Eighth letter of the Greek alphabet

    variable in trigonometry A special function ϑ(z; τ) of several complex variables θ. The first Chebyshev function θ(x) in prime number theory The potential

    Theta

    Theta

  • List of derivatives and integrals in alternative calculi
  • {\displaystyle \psi (x)={\frac {\Gamma '(x)}{\Gamma (x)}}} is the digamma function, K ⁡ ( x ) = e ζ ′ ( − 1 , x ) − ζ ′ ( − 1 ) = e z − z 2 2 + z 2 ln

    List of derivatives and integrals in alternative calculi

    List_of_derivatives_and_integrals_in_alternative_calculi

  • Series multisection
  • In mathematics, series built from equally spaced terms of another series

    step of a standard proof of Gauss's digamma theorem, which gives a closed-form solution to the digamma function evaluated at rational values p/q. Simpson

    Series multisection

    Series_multisection

  • Estimation of covariance matrices
  • Statistics concept

    (n-p+1)+(n-p+1)\psi (n-p+2)+\psi (n+1)-(n+1)\psi (n+2)\right)} and ψ(·) is the digamma function. The intrinsic bias of the sample covariance matrix equals exp R ⁡

    Estimation of covariance matrices

    Estimation_of_covariance_matrices

  • Gradshteyn and Ryzhik
  • Table of integrals compiled by I. S. Gradshteyn and I. M. Ryzhik

    [2007-11-29]. "The integrals in Gradshteyn and Ryzhik. Part 10: The digamma function" (PDF). Scientia. Series A: Mathematical Sciences. 17 (published 2009):

    Gradshteyn and Ryzhik

    Gradshteyn and Ryzhik

    Gradshteyn_and_Ryzhik

  • Sigma
  • Eighteenth letter of the Greek alphabet

    theory, σ is included in various divisor functions, especially the sigma function or sum-of-divisors function. In applied mathematics, σ(T) denotes the

    Sigma

    Sigma

  • Generalized logistic distribution
  • Name for several different families of probability distributions

    is the digamma function, while ψ ′ = ψ ( 1 ) {\displaystyle \psi '=\psi ^{(1)}} is its first derivative, also known as the trigamma function, or the

    Generalized logistic distribution

    Generalized_logistic_distribution

  • Beta prime distribution
  • Probability distribution

    }}{\mathrm {B} (\alpha ,\beta )}}} where B is the Beta function. The cumulative distribution function is F ( x ; α , β ) = I x 1 + x ( α , β ) , {\displaystyle

    Beta prime distribution

    Beta prime distribution

    Beta_prime_distribution

  • Omega
  • Last letter of the Greek alphabet

    science: In complex analysis, the Omega constant, a solution of Lambert's W function. In differential geometry, the space of differential forms on a manifold

    Omega

    Omega

  • Pi (letter)
  • Greek letter

    Eric W. "Prime Counting Function". mathworld.wolfram.com. Retrieved 2025-01-18. The prime counting function is the function π(x) giving the number of

    Pi (letter)

    Pi_(letter)

  • Delta (letter)
  • Fourth letter in the Greek alphabet

    difference for a function. The degree of a vertex in graph theory. The Dirac delta function in mathematics. The transition function in automata. Deflection

    Delta (letter)

    Delta_(letter)

  • San (letter)
  • Archaic letter of the Greek alphabet

    same glyph is used to denote the unrelated letter digamma /w/ in Pamphylia (the "Pamphylian digamma") and was also the form of beta /b/ used in Melos

    San (letter)

    San (letter)

    San_(letter)

  • Lambda
  • Eleventh letter in the Greek alphabet

    shield blazon by the Spartans.[citation needed] Lambda is the von Mangoldt function in mathematical number theory. Lambda denotes the de Bruijn–Newman constant

    Lambda

    Lambda

    Lambda

  • Scaled inverse chi-squared distribution
  • Probability distribution

    \left(\tau ^{2}\right),} where ψ ( x ) {\displaystyle \psi (x)} is the digamma function. An initial estimate can be found by taking the formula for mean and

    Scaled inverse chi-squared distribution

    Scaled inverse chi-squared distribution

    Scaled_inverse_chi-squared_distribution

  • Beta
  • Second letter of the Greek alphabet

    beta may represent type II error, or regression slope. Dirichlet beta function Some uses of beta in physics and engineering include: In spaceflight, beta

    Beta

    Beta

  • Epsilon
  • Fifth letter of the Greek alphabet

    of distinguishing between various e-like sounds. In Corinth, the normal function of ⟨Ε⟩ to denote /e/ and /ɛː/ was taken by a glyph resembling a pointed

    Epsilon

    Epsilon

  • Mu (letter)
  • Twelfth letter of the Greek alphabet

    differential equations The degree of membership in a fuzzy set The Möbius function in number theory The population mean or expected value in probability and

    Mu (letter)

    Mu (letter)

    Mu_(letter)

  • Phi
  • Twenty-first letter in the Greek alphabet

    φ − 1.) Euler's totient function φ(n) in number theory; also called Euler's phi function. The cyclotomic polynomial functions Φn(x) of algebra. The number

    Phi

    Phi

    Phi

  • Kappa
  • Tenth letter in the Greek Alphabet

    steel member. In electrical engineering, κ is the multiplication factor, a function of the R/X ratio of the equivalent power system network, which is used

    Kappa

    Kappa

    Kappa

  • Sampi
  • Archaic letter of the Greek alphabet

    alphabet were used with the addition of three archaic or local letters: digamma/wau (Ϝ, , originally denoting the sound /w/) for "6", koppa (Ϙ, originally

    Sampi

    Sampi

  • Tau
  • Nineteenth letter in the Greek alphabet

    chronic traumatic encephalopathy Divisor function in number theory, also denoted d or σ0 Ramanujan tau function Golden ratio (1.618...), although φ (phi)

    Tau

    Tau

  • Zeta
  • Sixth letter in the Greek alphabet

    parallel. Zeta has the numerical value 7 rather than 6 because the letter digamma (ϝ, also called 'stigma' as a Greek numeral) was originally in the sixth

    Zeta

    Zeta

  • Omicron
  • Fifteenth letter of the Greek alphabet

    ζ (zeta) but the number 6 was represented a revived ancient letter ′ϝ (digamma), followed by ′ζ which was pushed up from 6th to its ancient position (7th)

    Omicron

    Omicron

  • Spouge's approximation
  • approximation Spouge, John L. (1994). "Computation of the Gamma, Digamma, and Trigamma Functions". SIAM Journal on Numerical Analysis. 31 (3): 931–000. doi:10

    Spouge's approximation

    Spouge's_approximation

  • Gamma
  • Third letter of the Greek alphabet

    as a symbol for: In mathematics, the gamma function (usually written as Γ {\displaystyle \Gamma } -function) is an extension of the factorial to complex

    Gamma

    Gamma

  • Greek ligatures
  • Ligatures used in Greek writing

    It took on the function of a number sign for "6", having been visually conflated with the cursive form of the ancient letter digamma, which had this

    Greek ligatures

    Greek ligatures

    Greek_ligatures

  • Carl Johan Malmsten
  • Swedish mathematician and politician (1814–1886)

    constant, ζ stands for the Riemann zeta-function, Ψ is the digamma function, and Ψ1 is the trigamma function; see respectively eq. (43), (47) and (48)

    Carl Johan Malmsten

    Carl Johan Malmsten

    Carl_Johan_Malmsten

  • Greek alphabet
  • Script used to write the Greek language

    consonant for [w] (Ϝ, digamma). In addition, the Phoenician letter for the emphatic glottal /ħ/ (heth) was borrowed in two different functions by different dialects

    Greek alphabet

    Greek_alphabet

  • Psi (Greek)
  • Penultimate letter in the Greek alphabet

    function Water potential in movement of water between plant cells In biochemistry, it denotes pseudouridine, an uncommon nucleoside A stream function

    Psi (Greek)

    Psi (Greek)

    Psi_(Greek)

  • Frobenius solution to the hypergeometric equation
  • authors prefer to express the finite sums in this last result using the digamma function ψ ( x ) {\displaystyle \psi (x)} . In particular, the following results

    Frobenius solution to the hypergeometric equation

    Frobenius_solution_to_the_hypergeometric_equation

  • Heta
  • Archaic letter in the Greek alphabet

    letter eta (Η) and several of its variants, when used in their original function of denoting the consonant /h/. The letter Η had been adopted by Greek from

    Heta

    Heta

AI & ChatGPT searchs for online references containing DIGAMMA FUNCTION

DIGAMMA FUNCTION

AI search references containing DIGAMMA FUNCTION

DIGAMMA FUNCTION

  • Damma
  • Girl/Female

    Gujarati, Hindu, Indian

    Damma

    The Soothing Voice

    Damma

  • Digambar
  • Boy/Male

    Hindu

    Digambar

    Naked, Unencumbered

    Digambar

  • Catt
  • Surname or Lastname

    English

    Catt

    English : nickname from the animal, Middle English catte ‘cat’. The word is found in similar forms in most European languages from very early times (e.g. Gaelic cath, Slavic kotu). Domestic cats were unknown in Europe in classical times, when weasels fulfilled many of their functions, for example in hunting rodents. They seem to have come from Egypt, where they were regarded as sacred animals.English : from a medieval female personal name, a short form of Catherine.Variant spelling of German and Dutch Katt.

    Catt

  • Nagamma
  • Girl/Female

    Hindu

    Nagamma

    Nag devta, Song, Tune or a melody

    Nagamma

  • KHEN-TA
  • Male

    Egyptian

    KHEN-TA

    , Functionary of the Interior.

    KHEN-TA

  • Digambar | திகஂபர
  • Boy/Male

    Tamil

    Digambar | திகஂபர

    Naked, Unencumbered

    Digambar | திகஂபர

  • Jenner
  • Surname or Lastname

    English (chiefly Kent and Sussex)

    Jenner

    English (chiefly Kent and Sussex) : occupational name for a designer or engineer, from a Middle English reduced form of Old French engineor ‘contriver’ (a derivative of engaigne ‘cunning’, ‘ingenuity’, ‘stratagem’, ‘device’). Engineers in the Middle Ages were primarily designers and builders of military machines, although in peacetime they might turn their hands to architecture and other more pacific functions.German : from the Latin personal name Januarius (see January 1). Jänner is a South German word for ‘January’, and so it is possible that this is one of the surnames acquired from words denoting months of the year, for example by converts who had been baptized in that month, people who were born or baptized in that month, or people whose taxes were due in January.

    Jenner

  • Genki
  • Boy/Male

    Buddhist, Indian, Japanese

    Genki

    Mysterious Function

    Genki

  • Diganta | தீகநதா
  • Boy/Male

    Tamil

    Diganta | தீகநதா

    Horizon

    Diganta | தீகநதா

  • FIAMMETTA
  • Female

    Italian

    FIAMMETTA

    Italian name composed of the word fiamma "fire" and a diminutive suffix, FIAMMETTA means "little fire."

    FIAMMETTA

  • Gates
  • Surname or Lastname

    English

    Gates

    English : topographic name for someone who lived by the gates of a medieval walled town. The Middle English singular gate is from the Old English plural, gatu, of geat ‘gate’ (see Yates). Since medieval gates were normally arranged in pairs, fastened in the center, the Old English plural came to function as a singular, and a new Middle English plural ending in -s was formed. In some cases the name may refer specifically to the Sussex place Eastergate (i.e. ‘eastern gate’), known also as Gates in the 13th and 14th centuries, when surnames were being acquired.Americanized spelling of German Götz (see Goetz).Translated form of French Barrière (see Barriere).In New England, Gates was the preferred English version of the name of an extensive French family, called Barrière dit Langevin.

    Gates

  • Nagamma | நாகமமாஂ 
  • Girl/Female

    Tamil

    Nagamma | நாகமமாஂ 

    Nag devta, Song, Tune or a melody

    Nagamma | நாகமமாஂ 

  • KAFH-EN-MA-NOFRE
  • Male

    Egyptian

    KAFH-EN-MA-NOFRE

    , a high Egyptian functionary.

    KAFH-EN-MA-NOFRE

  • Fuller
  • Surname or Lastname

    English

    Fuller

    English : occupational name for a dresser of cloth, Old English fullere (from Latin fullo, with the addition of the English agent suffix). The Middle English successor of this word had also been reinforced by Old French fouleor, foleur, of similar origin. The work of the fuller was to scour and thicken the raw cloth by beating and trampling it in water. This surname is found mostly in southeast England and East Anglia. See also Tucker and Walker.In a few cases the name may be of German origin with the same form and meaning as 1 (from Latin fullare).Americanized version of French Fournier.Samuel Fuller (1589–1633), born in Redenhall, Norfolk, England, was among the Pilgrim Fathers who sailed on the Mayflower in 1620. He was a deacon of the church and until his death functioned as Plymouth Colony’s physician.

    Fuller

  • Digambar
  • Boy/Male

    Bengali, Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Sanskrit, Sindhi, Telugu, Traditional

    Digambar

    Sky Clad; Another Name for Siva; Unencumbered; Sky-clad; Naked; Lord Shiva

    Digambar

  • Look for pages within Wikipedia that link to this title
  • Biblical

    Look for pages within Wikipedia that link to this title

    If a page was recently created here it may not be visible yet because of a delay in updating the database; wait a few minutes or try the function.

    Look for pages within Wikipedia that link to this title

  • Diganta
  • Boy/Male

    Assamese, Bengali, Hindu, Indian, Traditional

    Diganta

    Horizon; Sky; No End

    Diganta

  • VIRIDOMARUS
  • Male

    Celtic

    VIRIDOMARUS

    , great justiciary, or functionary.

    VIRIDOMARUS

  • Nigama
  • Girl/Female

    Indian, Telugu

    Nigama

    Phrase of Music

    Nigama

  • Diganta
  • Boy/Male

    Hindu

    Diganta

    Horizon

    Diganta

AI search queriess for Facebook and twitter posts, hashtags with DIGAMMA FUNCTION

DIGAMMA FUNCTION

Follow users with usernames @DIGAMMA FUNCTION or posting hashtags containing #DIGAMMA FUNCTION

DIGAMMA FUNCTION

Online names & meanings

  • Chandni |
  • Girl/Female

    Muslim

    Chandni |

    A river, Moon light

  • Eila
  • Girl/Female

    Irish

    Eila

  • Perahta
  • Girl/Female

    German

    Perahta

    Glorious

  • Allfry
  • Girl/Female

    British, English

    Allfry

    Elf Power

  • Senen
  • Boy/Male

    Australian, Hebrew, Indonesian, Irish

    Senen

    Gift from God; Monday; God is Gracious Gift

  • Gascoigne
  • Surname or Lastname

    English

    Gascoigne

    English : from Old French Gascogne ‘Gascony’, hence a regional name. The name of the region derives from that of the Basques, who are found close by and formerly extended into this region as well; they are first named in Roman sources as Vascōnes, but the original meaning of the name, derived from a root eusk- in the non-Indo-European language that they still speak today, is completely obscure. By the Middle Ages the Basques had been displaced from most of Gascony by speakers of Gascon (a dialect of Occitan, related to French), who were proverbial for their boastfulness. In the 11th century Gascony united with Aquitaine and was thus held by England between 1154 and 1453. See Gascon.

  • Ihtisham
  • Girl/Female

    Arabic, Muslim

    Ihtisham

    Chastity; Modesty; Decency; Decorum

  • Mizhi
  • Girl/Female

    Indian, Malayalam

    Mizhi

    Eyes

  • Hedy
  • Girl/Female

    American, Christian, Danish, French, German, Greek, Indian

    Hedy

    Sweet or Pleasent; Battle Maiden

  • Saheim
  • Boy/Male

    Arabic, Muslim

    Saheim

    Warrior

AI search & ChatGPT queriess for Facebook and twitter users, user names, hashtags with DIGAMMA FUNCTION

DIGAMMA FUNCTION

Top AI & ChatGPT search, Social media, medium, facebook & news articles containing DIGAMMA FUNCTION

DIGAMMA FUNCTION

AI searchs for Acronyms & meanings containing DIGAMMA FUNCTION

DIGAMMA FUNCTION

AI searches, Indeed job searches and job offers containing DIGAMMA FUNCTION

Other words and meanings similar to

DIGAMMA FUNCTION

AI search in online dictionary sources & meanings containing DIGAMMA FUNCTION

DIGAMMA FUNCTION

  • Functionary
  • n.

    One charged with the performance of a function or office; as, a public functionary; secular functionaries.

  • Functional
  • a.

    Pertaining to, or connected with, a function or duty; official.

  • Disjoint
  • v. t.

    Difficult situation; dilemma; strait.

  • Digammate
  • a.

    Alt. of Digammated

  • Fix
  • n.

    A position of difficulty or embarassment; predicament; dilemma.

  • Digamma
  • n.

    A letter (/, /) of the Greek alphabet, which early fell into disuse.

  • Functionally
  • adv.

    In a functional manner; as regards normal or appropriate activity.

  • Digammated
  • a.

    Having the digamma or its representative letter or sound; as, the Latin word vis is a digammated form of the Greek /.

  • Digamy
  • n.

    Act, or state, of being twice married; deuterogamy.

  • Gamma
  • n.

    The third letter (/, / = Eng. G) of the Greek alphabet.

  • Eysell
  • n.

    Same as Eisel. F () F is the sixth letter of the English alphabet, and a nonvocal consonant. Its form and sound are from the Latin. The Latin borrowed the form from the Greek digamma /, which probably had the value of English w consonant. The form and value of Greek letter came from the Phoenician, the ultimate source being probably Egyptian. Etymologically f is most closely related to p, k, v, and b; as in E. five, Gr. pe`nte; E. wolf, L. lupus, Gr. ly`kos; E. fox, vixen ; fragile, break; fruit, brook, v. t.; E. bear, L. ferre. See Guide to Pronunciation, // 178, 179, 188, 198, 230.

  • Bodian
  • n.

    A large food fish (Diagramma lineatum), native of the East Indies.

  • Functionalize
  • v. t.

    To assign to some function or office.

  • Functionaries
  • pl.

    of Functionary

  • Dilemma
  • n.

    An argument which presents an antagonist with two or more alternatives, but is equally conclusive against him, whichever alternative he chooses.

  • Crocodile
  • n.

    A fallacious dilemma, mythically supposed to have been first used by a crocodile.

  • Functionless
  • a.

    Destitute of function, or of an appropriate organ. Darwin.

  • Dilemma
  • n.

    A state of things in which evils or obstacles present themselves on every side, and it is difficult to determine what course to pursue; a vexatious alternative or predicament; a difficult choice or position.

  • Trilemma
  • n.

    A syllogism with three conditional propositions, the major premises of which are disjunctively affirmed in the minor. See Dilemma.

  • Functional
  • a.

    Pertaining to the function of an organ or part, or to the functions in general.