Factorials and gamma functions¶

Factorials¶

factorial()/fac()¶

mpmath.factorial(x, **kwargs)

Computes the factorial, . For integers , we have and more generally the factorial is defined for real or complex by .

Examples

Basic values and limits:

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> for k in range(6):
...     print k, fac(k)
...
0 1.0
1 1.0
2 2.0
3 6.0
4 24.0
5 120.0
>>> fac(inf)
+inf
>>> fac(0.5), sqrt(pi)/2
(0.886226925452758, 0.886226925452758)


For large positive , can be approximated by Stirling’s formula:

>>> x = 10**10
>>> fac(x)
2.32579620567308e+95657055186
>>> sqrt(2*pi*x)*(x/e)**x
2.32579597597705e+95657055186


fac() supports evaluation for astronomically large values:

>>> fac(10**30)
6.22311232304258e+29565705518096748172348871081098


Reciprocal factorials appear in the Taylor series of the exponential function (among many other contexts):

>>> nsum(lambda k: 1/fac(k), [0, inf]), exp(1)
(2.71828182845905, 2.71828182845905)
>>> nsum(lambda k: pi**k/fac(k), [0, inf]), exp(pi)
(23.1406926327793, 23.1406926327793)


fac2()¶

mpmath.fac2(x)

Computes the double factorial , defined for integers by and more generally by Examples

The integer sequence of double factorials begins:

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> nprint([fac2(n) for n in range(10)])
[1.0, 1.0, 2.0, 3.0, 8.0, 15.0, 48.0, 105.0, 384.0, 945.0]


For large , double factorials follow a Stirling-like asymptotic approximation:

>>> x = mpf(10000)
>>> fac2(x)
5.97272691416282e+17830
>>> sqrt(pi)*x**((x+1)/2)*exp(-x/2)
5.97262736954392e+17830


The recurrence formula can be reversed to define the double factorial of negative odd integers (but not negative even integers):

>>> fac2(-1), fac2(-3), fac2(-5), fac2(-7)
(1.0, -1.0, 0.333333333333333, -0.0666666666666667)
>>> fac2(-2)
Traceback (most recent call last):
...
ValueError: gamma function pole


With the exception of the poles at negative even integers, fac2() supports evaluation for arbitrary complex arguments. The recurrence formula is valid generally:

>>> fac2(pi+2j)
(-1.3697207890154e-12 + 3.93665300979176e-12j)
>>> (pi+2j)*fac2(pi-2+2j)
(-1.3697207890154e-12 + 3.93665300979176e-12j)


Double factorials should not be confused with nested factorials, which are immensely larger:

>>> fac(fac(20))
5.13805976125208e+43675043585825292774
>>> fac2(20)
3715891200.0


Double factorials appear, among other things, in series expansions of Gaussian functions and the error function. Infinite series include:

>>> nsum(lambda k: 1/fac2(k), [0, inf])
3.05940740534258
>>> sqrt(e)*(1+sqrt(pi/2)*erf(sqrt(2)/2))
3.05940740534258
>>> nsum(lambda k: 2**k/fac2(2*k-1), [1, inf])
4.06015693855741
>>> e * erf(1) * sqrt(pi)
4.06015693855741


A beautiful Ramanujan sum:

>>> nsum(lambda k: (-1)**k*(fac2(2*k-1)/fac2(2*k))**3, [0,inf])
0.90917279454693
>>> (gamma('9/8')/gamma('5/4')/gamma('7/8'))**2
0.90917279454693


References

Binomial coefficients¶

binomial()¶

mpmath.binomial(n, k)

Computes the binomial coefficient The binomial coefficient gives the number of ways that items can be chosen from a set of items. More generally, the binomial coefficient is a well-defined function of arbitrary real or complex and , via the gamma function.

Examples

Generate Pascal’s triangle:

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> for n in range(5):
...     nprint([binomial(n,k) for k in range(n+1)])
...
[1.0]
[1.0, 1.0]
[1.0, 2.0, 1.0]
[1.0, 3.0, 3.0, 1.0]
[1.0, 4.0, 6.0, 4.0, 1.0]


There is 1 way to select 0 items from the empty set, and 0 ways to select 1 item from the empty set:

>>> binomial(0, 0)
1.0
>>> binomial(0, 1)
0.0


binomial() supports large arguments:

>>> binomial(10**20, 10**20-5)
8.33333333333333e+97
>>> binomial(10**20, 10**10)
2.60784095465201e+104342944813


Nonintegral binomial coefficients find use in series expansions:

>>> nprint(taylor(lambda x: (1+x)**0.25, 0, 4))
[1.0, 0.25, -0.09375, 0.0546875, -0.0375977]
>>> nprint([binomial(0.25, k) for k in range(5)])
[1.0, 0.25, -0.09375, 0.0546875, -0.0375977]


An integral representation:

>>> n, k = 5, 3
>>> f = lambda t: exp(-j*k*t)*(1+exp(j*t))**n
10.0
>>> binomial(n,k)
10.0


Gamma function¶

gamma()¶

mpmath.gamma(x, **kwargs)

Computes the gamma function, . The gamma function is a shifted version of the ordinary factorial, satisfying for integers . More generally, it is defined by for any real or complex with and for by analytic continuation.

Examples

Basic values and limits:

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> for k in range(1, 6):
...     print k, gamma(k)
...
1 1.0
2 1.0
3 2.0
4 6.0
5 24.0
>>> gamma(inf)
+inf
>>> gamma(0)
Traceback (most recent call last):
...
ValueError: gamma function pole


The gamma function of a half-integer is a rational multiple of :

>>> gamma(0.5), sqrt(pi)
(1.77245385090552, 1.77245385090552)
>>> gamma(1.5), sqrt(pi)/2
(0.886226925452758, 0.886226925452758)


We can check the integral definition:

>>> gamma(3.5)
3.32335097044784
3.32335097044784


gamma() supports arbitrary-precision evaluation and complex arguments:

>>> mp.dps = 50
>>> gamma(sqrt(3))
0.91510229697308632046045539308226554038315280564184
>>> mp.dps = 25
>>> gamma(2j)
(0.009902440080927490985955066 - 0.07595200133501806872408048j)


Arguments can also be large. Note that the gamma function grows very quickly:

>>> mp.dps = 15
>>> gamma(10**20)
1.9328495143101e+1956570551809674817225


gammaprod()¶

mpmath.gammaprod(a, b)

Given iterables and , gammaprod(a, b) computes the product / quotient of gamma functions: Unlike direct calls to gamma(), gammaprod() considers the entire product as a limit and evaluates this limit properly if any of the numerator or denominator arguments are nonpositive integers such that poles of the gamma function are encountered. That is, gammaprod() evaluates In particular:

• If there are equally many poles in the numerator and the denominator, the limit is a rational number times the remaining, regular part of the product.
• If there are more poles in the numerator, gammaprod() returns +inf.
• If there are more poles in the denominator, gammaprod() returns 0.

Examples

The reciprocal gamma function evaluated at :

>>> from mpmath import *
>>> mp.dps = 15
>>> gammaprod([], )
0.0


A limit:

>>> gammaprod([-4], [-3])
-0.25
>>> limit(lambda x: gamma(x-1)/gamma(x), -3, direction=1)
-0.25
>>> limit(lambda x: gamma(x-1)/gamma(x), -3, direction=-1)
-0.25


loggamma()¶

mpmath.loggamma(x)

Computes the principal branch of the log-gamma function, . Unlike , which has infinitely many complex branch cuts, the principal log-gamma function only has a single branch cut along the negative half-axis. The principal branch continuously matches the asymptotic Stirling expansion The real parts of both functions agree, but their imaginary parts generally differ by for some . They coincide for .

Computationally, it is advantageous to use loggamma() instead of gamma() for extremely large arguments.

Examples

Comparing with :

>>> from mpmath import *
>>> mp.dps = 25; mp.pretty = True
>>> loggamma('13.2'); log(gamma('13.2'))
20.49400419456603678498394
20.49400419456603678498394
>>> loggamma(3+4j)
(-1.756626784603784110530604 + 4.742664438034657928194889j)
>>> log(gamma(3+4j))
(-1.756626784603784110530604 - 1.540520869144928548730397j)
>>> log(gamma(3+4j)) + 2*pi*j
(-1.756626784603784110530604 + 4.742664438034657928194889j)


Note the imaginary parts for negative arguments:

>>> loggamma(-0.5); loggamma(-1.5); loggamma(-2.5)
(1.265512123484645396488946 - 3.141592653589793238462643j)
(0.8600470153764810145109327 - 6.283185307179586476925287j)
(-0.05624371649767405067259453 - 9.42477796076937971538793j)


Some special values:

>>> loggamma(1); loggamma(2)
0.0
0.0
>>> loggamma(3); +ln2
0.6931471805599453094172321
0.6931471805599453094172321
>>> loggamma(3.5); log(15*sqrt(pi)/8)
1.200973602347074224816022
1.200973602347074224816022
>>> loggamma(inf)
+inf


Huge arguments are permitted:

>>> loggamma('1e30')
6.807755278982137052053974e+31
>>> loggamma('1e300')
6.897755278982137052053974e+302
>>> loggamma('1e3000')
6.906755278982137052053974e+3003
>>> loggamma('1e100000000000000000000')
2.302585092994045684007991e+100000000000000000020
>>> loggamma('1e30j')
(-1.570796326794896619231322e+30 + 6.807755278982137052053974e+31j)
>>> loggamma('1e300j')
(-1.570796326794896619231322e+300 + 6.897755278982137052053974e+302j)
>>> loggamma('1e3000j')
(-1.570796326794896619231322e+3000 + 6.906755278982137052053974e+3003j)


The log-gamma function can be integrated analytically on any interval of unit length:

>>> z = 0
0.9189385332046727417803297
0.9189385332046727417803297
>>> z = 3+4j
>>> quad(loggamma, [z,z+1]); (log(z)-1)*z + log(2*pi)/2
(-0.9619286014994750641314421 + 5.219637303741238195688575j)
(-0.9619286014994750641314421 + 5.219637303741238195688575j)


The derivatives of the log-gamma function are given by the polygamma function (psi()):

>>> diff(loggamma, -4+3j); psi(0, -4+3j)
(1.688493531222971393607153 + 2.554898911356806978892748j)
(1.688493531222971393607153 + 2.554898911356806978892748j)
>>> diff(loggamma, -4+3j, 2); psi(1, -4+3j)
(-0.1539414829219882371561038 - 0.1020485197430267719746479j)
(-0.1539414829219882371561038 - 0.1020485197430267719746479j)


The log-gamma function satisfies an additive form of the recurrence relation for the ordinary gamma function:

>>> z = 2+3j
>>> loggamma(z); loggamma(z+1) - log(z)
(-2.092851753092733349564189 + 2.302396543466867626153708j)
(-2.092851753092733349564189 + 2.302396543466867626153708j)


Rising and falling factorials¶

rf()¶

mpmath.rf(x, n)

Computes the rising factorial or Pochhammer symbol, where the rightmost expression is valid for nonintegral .

Examples

For integral , the rising factorial is a polynomial:

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> for n in range(5):
...     nprint(taylor(lambda x: rf(x,n), 0, n))
...
[1.0]
[0.0, 1.0]
[0.0, 1.0, 1.0]
[0.0, 2.0, 3.0, 1.0]
[0.0, 6.0, 11.0, 6.0, 1.0]


Evaluation is supported for arbitrary arguments:

>>> rf(2+3j, 5.5)
(-7202.03920483347 - 3777.58810701527j)


ff()¶

mpmath.ff(x, n)

Computes the falling factorial, where the rightmost expression is valid for nonintegral .

Examples

For integral , the falling factorial is a polynomial:

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> for n in range(5):
...     nprint(taylor(lambda x: ff(x,n), 0, n))
...
[1.0]
[0.0, 1.0]
[0.0, -1.0, 1.0]
[0.0, 2.0, -3.0, 1.0]
[0.0, -6.0, 11.0, -6.0, 1.0]


Evaluation is supported for arbitrary arguments:

>>> ff(2+3j, 5.5)
(-720.41085888203 + 316.101124983878j)


Beta function¶

beta()¶

mpmath.beta(x, y)

Computes the beta function, . The beta function is also commonly defined by the integral representation Examples

For integer and half-integer arguments where all three gamma functions are finite, the beta function becomes either rational number or a rational multiple of :

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> beta(5, 2)
0.0333333333333333
>>> beta(1.5, 2)
0.266666666666667
>>> 16*beta(2.5, 1.5)
3.14159265358979


Where appropriate, beta() evaluates limits. A pole of the beta function is taken to result in +inf:

>>> beta(-0.5, 0.5)
0.0
>>> beta(-3, 3)
-0.333333333333333
>>> beta(-2, 3)
+inf
>>> beta(inf, 1)
0.0
>>> beta(inf, 0)
nan


beta() supports complex numbers and arbitrary precision evaluation:

>>> beta(1, 2+j)
(0.4 - 0.2j)
>>> mp.dps = 25
>>> beta(j,0.5)
(1.079424249270925780135675 - 1.410032405664160838288752j)
>>> mp.dps = 50
>>> beta(pi, e)
0.037890298781212201348153837138927165984170287886464


Various integrals can be computed by means of the beta function:

>>> mp.dps = 15
>>> quad(lambda t: t**2.5*(1-t)**2, [0, 1])
0.0230880230880231
>>> beta(3.5, 3)
0.0230880230880231
>>> quad(lambda t: sin(t)**4 * sqrt(cos(t)), [0, pi/2])
0.319504062596158
>>> beta(2.5, 0.75)/2
0.319504062596158


betainc()¶

mpmath.betainc(a, b, x1=0, x2=1, regularized=False)

betainc(a, b, x1=0, x2=1, regularized=False) gives the generalized incomplete beta function, When , this reduces to the ordinary (complete) beta function ; see beta().

With the keyword argument regularized=True, betainc() computes the regularized incomplete beta function . This is the cumulative distribution of the beta distribution with parameters , .

Examples

Verifying that betainc() computes the integral in the definition:

>>> from mpmath import *
>>> mp.dps = 25; mp.pretty = True
>>> x,y,a,b = 3, 4, 0, 6
>>> betainc(x, y, a, b)
-4010.4
>>> quad(lambda t: t**(x-1) * (1-t)**(y-1), [a, b])
-4010.4


The arguments may be arbitrary complex numbers:

>>> betainc(0.75, 1-4j, 0, 2+3j)
(0.2241657956955709603655887 + 0.3619619242700451992411724j)


With regularization:

>>> betainc(1, 2, 0, 0.25, regularized=True)
0.4375
>>> betainc(pi, e, 0, 1, regularized=True)   # Complete
1.0


The beta integral satisfies some simple argument transformation symmetries:

>>> mp.dps = 15
>>> betainc(2,3,4,5), -betainc(2,3,5,4), betainc(3,2,1-5,1-4)
(56.0833333333333, 56.0833333333333, 56.0833333333333)


The beta integral can often be evaluated analytically. For integer and rational arguments, the incomplete beta function typically reduces to a simple algebraic-logarithmic expression:

>>> mp.dps = 25
>>> identify(chop(betainc(0, 0, 3, 4)))
'-(log((9/8)))'
>>> identify(betainc(2, 3, 4, 5))
'(673/12)'
>>> identify(betainc(1.5, 1, 1, 2))
'((-12+sqrt(1152))/18)'


Super- and hyperfactorials¶

superfac()¶

mpmath.superfac(z)

Computes the superfactorial, defined as the product of consecutive factorials For general complex , is defined in terms of the Barnes G-function (see barnesg()).

Examples

The first few superfactorials are (OEIS A000178):

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> for n in range(10):
...     print n, superfac(n)
...
0 1.0
1 1.0
2 2.0
3 12.0
4 288.0
5 34560.0
6 24883200.0
7 125411328000.0
8 5.05658474496e+15
9 1.83493347225108e+21


Superfactorials grow very rapidly:

>>> superfac(1000)
3.24570818422368e+1177245
>>> superfac(10**10)
2.61398543581249e+467427913956904067453


Evaluation is supported for arbitrary arguments:

>>> mp.dps = 25
>>> superfac(pi)
17.20051550121297985285333
>>> superfac(2+3j)
(-0.005915485633199789627466468 + 0.008156449464604044948738263j)
>>> diff(superfac, 1)
0.2645072034016070205673056


References

hyperfac()¶

mpmath.hyperfac(z)

Computes the hyperfactorial, defined for integers as the product The hyperfactorial satisfies the recurrence formula . It can be defined more generally in terms of the Barnes G-function (see barnesg()) and the gamma function by the formula The extension to complex numbers can also be done via the integral representation Examples

The rapidly-growing sequence of hyperfactorials begins (OEIS A002109):

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> for n in range(10):
...     print n, hyperfac(n)
...
0 1.0
1 1.0
2 4.0
3 108.0
4 27648.0
5 86400000.0
6 4031078400000.0
7 3.3197663987712e+18
8 5.56964379417266e+25
9 2.15779412229419e+34


Some even larger hyperfactorials are:

>>> hyperfac(1000)
5.46458120882585e+1392926
>>> hyperfac(10**10)
4.60408207642219e+489142638002418704309


The hyperfactorial can be evaluated for arbitrary arguments:

>>> hyperfac(0.5)
0.880449235173423
>>> diff(hyperfac, 1)
0.581061466795327
>>> hyperfac(pi)
205.211134637462
>>> hyperfac(-10+1j)
(3.01144471378225e+46 - 2.45285242480185e+46j)


The recurrence property of the hyperfactorial holds generally:

>>> z = 3-4*j
>>> hyperfac(z)
(-4.49795891462086e-7 - 6.33262283196162e-7j)
>>> z**z * hyperfac(z-1)
(-4.49795891462086e-7 - 6.33262283196162e-7j)
>>> z = mpf(-0.6)
>>> chop(z**z * hyperfac(z-1))
1.28170142849352
>>> hyperfac(z)
1.28170142849352


The hyperfactorial may also be computed using the integral definition:

>>> z = 2.5
>>> hyperfac(z)
15.9842119922237
>>> (2*pi)**(-z/2)*exp(binomial(z+1,2) +
...     quad(lambda t: loggamma(t+1), [0, z]))
15.9842119922237


hyperfac() supports arbitrary-precision evaluation:

>>> mp.dps = 50
>>> hyperfac(10)
215779412229418562091680268288000000000000000.0
>>> hyperfac(1/sqrt(2))
0.89404818005227001975423476035729076375705084390942


References

barnesg()¶

mpmath.barnesg(z)

Evaluates the Barnes G-function, which generalizes the superfactorial (superfac()) and by extension also the hyperfactorial (hyperfac()) to the complex numbers in an analogous way to how the gamma function generalizes the ordinary factorial.

The Barnes G-function may be defined in terms of a Weierstrass product: For positive integers , we have have relation to superfactorials .

Examples

Some elementary values and limits of the Barnes G-function:

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> barnesg(1), barnesg(2), barnesg(3)
(1.0, 1.0, 1.0)
>>> barnesg(4)
2.0
>>> barnesg(5)
12.0
>>> barnesg(6)
288.0
>>> barnesg(7)
34560.0
>>> barnesg(8)
24883200.0
>>> barnesg(inf)
+inf
>>> barnesg(0), barnesg(-1), barnesg(-2)
(0.0, 0.0, 0.0)


Closed-form values are known for some rational arguments:

>>> barnesg('1/2')
0.603244281209446
>>> sqrt(exp(0.25+log(2)/12)/sqrt(pi)/glaisher**3)
0.603244281209446
>>> barnesg('1/4')
0.29375596533861
>>> nthroot(exp('3/8')/exp(catalan/pi)/
...      gamma(0.25)**3/sqrt(glaisher)**9, 4)
0.29375596533861


The Barnes G-function satisfies the functional equation :

>>> z = pi
>>> barnesg(z+1)
2.39292119327948
>>> gamma(z)*barnesg(z)
2.39292119327948


The asymptotic growth rate of the Barnes G-function is related to the Glaisher-Kinkelin constant:

>>> limit(lambda n: barnesg(n+1)/(n**(n**2/2-mpf(1)/12)*
...     (2*pi)**(n/2)*exp(-3*n**2/4)), inf)
0.847536694177301
>>> exp('1/12')/glaisher
0.847536694177301


The Barnes G-function can be differentiated in closed form:

>>> z = 3
>>> diff(barnesg, z)
0.264507203401607
>>> barnesg(z)*((z-1)*psi(0,z)-z+(log(2*pi)+1)/2)
0.264507203401607


Evaluation is supported for arbitrary arguments and at arbitrary precision:

>>> barnesg(6.5)
2548.7457695685
>>> barnesg(-pi)
0.00535976768353037
>>> barnesg(3+4j)
(-0.000676375932234244 - 4.42236140124728e-5j)
>>> mp.dps = 50
>>> barnesg(1/sqrt(2))
0.81305501090451340843586085064413533788206204124732
>>> q = barnesg(10j)
>>> q.real
0.000000000021852360840356557241543036724799812371995850552234
>>> q.imag
-0.00000000000070035335320062304849020654215545839053210041457588
>>> mp.dps = 15
>>> barnesg(100)
3.10361006263698e+6626
>>> barnesg(-101)
0.0
>>> barnesg(-10.5)
5.94463017605008e+25
>>> barnesg(-10000.5)
-6.14322868174828e+167480422
>>> barnesg(1000j)
(5.21133054865546e-1173597 + 4.27461836811016e-1173597j)
>>> barnesg(-1000+1000j)
(2.43114569750291e+1026623 + 2.24851410674842e+1026623j)


References

1. Whittaker & Watson, A Course of Modern Analysis, Cambridge University Press, 4th edition (1927), p.264
2. http://en.wikipedia.org/wiki/Barnes_G-function
3. http://mathworld.wolfram.com/BarnesG-Function.html

Polygamma functions and harmonic numbers¶

psi()/digamma()¶

mpmath.psi(m, z)

Gives the polygamma function of order of , . Special cases are known as the digamma function ( ), the trigamma function ( ), etc. The polygamma functions are defined as the logarithmic derivatives of the gamma function: In particular, . In the present implementation of psi(), the order must be a nonnegative integer, while the argument may be an arbitrary complex number (with exception for the polygamma function’s poles at ).

Examples

For various rational arguments, the polygamma function reduces to a combination of standard mathematical constants:

>>> from mpmath import *
>>> mp.dps = 25; mp.pretty = True
>>> psi(0, 1), -euler
(-0.5772156649015328606065121, -0.5772156649015328606065121)
>>> psi(1, '1/4'), pi**2+8*catalan
(17.19732915450711073927132, 17.19732915450711073927132)
>>> psi(2, '1/2'), -14*apery
(-16.82879664423431999559633, -16.82879664423431999559633)


The polygamma functions are derivatives of each other:

>>> diff(lambda x: psi(3, x), pi), psi(4, pi)
(-0.1105749312578862734526952, -0.1105749312578862734526952)
>>> quad(lambda x: psi(4, x), [2, 3]), psi(3,3)-psi(3,2)
(-0.375, -0.375)


The digamma function diverges logarithmically as , while higher orders tend to zero:

>>> psi(0,inf), psi(1,inf), psi(2,inf)
(+inf, 0.0, 0.0)


Evaluation for a complex argument:

>>> psi(2, -1-2j)
(0.03902435405364952654838445 + 0.1574325240413029954685366j)


Evaluation is supported for large orders and/or large arguments :

>>> psi(3, 10**100)
2.0e-300
>>> psi(250, 10**30+10**20*j)
(-1.293142504363642687204865e-7010 + 3.232856260909107391513108e-7018j)


Application to infinite series

Any infinite series where the summand is a rational function of the index can be evaluated in closed form in terms of polygamma functions of the roots and poles of the summand:

>>> a = sqrt(2)
>>> b = sqrt(3)
>>> nsum(lambda k: 1/((k+a)**2*(k+b)), [0, inf])
0.4049668927517857061917531
>>> (psi(0,a)-psi(0,b)-a*psi(1,a)+b*psi(1,a))/(a-b)**2
0.4049668927517857061917531


This follows from the series representation ( ) Since the roots of a polynomial may be complex, it is sometimes necessary to use the complex polygamma function to evaluate an entirely real-valued sum:

>>> nsum(lambda k: 1/(k**2-2*k+3), [0, inf])
1.694361433907061256154665
>>> nprint(polyroots([1,-2,3]))
[(1.0 - 1.41421j), (1.0 + 1.41421j)]
>>> r1 = 1-sqrt(2)*j
>>> r2 = r1.conjugate()
>>> (psi(0,-r2)-psi(0,-r1))/(r1-r2)
(1.694361433907061256154665 + 0.0j)

mpmath.digamma(z)
Shortcut for psi(0,z).

harmonic()¶

mpmath.harmonic(z)

If is an integer, harmonic(n) gives a floating-point approximation of the -th harmonic number , defined as The first few harmonic numbers are:

>>> from mpmath import *
>>> mp.dps = 15; mp.pretty = True
>>> for n in range(8):
...     print n, harmonic(n)
...
0 0.0
1 1.0
2 1.5
3 1.83333333333333
4 2.08333333333333
5 2.28333333333333
6 2.45
7 2.59285714285714


The infinite harmonic series diverges:

>>> harmonic(inf)
+inf


harmonic() is evaluated using the digamma function rather than by summing the harmonic series term by term. It can therefore be computed quickly for arbitrarily large , and even for nonintegral arguments:

>>> harmonic(10**100)
230.835724964306
>>> harmonic(0.5)
0.613705638880109
>>> harmonic(3+4j)
(2.24757548223494 + 0.850502209186044j)


harmonic() supports arbitrary precision evaluation:

>>> mp.dps = 50
>>> harmonic(11)
3.0198773448773448773448773448773448773448773448773
>>> harmonic(pi)
1.8727388590273302654363491032336134987519132374152


The harmonic series diverges, but at a glacial pace. It is possible to calculate the exact number of terms required before the sum exceeds a given amount, say 100:

>>> mp.dps = 50
>>> v = 10**findroot(lambda x: harmonic(10**x) - 100, 10)
>>> v
15092688622113788323693563264538101449859496.864101
>>> v = int(ceil(v))
>>> print v
15092688622113788323693563264538101449859497
>>> harmonic(v-1)
99.999999999999999999999999999999999999999999942747
>>> harmonic(v)
100.000000000000000000000000000000000000000000009