English
Source / code snippets

complex Gammafunktion

 

p.specht

During previous Gammafunktions-programs only whom positive Wertebereich abdeckten, weg here too negatives values, what To complex numbers as Ergebnnis lead. Zahlentheoretisch momentous!
'**************************************************************
Window Title "Calculate Function gamma & Ln(gamma) with complex arguments"
'(D)2017-04 demonstration for Fortran>Basic>XProfan-11 by P.woodpecker, Vienna/Austria
'Q: https://jean-pierre.moreau.pagesperso-orange.fr/Basic/mcgama_bas.txt
Window Style 24:Window 0,0-%maxx,%maxy:showmax:set("Decimals",11)
'* ---------------------------------------------------------- *
'* Purpose: Diese program computes the gamma function G(z)     *
'*          or Complex Ln[G(z)] for a complex argument using  *
'*          subroutine CGAMA                                  *
'* Input :  x  --- real part of z                             *
'*          y  --- Imaginary part of z                        *
'*          KF --- Function code:                             *
'*          KF=0 for Ln[G(z)]                                 *
'*          KF=1 for G(z)                                     *
'* output:  GR --- real part of Ln[G(z)] or G(z)              *
'*          GI --- Imaginary part of Ln[G(z)] or G(z)         *
'* Examples:                                                  *
'*    x         y           Re[G(z)]           in the[G(z)]       *
'*  --------------------------------------------------------  *
'*   2.50      5.00     .2267360319E-01    -.1172284404E-01   *
'*   5.00     10.00     .1327696517E-01     .3639011746E-02   *
'*   2.50     -5.00     .2267360319E-01     .1172284404E-01   *
'*   5.00    -10.00     .1327696517E-01    -.3639011746E-02   *
'*                                                            *
'*    x         y          Re[LnG(z)]         in the[LnG(z)]      *
'*  --------------------------------------------------------  *
'*   2.50      5.00    -.3668103262E+01     .5806009801E+01   *
'*   5.00     10.00    -.4285507444E+01     .1911707090E+02   *
'*   2.50     -5.00    -.3668103262E+01    -.5806009801E+01   *
'*   5.00    -10.00    -.4285507444E+01    -.1911707090E+02   *
'* ---------------------------------------------------------- *
'* SAMPLE RUNS:                                               *
'* Please enter KF, x and y: 1, 2.5,5                         *
'*    x    y          Re[G(z)]             in the[G(z)]           *
'*  --------------------------------------------------------  *
'*   2.5   5    2.267360318980015e-02  -1.172284404171513e-02 *
'*                                                            *
'* Please enter KF, x and y: 0, 2.5,5                          *
'*    x    y         Re[LnG(z)]           in the[LnG(z)]          *
'*  --------------------------------------------------------  *
'*   2.5   5   -3.66810326235451        5.806009800636287     *
'* ---------------------------------------------------------- *
'*    "Fortran Routines for Computation of Special Functions, *
'*     jin.ece.uiuc.edu/routines/routines.html".              *
'*                   QuickBasic Release By J-P Moreau, Paris. *
'*                                (www.jpmoreau.fr)           *
'**************************************************************
declare x!,y!,KF&,expx!,GR!,GI!, SINH!,COSH!
'... and subroutine GAMMA:
declare A![10],G0!,GR1!,GI1!,SR!,SI!,T!,TH!,TH1!,TH2!,x0!,X1!,Y1!,Z1!,Z2!,PI!,J&,K&,NA&
CLS
MAIN:
PRINT "\n  Please enter Flag [1=Gamma(),0=Ln(gamma())], Re(z), in the(z): "
locate %csrlin+1,5: INPUT KF&
locate %csrlin-1,25:input X!
locate %csrlin-1,50:input Y!
PRINT

IF KF& = 1

    PRINT "    x                   y              Re[G(z)]                  in the[G(z)]"

ELSE

    PRINT "    x                   y              Re[LnG(z)]               in the[LnG(z)]"

ENDIF

PRINT "   ---------------------------------------------------------------------------------"
CGAMA'(X!,Y!,KF&,GR!,GI!) '= GOSUB 1000 'call CGAMA(X,Y,KF,GR,GI)
PRINT tab(5);stature$("%g",x!),tab(25);stature$("%g",Y!),tab(40);stature$("%g",GR!),tab(65);stature$("%g",GI!)
PRINT
Goto "Main"
END'of Main Program
'Auxiliary functions
'500:
'Function SINH(xx)

proc sinh :parameters xx!

    expx! = EXP(xx!)
    SINH! = 0.5 * (expx! - 1 / expx!)
    'RETURN

endproc

'600:
'Function COSH(xx)

proc cosh :parameters xx!

    expx! = EXP(xx!)
    COSH! = .5 * (expx! + 1 / expx!)
    'RETURN

endproc

'1000:
'Subroutine CGAMA '(X,Y,KF,GR,GI)

PROC CGAMA

    ' ===========================================================
    '       Purpose: Compute the gamma function G(z) or Ln[G(z)]
    '                for a complex argument
    '       Input :  x  --- real part of z
    '                y  --- Imaginary part of z
    '                KF --- Function code:
    '                       KF=0 for Ln[G(z)]
    '                       KF=1 for G(z)
    '       output:  GR --- real part of Ln[G(z)] or G(z)
    '                GI --- Imaginary part of Ln[G(z)] or G(z)
    ' ===========================================================
    ':::DECLARE A![10] 'DIM A(10)
    ':::DECLARE G0!,GR1!,GI1!,SR!,SI!,T!,TH!,TH1!,TH2!,x0!,X1!,Y1!,Z1!,Z2!,PI!
    ':::DECLARE J&,K&,NA&  '(any to Main lifted for GLOBAL declare)
    PI! = 4 * ArcTaN(1)
    'Initialize table A
    A![1] = 8.333333333333333*10^-2: A![2] = -2.777777777777778*10^-3
    A![3] = 7.936507936507937*10^-4: A![4] = -5.952380952380952*10^-4
    A![5] = 8.417508417508418*10^-4: A![6] = -1.917526917526918*10^-3
    A![7] = 6.41025641025641*10^-3 : A![8] = -2.955065359477124*10^-2
    A![9] = 0.1796443723688307     : A![10]= -1.3924322169059

    IF (Y! = 0) AND (X! = INT(X!)) AND (X! <= 0)

        GR! = 1E30'arbitrary big number
        GI! = 0
        RETURN

    ELSEIF X! < 0

        X1! = X!
        Y1! = Y!
        X! = -X!
        Y! = -Y!

    ENDIF

    X0! = X!

    IF X! <= 7

        NA& = INT(7 - X!)
        X0! = X! + NA&

    ENDIF

    Z1! = SQRt(X0! * X0! + Y! * Y!)
    TH! = ArcTaN(Y! / X0!)
    GR! = (X0! - 0.5) * Ln(Z1!) - TH! * Y! - X0! + 0.5 * Ln(2 * PI!)
    GI! = TH! * (X0! - 0.5) + Y! * Ln(Z1!) - Y!
    'FOR K& = 1 TO 10

    whileloop 10:k&=&Loop

        T! = Z1! ^ (1 - 2 * K&)
        GR! = GR! + A![K&] * T! * COS((2 * K& - 1) * TH!)
        GI! = GI! - A![K&] * T! * SIN((2 * K& - 1) * TH!)
        'NEXT k

    endwhile

    IF X! <= 7'THEN

        GR1! = 0
        GI1! = 0
        'FOR J = 0 TO NA - 1

        whileloop 0,na&-1:J&=&Loop

            GR1! = GR1! + 0.5 * Ln((X! + J&) ^ 2 + Y! * Y!)
            GI1! = GI1! + ArcTaN(Y! / (X! + J&))
            'NEXT J

        endwhile

        GR! = GR! - GR1!
        GI! = GI! - GI1!

    ENDIF

    IF X1! < 0'THEN

        Z1! = SQRt(X! * X! + Y! * Y!)
        TH1! = ArcTaN(Y! / X!)
        xx! = PI! * Y!
        ::: sinh(xx!)'= GOSUB 500
        ::: cosh(xx!)'= GOSUB 600
        SR! = -SIN(PI! * X!) * COSH!
        SI! = -COS(PI! * X!) * SINH!
        Z2! = SQRt(SR! * SR! + SI! * SI!)
        TH2! = ArcTaN(SI! / SR!)
        case SR! < 0: TH2! = PI! + TH2!
        GR! = Ln(PI! / (Z1! * Z2!)) - GR!
        GI! = -TH1! - TH2! - GI!
        X! = X1!
        Y! = Y1!

    ENDIF

    IF KF& = 1'THEN

        G0! = EXP(GR!)
        GR! = G0! * COS(GI!)
        GI! = G0! * SIN(GI!)

    ENDIF

    'RETURN

ENDPROC

'end of file mcgama.prf
 
XProfan 11
Computer: Gerät, daß es in Mikrosekunden erlaubt, 50.000 Fehler zu machen, zB 'daß' statt 'das'...
05/24/21  
 



Zum Quelltext


Topictitle, max. 100 characters.
 

Systemprofile:

no Systemprofil laid out. [anlegen]

XProfan:

 Posting  Font  Smilies  ▼ 

Please register circa a Posting To verfassen.
 

Topic-Options

1.353 Views

Untitledvor 0 min.
Erhard Wirth06/14/24
p.specht11/20/21
Uwe Lang11/20/21
Manfred Barei11/19/21
More...

Themeninformationen

this Topic has 1 subscriber:

p.specht (1x)


Admins  |  AGB  |  Applications  |  Authors  |  Chat  |  Privacy Policy  |  Download  |  Entrance  |  Help  |  Merchantportal  |  Imprint  |  Mart  |  Interfaces  |  SDK  |  Services  |  Games  |  Search  |  Support

One proposition all XProfan, The there's!


My XProfan
Private Messages
Own Storage Forum
Topics-Remember-List
Own Posts
Own Topics
Clipboard
Log off
 Deutsch English Français Español Italia
Translations

Privacy Policy


we use Cookies only as Session-Cookies because of the technical necessity and with us there no Cookies of Drittanbietern.

If you here on our Website click or navigate, stimmst You ours registration of Information in our Cookies on XProfan.Net To.

further Information To our Cookies and moreover, How You The control above keep, find You in ours nachfolgenden Datenschutzerklärung.


all rightDatenschutzerklärung
i want none Cookie