third_party/gmp/demos/qcn.c - RealtimeRoboticsGroup/test - Gitiles

 /* Use mpz_kronecker_ui() to calculate an estimate for the quadratic
    class number h(d), for a given negative fundamental discriminant, using
    Dirichlet's analytic formula.

 Copyright 1999-2002 Free Software Foundation, Inc.

 This file is part of the GNU MP Library.

 This program is free software; you can redistribute it and/or modify it
 under the terms of the GNU General Public License as published by the Free
 Software Foundation; either version 3 of the License, or (at your option)
 any later version.

 This program is distributed in the hope that it will be useful, but WITHOUT
 ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or
 FITNESS FOR A PARTICULAR PURPOSE.  See the GNU General Public License for
 more details.

 You should have received a copy of the GNU General Public License along with
 this program.  If not, see https://www.gnu.org/licenses/.  */


 /* Usage: qcn [-p limit] <discriminant>...

    A fundamental discriminant means one of the form D or 4*D with D
    square-free.  Each argument is checked to see it's congruent to 0 or 1
    mod 4 (as all discriminants must be), and that it's negative, but there's
    no check on D being square-free.

    This program is a bit of a toy, there are better methods for calculating
    the class number and class group structure.

    Reference:

    Daniel Shanks, "Class Number, A Theory of Factorization, and Genera",
    Proc. Symp. Pure Math., vol 20, 1970, pages 415-440.

 */

 #include <math.h>
 #include <stdio.h>
 #include <stdlib.h>
 #include <string.h>

 #include "gmp.h"

 #ifndef M_PI
 #define M_PI  3.14159265358979323846
 #endif


 /* A simple but slow primality test.  */
 int
 prime_p (unsigned long n)
 {
   unsigned long  i, limit;

   if (n == 2)
     return 1;
   if (n < 2 || !(n&1))
     return 0;

   limit = (unsigned long) floor (sqrt ((double) n));
   for (i = 3; i <= limit; i+=2)
     if ((n % i) == 0)
       return 0;

   return 1;
 }


 /* The formula is as follows, with d < 0.

 	       w * sqrt(-d)      inf      p
 	h(d) = ------------ *  product --------
 		  2 * pi         p=2   p - (d/p)


    (d/p) is the Kronecker symbol and the product is over primes p.  w is 6
    when d=-3, 4 when d=-4, or 2 otherwise.

    Calculating the product up to p=infinity would take a long time, so for
    the estimate primes up to 132,000 are used.  Shanks found this giving an
    accuracy of about 1 part in 1000, in normal cases.  */

 unsigned long  p_limit = 132000;

 double
 qcn_estimate (mpz_t d)
 {
   double  h;
   unsigned long  p;

   /* p=2 */
   h = sqrt (-mpz_get_d (d)) / M_PI
     * 2.0 / (2.0 - mpz_kronecker_ui (d, 2));

   if (mpz_cmp_si (d, -3) == 0)       h *= 3;
   else if (mpz_cmp_si (d, -4) == 0)  h *= 2;

   for (p = 3; p <= p_limit; p += 2)
     if (prime_p (p))
       h *= (double) p / (double) (p - mpz_kronecker_ui (d, p));

   return h;
 }


 void
 qcn_str (char *num)
 {
   mpz_t  z;

   mpz_init_set_str (z, num, 0);

   if (mpz_sgn (z) >= 0)
     {
       mpz_out_str (stdout, 0, z);
       printf (" is not supported (negatives only)\n");
     }
   else if (mpz_fdiv_ui (z, 4) != 0 && mpz_fdiv_ui (z, 4) != 1)
     {
       mpz_out_str (stdout, 0, z);
       printf (" is not a discriminant (must == 0 or 1 mod 4)\n");
     }
   else
     {
       printf ("h(");
       mpz_out_str (stdout, 0, z);
       printf (") approx %.1f\n", qcn_estimate (z));
     }
   mpz_clear (z);
 }


 int
 main (int argc, char *argv[])
 {
   int  i;
   int  saw_number = 0;

   for (i = 1; i < argc; i++)
     {
       if (strcmp (argv[i], "-p") == 0)
 	{
 	  i++;
 	  if (i >= argc)
 	    {
 	      fprintf (stderr, "Missing argument to -p\n");
 	      exit (1);
 	    }
 	  p_limit = atoi (argv[i]);
 	}
       else
 	{
 	  qcn_str (argv[i]);
 	  saw_number = 1;
 	}
     }

   if (! saw_number)
     {
       /* some default output */
       qcn_str ("-85702502803");           /* is 16259   */
       qcn_str ("-328878692999");          /* is 1499699 */
       qcn_str ("-928185925902146563");    /* is 52739552 */
       qcn_str ("-84148631888752647283");  /* is 496652272 */
       return 0;
     }

   return 0;
 }
	/* Use mpz_kronecker_ui() to calculate an estimate for the quadratic
	class number h(d), for a given negative fundamental discriminant, using
	Dirichlet's analytic formula.

	Copyright 1999-2002 Free Software Foundation, Inc.

	This file is part of the GNU MP Library.

	This program is free software; you can redistribute it and/or modify it
	under the terms of the GNU General Public License as published by the Free
	Software Foundation; either version 3 of the License, or (at your option)
	any later version.

	This program is distributed in the hope that it will be useful, but WITHOUT
	ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or
	FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License for
	more details.

	You should have received a copy of the GNU General Public License along with
	this program. If not, see https://www.gnu.org/licenses/. */


	/* Usage: qcn [-p limit] <discriminant>...

	A fundamental discriminant means one of the form D or 4*D with D
	square-free. Each argument is checked to see it's congruent to 0 or 1
	mod 4 (as all discriminants must be), and that it's negative, but there's
	no check on D being square-free.

	This program is a bit of a toy, there are better methods for calculating
	the class number and class group structure.

	Reference:

	Daniel Shanks, "Class Number, A Theory of Factorization, and Genera",
	Proc. Symp. Pure Math., vol 20, 1970, pages 415-440.

	*/

	#include <math.h>
	#include <stdio.h>
	#include <stdlib.h>
	#include <string.h>

	#include "gmp.h"

	#ifndef M_PI
	#define M_PI 3.14159265358979323846
	#endif


	/* A simple but slow primality test. */
	int
	prime_p (unsigned long n)
	{
	unsigned long i, limit;

	if (n == 2)
	return 1;
	if (n < 2 \|\| !(n&1))
	return 0;

	limit = (unsigned long) floor (sqrt ((double) n));
	for (i = 3; i <= limit; i+=2)
	if ((n % i) == 0)
	return 0;

	return 1;
	}


	/* The formula is as follows, with d < 0.

	w * sqrt(-d) inf p
	h(d) = ------------ * product --------
	2 * pi p=2 p - (d/p)


	(d/p) is the Kronecker symbol and the product is over primes p. w is 6
	when d=-3, 4 when d=-4, or 2 otherwise.

	Calculating the product up to p=infinity would take a long time, so for
	the estimate primes up to 132,000 are used. Shanks found this giving an
	accuracy of about 1 part in 1000, in normal cases. */

	unsigned long p_limit = 132000;

	double
	qcn_estimate (mpz_t d)
	{
	double h;
	unsigned long p;

	/* p=2 */
	h = sqrt (-mpz_get_d (d)) / M_PI
	* 2.0 / (2.0 - mpz_kronecker_ui (d, 2));

	if (mpz_cmp_si (d, -3) == 0) h *= 3;
	else if (mpz_cmp_si (d, -4) == 0) h *= 2;

	for (p = 3; p <= p_limit; p += 2)
	if (prime_p (p))
	h *= (double) p / (double) (p - mpz_kronecker_ui (d, p));

	return h;
	}


	void
	qcn_str (char *num)
	{
	mpz_t z;

	mpz_init_set_str (z, num, 0);

	if (mpz_sgn (z) >= 0)
	{
	mpz_out_str (stdout, 0, z);
	printf (" is not supported (negatives only)\n");
	}
	else if (mpz_fdiv_ui (z, 4) != 0 && mpz_fdiv_ui (z, 4) != 1)
	{
	mpz_out_str (stdout, 0, z);
	printf (" is not a discriminant (must == 0 or 1 mod 4)\n");
	}
	else
	{
	printf ("h(");
	mpz_out_str (stdout, 0, z);
	printf (") approx %.1f\n", qcn_estimate (z));
	}
	mpz_clear (z);
	}


	int
	main (int argc, char *argv[])
	{
	int i;
	int saw_number = 0;

	for (i = 1; i < argc; i++)
	{
	if (strcmp (argv[i], "-p") == 0)
	{
	i++;
	if (i >= argc)
	{
	fprintf (stderr, "Missing argument to -p\n");
	exit (1);
	}
	p_limit = atoi (argv[i]);
	}
	else
	{
	qcn_str (argv[i]);
	saw_number = 1;
	}
	}

	if (! saw_number)
	{
	/* some default output */
	qcn_str ("-85702502803"); /* is 16259 */
	qcn_str ("-328878692999"); /* is 1499699 */
	qcn_str ("-928185925902146563"); /* is 52739552 */
	qcn_str ("-84148631888752647283"); /* is 496652272 */
	return 0;
	}

	return 0;
	}