/* ellpjf.c * * Jacobian Elliptic Functions * * * * SYNOPSIS: * * float u, m, sn, cn, dn, phi; * int ellpj(); * * ellpj( u, m, _&sn, _&cn, _&dn, _&phi ); * * * * DESCRIPTION: * * * Evaluates the Jacobian elliptic functions sn(u|m), cn(u|m), * and dn(u|m) of parameter m between 0 and 1, and real * argument u. * * These functions are periodic, with quarter-period on the * real axis equal to the complete elliptic integral * ellpk(1.0-m). * * Relation to incomplete elliptic integral: * If u = ellik(phi,m), then sn(u|m) = sin(phi), * and cn(u|m) = cos(phi). Phi is called the amplitude of u. * * Computation is by means of the arithmetic-geometric mean * algorithm, except when m is within 1e-9 of 0 or 1. In the * latter case with m close to 1, the approximation applies * only for phi < pi/2. * * ACCURACY: * * Tested at random points with u between 0 and 10, m between * 0 and 1. * * Absolute error (* = relative error): * arithmetic function # trials peak rms * IEEE sn 10000 1.7e-6 2.2e-7 * IEEE cn 10000 1.6e-6 2.2e-7 * IEEE dn 10000 1.4e-3 1.9e-5 * IEEE phi 10000 3.9e-7* 6.7e-8* * * Peak error observed in consistency check using addition * theorem for sn(u+v) was 4e-16 (absolute). Also tested by * the above relation to the incomplete elliptic integral. * Accuracy deteriorates when u is large. * */ /* ellpj.c */ /* Cephes Math Library Release 2.2: July, 1992 Copyright 1984, 1987, 1992 by Stephen L. Moshier Direct inquiries to 30 Frost Street, Cambridge, MA 02140 */ #include extern float PIO2F, MACHEPF; #define fabsf(x) ( (x) < 0 ? -(x) : (x) ) #ifdef ANSIC float sqrtf(float), sinf(float), cosf(float), asinf(float), tanhf(float); float sinhf(float), coshf(float), atanf(float), expf(float); #else float sqrtf(), sinf(), cosf(), asinf(), tanhf(); float sinhf(), coshf(), atanf(), expf(); #endif int ellpjf( float uu, float mm, float *sn, float *cn, float *dn, float *ph ) { float u, m, ai, b, phi, t, twon; float a[10], c[10]; int i; u = uu; m = mm; /* Check for special cases */ if( m < 0.0 || m > 1.0 ) { mtherr( "ellpjf", DOMAIN ); return(-1); } if( m < 1.0e-5 ) { t = sinf(u); b = cosf(u); ai = 0.25 * m * (u - t*b); *sn = t - ai*b; *cn = b + ai*t; *ph = u - ai; *dn = 1.0 - 0.5*m*t*t; return(0); } if( m >= 0.99999 ) { ai = 0.25 * (1.0-m); b = coshf(u); t = tanhf(u); phi = 1.0/b; twon = b * sinhf(u); *sn = t + ai * (twon - u)/(b*b); *ph = 2.0*atanf(expf(u)) - PIO2F + ai*(twon - u)/b; ai *= t * phi; *cn = phi - ai * (twon - u); *dn = phi + ai * (twon + u); return(0); } /* A. G. M. scale */ a[0] = 1.0; b = sqrtf(1.0 - m); c[0] = sqrtf(m); twon = 1.0; i = 0; while( fabsf( (c[i]/a[i]) ) > MACHEPF ) { if( i > 8 ) { /* mtherr( "ellpjf", OVERFLOW );*/ break; } ai = a[i]; ++i; c[i] = 0.5 * ( ai - b ); t = sqrtf( ai * b ); a[i] = 0.5 * ( ai + b ); b = t; twon += twon; } /* backward recurrence */ phi = twon * a[i] * u; do { t = c[i] * sinf(phi) / a[i]; b = phi; phi = 0.5 * (asinf(t) + phi); } while( --i ); *sn = sinf(phi); t = cosf(phi); *cn = t; *dn = t/cosf(phi-b); *ph = phi; return(0); }