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| from .functions import defun, defun_wrapped | |
| def j0(ctx, x): | |
| """Computes the Bessel function `J_0(x)`. See :func:`~mpmath.besselj`.""" | |
| return ctx.besselj(0, x) | |
| def j1(ctx, x): | |
| """Computes the Bessel function `J_1(x)`. See :func:`~mpmath.besselj`.""" | |
| return ctx.besselj(1, x) | |
| def besselj(ctx, n, z, derivative=0, **kwargs): | |
| if type(n) is int: | |
| n_isint = True | |
| else: | |
| n = ctx.convert(n) | |
| n_isint = ctx.isint(n) | |
| if n_isint: | |
| n = int(ctx._re(n)) | |
| if n_isint and n < 0: | |
| return (-1)**n * ctx.besselj(-n, z, derivative, **kwargs) | |
| z = ctx.convert(z) | |
| M = ctx.mag(z) | |
| if derivative: | |
| d = ctx.convert(derivative) | |
| # TODO: the integer special-casing shouldn't be necessary. | |
| # However, the hypergeometric series gets inaccurate for large d | |
| # because of inaccurate pole cancellation at a pole far from | |
| # zero (needs to be fixed in hypercomb or hypsum) | |
| if ctx.isint(d) and d >= 0: | |
| d = int(d) | |
| orig = ctx.prec | |
| try: | |
| ctx.prec += 15 | |
| v = ctx.fsum((-1)**k * ctx.binomial(d,k) * ctx.besselj(2*k+n-d,z) | |
| for k in range(d+1)) | |
| finally: | |
| ctx.prec = orig | |
| v *= ctx.mpf(2)**(-d) | |
| else: | |
| def h(n,d): | |
| r = ctx.fmul(ctx.fmul(z, z, prec=ctx.prec+M), -0.25, exact=True) | |
| B = [0.5*(n-d+1), 0.5*(n-d+2)] | |
| T = [([2,ctx.pi,z],[d-2*n,0.5,n-d],[],B,[(n+1)*0.5,(n+2)*0.5],B+[n+1],r)] | |
| return T | |
| v = ctx.hypercomb(h, [n,d], **kwargs) | |
| else: | |
| # Fast case: J_n(x), n int, appropriate magnitude for fixed-point calculation | |
| if (not derivative) and n_isint and abs(M) < 10 and abs(n) < 20: | |
| try: | |
| return ctx._besselj(n, z) | |
| except NotImplementedError: | |
| pass | |
| if not z: | |
| if not n: | |
| v = ctx.one + n+z | |
| elif ctx.re(n) > 0: | |
| v = n*z | |
| else: | |
| v = ctx.inf + z + n | |
| else: | |
| #v = 0 | |
| orig = ctx.prec | |
| try: | |
| # XXX: workaround for accuracy in low level hypergeometric series | |
| # when alternating, large arguments | |
| ctx.prec += min(3*abs(M), ctx.prec) | |
| w = ctx.fmul(z, 0.5, exact=True) | |
| def h(n): | |
| r = ctx.fneg(ctx.fmul(w, w, prec=max(0,ctx.prec+M)), exact=True) | |
| return [([w], [n], [], [n+1], [], [n+1], r)] | |
| v = ctx.hypercomb(h, [n], **kwargs) | |
| finally: | |
| ctx.prec = orig | |
| v = +v | |
| return v | |
| def besseli(ctx, n, z, derivative=0, **kwargs): | |
| n = ctx.convert(n) | |
| z = ctx.convert(z) | |
| if not z: | |
| if derivative: | |
| raise ValueError | |
| if not n: | |
| # I(0,0) = 1 | |
| return 1+n+z | |
| if ctx.isint(n): | |
| return 0*(n+z) | |
| r = ctx.re(n) | |
| if r == 0: | |
| return ctx.nan*(n+z) | |
| elif r > 0: | |
| return 0*(n+z) | |
| else: | |
| return ctx.inf+(n+z) | |
| M = ctx.mag(z) | |
| if derivative: | |
| d = ctx.convert(derivative) | |
| def h(n,d): | |
| r = ctx.fmul(ctx.fmul(z, z, prec=ctx.prec+M), 0.25, exact=True) | |
| B = [0.5*(n-d+1), 0.5*(n-d+2), n+1] | |
| T = [([2,ctx.pi,z],[d-2*n,0.5,n-d],[n+1],B,[(n+1)*0.5,(n+2)*0.5],B,r)] | |
| return T | |
| v = ctx.hypercomb(h, [n,d], **kwargs) | |
| else: | |
| def h(n): | |
| w = ctx.fmul(z, 0.5, exact=True) | |
| r = ctx.fmul(w, w, prec=max(0,ctx.prec+M)) | |
| return [([w], [n], [], [n+1], [], [n+1], r)] | |
| v = ctx.hypercomb(h, [n], **kwargs) | |
| return v | |
| def bessely(ctx, n, z, derivative=0, **kwargs): | |
| if not z: | |
| if derivative: | |
| # Not implemented | |
| raise ValueError | |
| if not n: | |
| # ~ log(z/2) | |
| return -ctx.inf + (n+z) | |
| if ctx.im(n): | |
| return ctx.nan * (n+z) | |
| r = ctx.re(n) | |
| q = n+0.5 | |
| if ctx.isint(q): | |
| if n > 0: | |
| return -ctx.inf + (n+z) | |
| else: | |
| return 0 * (n+z) | |
| if r < 0 and int(ctx.floor(q)) % 2: | |
| return ctx.inf + (n+z) | |
| else: | |
| return ctx.ninf + (n+z) | |
| # XXX: use hypercomb | |
| ctx.prec += 10 | |
| m, d = ctx.nint_distance(n) | |
| if d < -ctx.prec: | |
| h = +ctx.eps | |
| ctx.prec *= 2 | |
| n += h | |
| elif d < 0: | |
| ctx.prec -= d | |
| # TODO: avoid cancellation for imaginary arguments | |
| cos, sin = ctx.cospi_sinpi(n) | |
| return (ctx.besselj(n,z,derivative,**kwargs)*cos - \ | |
| ctx.besselj(-n,z,derivative,**kwargs))/sin | |
| def besselk(ctx, n, z, **kwargs): | |
| if not z: | |
| return ctx.inf | |
| M = ctx.mag(z) | |
| if M < 1: | |
| # Represent as limit definition | |
| def h(n): | |
| r = (z/2)**2 | |
| T1 = [z, 2], [-n, n-1], [n], [], [], [1-n], r | |
| T2 = [z, 2], [n, -n-1], [-n], [], [], [1+n], r | |
| return T1, T2 | |
| # We could use the limit definition always, but it leads | |
| # to very bad cancellation (of exponentially large terms) | |
| # for large real z | |
| # Instead represent in terms of 2F0 | |
| else: | |
| ctx.prec += M | |
| def h(n): | |
| return [([ctx.pi/2, z, ctx.exp(-z)], [0.5,-0.5,1], [], [], \ | |
| [n+0.5, 0.5-n], [], -1/(2*z))] | |
| return ctx.hypercomb(h, [n], **kwargs) | |
| def hankel1(ctx,n,x,**kwargs): | |
| return ctx.besselj(n,x,**kwargs) + ctx.j*ctx.bessely(n,x,**kwargs) | |
| def hankel2(ctx,n,x,**kwargs): | |
| return ctx.besselj(n,x,**kwargs) - ctx.j*ctx.bessely(n,x,**kwargs) | |
| def whitm(ctx,k,m,z,**kwargs): | |
| if z == 0: | |
| # M(k,m,z) = 0^(1/2+m) | |
| if ctx.re(m) > -0.5: | |
| return z | |
| elif ctx.re(m) < -0.5: | |
| return ctx.inf + z | |
| else: | |
| return ctx.nan * z | |
| x = ctx.fmul(-0.5, z, exact=True) | |
| y = 0.5+m | |
| return ctx.exp(x) * z**y * ctx.hyp1f1(y-k, 1+2*m, z, **kwargs) | |
| def whitw(ctx,k,m,z,**kwargs): | |
| if z == 0: | |
| g = abs(ctx.re(m)) | |
| if g < 0.5: | |
| return z | |
| elif g > 0.5: | |
| return ctx.inf + z | |
| else: | |
| return ctx.nan * z | |
| x = ctx.fmul(-0.5, z, exact=True) | |
| y = 0.5+m | |
| return ctx.exp(x) * z**y * ctx.hyperu(y-k, 1+2*m, z, **kwargs) | |
| def hyperu(ctx, a, b, z, **kwargs): | |
| a, atype = ctx._convert_param(a) | |
| b, btype = ctx._convert_param(b) | |
| z = ctx.convert(z) | |
| if not z: | |
| if ctx.re(b) <= 1: | |
| return ctx.gammaprod([1-b],[a-b+1]) | |
| else: | |
| return ctx.inf + z | |
| bb = 1+a-b | |
| bb, bbtype = ctx._convert_param(bb) | |
| try: | |
| orig = ctx.prec | |
| try: | |
| ctx.prec += 10 | |
| v = ctx.hypsum(2, 0, (atype, bbtype), [a, bb], -1/z, maxterms=ctx.prec) | |
| return v / z**a | |
| finally: | |
| ctx.prec = orig | |
| except ctx.NoConvergence: | |
| pass | |
| def h(a,b): | |
| w = ctx.sinpi(b) | |
| T1 = ([ctx.pi,w],[1,-1],[],[a-b+1,b],[a],[b],z) | |
| T2 = ([-ctx.pi,w,z],[1,-1,1-b],[],[a,2-b],[a-b+1],[2-b],z) | |
| return T1, T2 | |
| return ctx.hypercomb(h, [a,b], **kwargs) | |
| def struveh(ctx,n,z, **kwargs): | |
| n = ctx.convert(n) | |
| z = ctx.convert(z) | |
| # http://functions.wolfram.com/Bessel-TypeFunctions/StruveH/26/01/02/ | |
| def h(n): | |
| return [([z/2, 0.5*ctx.sqrt(ctx.pi)], [n+1, -1], [], [n+1.5], [1], [1.5, n+1.5], -(z/2)**2)] | |
| return ctx.hypercomb(h, [n], **kwargs) | |
| def struvel(ctx,n,z, **kwargs): | |
| n = ctx.convert(n) | |
| z = ctx.convert(z) | |
| # http://functions.wolfram.com/Bessel-TypeFunctions/StruveL/26/01/02/ | |
| def h(n): | |
| return [([z/2, 0.5*ctx.sqrt(ctx.pi)], [n+1, -1], [], [n+1.5], [1], [1.5, n+1.5], (z/2)**2)] | |
| return ctx.hypercomb(h, [n], **kwargs) | |
| def _anger(ctx,which,v,z,**kwargs): | |
| v = ctx._convert_param(v)[0] | |
| z = ctx.convert(z) | |
| def h(v): | |
| b = ctx.mpq_1_2 | |
| u = v*b | |
| m = b*3 | |
| a1,a2,b1,b2 = m-u, m+u, 1-u, 1+u | |
| c, s = ctx.cospi_sinpi(u) | |
| if which == 0: | |
| A, B = [b*z, s], [c] | |
| if which == 1: | |
| A, B = [b*z, -c], [s] | |
| w = ctx.square_exp_arg(z, mult=-0.25) | |
| T1 = A, [1, 1], [], [a1,a2], [1], [a1,a2], w | |
| T2 = B, [1], [], [b1,b2], [1], [b1,b2], w | |
| return T1, T2 | |
| return ctx.hypercomb(h, [v], **kwargs) | |
| def angerj(ctx, v, z, **kwargs): | |
| return _anger(ctx, 0, v, z, **kwargs) | |
| def webere(ctx, v, z, **kwargs): | |
| return _anger(ctx, 1, v, z, **kwargs) | |
| def lommels1(ctx, u, v, z, **kwargs): | |
| u = ctx._convert_param(u)[0] | |
| v = ctx._convert_param(v)[0] | |
| z = ctx.convert(z) | |
| def h(u,v): | |
| b = ctx.mpq_1_2 | |
| w = ctx.square_exp_arg(z, mult=-0.25) | |
| return ([u-v+1, u+v+1, z], [-1, -1, u+1], [], [], [1], \ | |
| [b*(u-v+3),b*(u+v+3)], w), | |
| return ctx.hypercomb(h, [u,v], **kwargs) | |
| def lommels2(ctx, u, v, z, **kwargs): | |
| u = ctx._convert_param(u)[0] | |
| v = ctx._convert_param(v)[0] | |
| z = ctx.convert(z) | |
| # Asymptotic expansion (GR p. 947) -- need to be careful | |
| # not to use for small arguments | |
| # def h(u,v): | |
| # b = ctx.mpq_1_2 | |
| # w = -(z/2)**(-2) | |
| # return ([z], [u-1], [], [], [b*(1-u+v)], [b*(1-u-v)], w), | |
| def h(u,v): | |
| b = ctx.mpq_1_2 | |
| w = ctx.square_exp_arg(z, mult=-0.25) | |
| T1 = [u-v+1, u+v+1, z], [-1, -1, u+1], [], [], [1], [b*(u-v+3),b*(u+v+3)], w | |
| T2 = [2, z], [u+v-1, -v], [v, b*(u+v+1)], [b*(v-u+1)], [], [1-v], w | |
| T3 = [2, z], [u-v-1, v], [-v, b*(u-v+1)], [b*(1-u-v)], [], [1+v], w | |
| #c1 = ctx.cospi((u-v)*b) | |
| #c2 = ctx.cospi((u+v)*b) | |
| #s = ctx.sinpi(v) | |
| #r1 = (u-v+1)*b | |
| #r2 = (u+v+1)*b | |
| #T2 = [c1, s, z, 2], [1, -1, -v, v], [], [-v+1], [], [-v+1], w | |
| #T3 = [-c2, s, z, 2], [1, -1, v, -v], [], [v+1], [], [v+1], w | |
| #T2 = [c1, s, z, 2], [1, -1, -v, v+u-1], [r1, r2], [-v+1], [], [-v+1], w | |
| #T3 = [-c2, s, z, 2], [1, -1, v, -v+u-1], [r1, r2], [v+1], [], [v+1], w | |
| return T1, T2, T3 | |
| return ctx.hypercomb(h, [u,v], **kwargs) | |
| def ber(ctx, n, z, **kwargs): | |
| n = ctx.convert(n) | |
| z = ctx.convert(z) | |
| # http://functions.wolfram.com/Bessel-TypeFunctions/KelvinBer2/26/01/02/0001/ | |
| def h(n): | |
| r = -(z/4)**4 | |
| cos, sin = ctx.cospi_sinpi(-0.75*n) | |
| T1 = [cos, z/2], [1, n], [], [n+1], [], [0.5, 0.5*(n+1), 0.5*n+1], r | |
| T2 = [sin, z/2], [1, n+2], [], [n+2], [], [1.5, 0.5*(n+3), 0.5*n+1], r | |
| return T1, T2 | |
| return ctx.hypercomb(h, [n], **kwargs) | |
| def bei(ctx, n, z, **kwargs): | |
| n = ctx.convert(n) | |
| z = ctx.convert(z) | |
| # http://functions.wolfram.com/Bessel-TypeFunctions/KelvinBei2/26/01/02/0001/ | |
| def h(n): | |
| r = -(z/4)**4 | |
| cos, sin = ctx.cospi_sinpi(0.75*n) | |
| T1 = [cos, z/2], [1, n+2], [], [n+2], [], [1.5, 0.5*(n+3), 0.5*n+1], r | |
| T2 = [sin, z/2], [1, n], [], [n+1], [], [0.5, 0.5*(n+1), 0.5*n+1], r | |
| return T1, T2 | |
| return ctx.hypercomb(h, [n], **kwargs) | |
| def ker(ctx, n, z, **kwargs): | |
| n = ctx.convert(n) | |
| z = ctx.convert(z) | |
| # http://functions.wolfram.com/Bessel-TypeFunctions/KelvinKer2/26/01/02/0001/ | |
| def h(n): | |
| r = -(z/4)**4 | |
| cos1, sin1 = ctx.cospi_sinpi(0.25*n) | |
| cos2, sin2 = ctx.cospi_sinpi(0.75*n) | |
| T1 = [2, z, 4*cos1], [-n-3, n, 1], [-n], [], [], [0.5, 0.5*(1+n), 0.5*(n+2)], r | |
| T2 = [2, z, -sin1], [-n-3, 2+n, 1], [-n-1], [], [], [1.5, 0.5*(3+n), 0.5*(n+2)], r | |
| T3 = [2, z, 4*cos2], [n-3, -n, 1], [n], [], [], [0.5, 0.5*(1-n), 1-0.5*n], r | |
| T4 = [2, z, -sin2], [n-3, 2-n, 1], [n-1], [], [], [1.5, 0.5*(3-n), 1-0.5*n], r | |
| return T1, T2, T3, T4 | |
| return ctx.hypercomb(h, [n], **kwargs) | |
| def kei(ctx, n, z, **kwargs): | |
| n = ctx.convert(n) | |
| z = ctx.convert(z) | |
| # http://functions.wolfram.com/Bessel-TypeFunctions/KelvinKei2/26/01/02/0001/ | |
| def h(n): | |
| r = -(z/4)**4 | |
| cos1, sin1 = ctx.cospi_sinpi(0.75*n) | |
| cos2, sin2 = ctx.cospi_sinpi(0.25*n) | |
| T1 = [-cos1, 2, z], [1, n-3, 2-n], [n-1], [], [], [1.5, 0.5*(3-n), 1-0.5*n], r | |
| T2 = [-sin1, 2, z], [1, n-1, -n], [n], [], [], [0.5, 0.5*(1-n), 1-0.5*n], r | |
| T3 = [-sin2, 2, z], [1, -n-1, n], [-n], [], [], [0.5, 0.5*(n+1), 0.5*(n+2)], r | |
| T4 = [-cos2, 2, z], [1, -n-3, n+2], [-n-1], [], [], [1.5, 0.5*(n+3), 0.5*(n+2)], r | |
| return T1, T2, T3, T4 | |
| return ctx.hypercomb(h, [n], **kwargs) | |
| # TODO: do this more generically? | |
| def c_memo(f): | |
| name = f.__name__ | |
| def f_wrapped(ctx): | |
| cache = ctx._misc_const_cache | |
| prec = ctx.prec | |
| p,v = cache.get(name, (-1,0)) | |
| if p >= prec: | |
| return +v | |
| else: | |
| cache[name] = (prec, f(ctx)) | |
| return cache[name][1] | |
| return f_wrapped | |
| def _airyai_C1(ctx): | |
| return 1 / (ctx.cbrt(9) * ctx.gamma(ctx.mpf(2)/3)) | |
| def _airyai_C2(ctx): | |
| return -1 / (ctx.cbrt(3) * ctx.gamma(ctx.mpf(1)/3)) | |
| def _airybi_C1(ctx): | |
| return 1 / (ctx.nthroot(3,6) * ctx.gamma(ctx.mpf(2)/3)) | |
| def _airybi_C2(ctx): | |
| return ctx.nthroot(3,6) / ctx.gamma(ctx.mpf(1)/3) | |
| def _airybi_n2_inf(ctx): | |
| prec = ctx.prec | |
| try: | |
| v = ctx.power(3,'2/3')*ctx.gamma('2/3')/(2*ctx.pi) | |
| finally: | |
| ctx.prec = prec | |
| return +v | |
| # Derivatives at z = 0 | |
| # TODO: could be expressed more elegantly using triple factorials | |
| def _airyderiv_0(ctx, z, n, ntype, which): | |
| if ntype == 'Z': | |
| if n < 0: | |
| return z | |
| r = ctx.mpq_1_3 | |
| prec = ctx.prec | |
| try: | |
| ctx.prec += 10 | |
| v = ctx.gamma((n+1)*r) * ctx.power(3,n*r) / ctx.pi | |
| if which == 0: | |
| v *= ctx.sinpi(2*(n+1)*r) | |
| v /= ctx.power(3,'2/3') | |
| else: | |
| v *= abs(ctx.sinpi(2*(n+1)*r)) | |
| v /= ctx.power(3,'1/6') | |
| finally: | |
| ctx.prec = prec | |
| return +v + z | |
| else: | |
| # singular (does the limit exist?) | |
| raise NotImplementedError | |
| def airyai(ctx, z, derivative=0, **kwargs): | |
| z = ctx.convert(z) | |
| if derivative: | |
| n, ntype = ctx._convert_param(derivative) | |
| else: | |
| n = 0 | |
| # Values at infinities | |
| if not ctx.isnormal(z) and z: | |
| if n and ntype == 'Z': | |
| if n == -1: | |
| if z == ctx.inf: | |
| return ctx.mpf(1)/3 + 1/z | |
| if z == ctx.ninf: | |
| return ctx.mpf(-2)/3 + 1/z | |
| if n < -1: | |
| if z == ctx.inf: | |
| return z | |
| if z == ctx.ninf: | |
| return (-1)**n * (-z) | |
| if (not n) and z == ctx.inf or z == ctx.ninf: | |
| return 1/z | |
| # TODO: limits | |
| raise ValueError("essential singularity of Ai(z)") | |
| # Account for exponential scaling | |
| if z: | |
| extraprec = max(0, int(1.5*ctx.mag(z))) | |
| else: | |
| extraprec = 0 | |
| if n: | |
| if n == 1: | |
| def h(): | |
| # http://functions.wolfram.com/03.07.06.0005.01 | |
| if ctx._re(z) > 4: | |
| ctx.prec += extraprec | |
| w = z**1.5; r = -0.75/w; u = -2*w/3 | |
| ctx.prec -= extraprec | |
| C = -ctx.exp(u)/(2*ctx.sqrt(ctx.pi))*ctx.nthroot(z,4) | |
| return ([C],[1],[],[],[(-1,6),(7,6)],[],r), | |
| # http://functions.wolfram.com/03.07.26.0001.01 | |
| else: | |
| ctx.prec += extraprec | |
| w = z**3 / 9 | |
| ctx.prec -= extraprec | |
| C1 = _airyai_C1(ctx) * 0.5 | |
| C2 = _airyai_C2(ctx) | |
| T1 = [C1,z],[1,2],[],[],[],[ctx.mpq_5_3],w | |
| T2 = [C2],[1],[],[],[],[ctx.mpq_1_3],w | |
| return T1, T2 | |
| return ctx.hypercomb(h, [], **kwargs) | |
| else: | |
| if z == 0: | |
| return _airyderiv_0(ctx, z, n, ntype, 0) | |
| # http://functions.wolfram.com/03.05.20.0004.01 | |
| def h(n): | |
| ctx.prec += extraprec | |
| w = z**3/9 | |
| ctx.prec -= extraprec | |
| q13,q23,q43 = ctx.mpq_1_3, ctx.mpq_2_3, ctx.mpq_4_3 | |
| a1=q13; a2=1; b1=(1-n)*q13; b2=(2-n)*q13; b3=1-n*q13 | |
| T1 = [3, z], [n-q23, -n], [a1], [b1,b2,b3], \ | |
| [a1,a2], [b1,b2,b3], w | |
| a1=q23; b1=(2-n)*q13; b2=1-n*q13; b3=(4-n)*q13 | |
| T2 = [3, z, -z], [n-q43, -n, 1], [a1], [b1,b2,b3], \ | |
| [a1,a2], [b1,b2,b3], w | |
| return T1, T2 | |
| v = ctx.hypercomb(h, [n], **kwargs) | |
| if ctx._is_real_type(z) and ctx.isint(n): | |
| v = ctx._re(v) | |
| return v | |
| else: | |
| def h(): | |
| if ctx._re(z) > 4: | |
| # We could use 1F1, but it results in huge cancellation; | |
| # the following expansion is better. | |
| # TODO: asymptotic series for derivatives | |
| ctx.prec += extraprec | |
| w = z**1.5; r = -0.75/w; u = -2*w/3 | |
| ctx.prec -= extraprec | |
| C = ctx.exp(u)/(2*ctx.sqrt(ctx.pi)*ctx.nthroot(z,4)) | |
| return ([C],[1],[],[],[(1,6),(5,6)],[],r), | |
| else: | |
| ctx.prec += extraprec | |
| w = z**3 / 9 | |
| ctx.prec -= extraprec | |
| C1 = _airyai_C1(ctx) | |
| C2 = _airyai_C2(ctx) | |
| T1 = [C1],[1],[],[],[],[ctx.mpq_2_3],w | |
| T2 = [z*C2],[1],[],[],[],[ctx.mpq_4_3],w | |
| return T1, T2 | |
| return ctx.hypercomb(h, [], **kwargs) | |
| def airybi(ctx, z, derivative=0, **kwargs): | |
| z = ctx.convert(z) | |
| if derivative: | |
| n, ntype = ctx._convert_param(derivative) | |
| else: | |
| n = 0 | |
| # Values at infinities | |
| if not ctx.isnormal(z) and z: | |
| if n and ntype == 'Z': | |
| if z == ctx.inf: | |
| return z | |
| if z == ctx.ninf: | |
| if n == -1: | |
| return 1/z | |
| if n == -2: | |
| return _airybi_n2_inf(ctx) | |
| if n < -2: | |
| return (-1)**n * (-z) | |
| if not n: | |
| if z == ctx.inf: | |
| return z | |
| if z == ctx.ninf: | |
| return 1/z | |
| # TODO: limits | |
| raise ValueError("essential singularity of Bi(z)") | |
| if z: | |
| extraprec = max(0, int(1.5*ctx.mag(z))) | |
| else: | |
| extraprec = 0 | |
| if n: | |
| if n == 1: | |
| # http://functions.wolfram.com/03.08.26.0001.01 | |
| def h(): | |
| ctx.prec += extraprec | |
| w = z**3 / 9 | |
| ctx.prec -= extraprec | |
| C1 = _airybi_C1(ctx)*0.5 | |
| C2 = _airybi_C2(ctx) | |
| T1 = [C1,z],[1,2],[],[],[],[ctx.mpq_5_3],w | |
| T2 = [C2],[1],[],[],[],[ctx.mpq_1_3],w | |
| return T1, T2 | |
| return ctx.hypercomb(h, [], **kwargs) | |
| else: | |
| if z == 0: | |
| return _airyderiv_0(ctx, z, n, ntype, 1) | |
| def h(n): | |
| ctx.prec += extraprec | |
| w = z**3/9 | |
| ctx.prec -= extraprec | |
| q13,q23,q43 = ctx.mpq_1_3, ctx.mpq_2_3, ctx.mpq_4_3 | |
| q16 = ctx.mpq_1_6 | |
| q56 = ctx.mpq_5_6 | |
| a1=q13; a2=1; b1=(1-n)*q13; b2=(2-n)*q13; b3=1-n*q13 | |
| T1 = [3, z], [n-q16, -n], [a1], [b1,b2,b3], \ | |
| [a1,a2], [b1,b2,b3], w | |
| a1=q23; b1=(2-n)*q13; b2=1-n*q13; b3=(4-n)*q13 | |
| T2 = [3, z], [n-q56, 1-n], [a1], [b1,b2,b3], \ | |
| [a1,a2], [b1,b2,b3], w | |
| return T1, T2 | |
| v = ctx.hypercomb(h, [n], **kwargs) | |
| if ctx._is_real_type(z) and ctx.isint(n): | |
| v = ctx._re(v) | |
| return v | |
| else: | |
| def h(): | |
| ctx.prec += extraprec | |
| w = z**3 / 9 | |
| ctx.prec -= extraprec | |
| C1 = _airybi_C1(ctx) | |
| C2 = _airybi_C2(ctx) | |
| T1 = [C1],[1],[],[],[],[ctx.mpq_2_3],w | |
| T2 = [z*C2],[1],[],[],[],[ctx.mpq_4_3],w | |
| return T1, T2 | |
| return ctx.hypercomb(h, [], **kwargs) | |
| def _airy_zero(ctx, which, k, derivative, complex=False): | |
| # Asymptotic formulas are given in DLMF section 9.9 | |
| def U(t): return t**(2/3.)*(1-7/(t**2*48)) | |
| def T(t): return t**(2/3.)*(1+5/(t**2*48)) | |
| k = int(k) | |
| if k < 1: | |
| raise ValueError("k cannot be less than 1") | |
| if not derivative in (0,1): | |
| raise ValueError("Derivative should lie between 0 and 1") | |
| if which == 0: | |
| if derivative: | |
| return ctx.findroot(lambda z: ctx.airyai(z,1), | |
| -U(3*ctx.pi*(4*k-3)/8)) | |
| return ctx.findroot(ctx.airyai, -T(3*ctx.pi*(4*k-1)/8)) | |
| if which == 1 and complex == False: | |
| if derivative: | |
| return ctx.findroot(lambda z: ctx.airybi(z,1), | |
| -U(3*ctx.pi*(4*k-1)/8)) | |
| return ctx.findroot(ctx.airybi, -T(3*ctx.pi*(4*k-3)/8)) | |
| if which == 1 and complex == True: | |
| if derivative: | |
| t = 3*ctx.pi*(4*k-3)/8 + 0.75j*ctx.ln2 | |
| s = ctx.expjpi(ctx.mpf(1)/3) * T(t) | |
| return ctx.findroot(lambda z: ctx.airybi(z,1), s) | |
| t = 3*ctx.pi*(4*k-1)/8 + 0.75j*ctx.ln2 | |
| s = ctx.expjpi(ctx.mpf(1)/3) * U(t) | |
| return ctx.findroot(ctx.airybi, s) | |
| def airyaizero(ctx, k, derivative=0): | |
| return _airy_zero(ctx, 0, k, derivative, False) | |
| def airybizero(ctx, k, derivative=0, complex=False): | |
| return _airy_zero(ctx, 1, k, derivative, complex) | |
| def _scorer(ctx, z, which, kwargs): | |
| z = ctx.convert(z) | |
| if ctx.isinf(z): | |
| if z == ctx.inf: | |
| if which == 0: return 1/z | |
| if which == 1: return z | |
| if z == ctx.ninf: | |
| return 1/z | |
| raise ValueError("essential singularity") | |
| if z: | |
| extraprec = max(0, int(1.5*ctx.mag(z))) | |
| else: | |
| extraprec = 0 | |
| if kwargs.get('derivative'): | |
| raise NotImplementedError | |
| # Direct asymptotic expansions, to avoid | |
| # exponentially large cancellation | |
| try: | |
| if ctx.mag(z) > 3: | |
| if which == 0 and abs(ctx.arg(z)) < ctx.pi/3 * 0.999: | |
| def h(): | |
| return (([ctx.pi,z],[-1,-1],[],[],[(1,3),(2,3),1],[],9/z**3),) | |
| return ctx.hypercomb(h, [], maxterms=ctx.prec, force_series=True) | |
| if which == 1 and abs(ctx.arg(-z)) < 2*ctx.pi/3 * 0.999: | |
| def h(): | |
| return (([-ctx.pi,z],[-1,-1],[],[],[(1,3),(2,3),1],[],9/z**3),) | |
| return ctx.hypercomb(h, [], maxterms=ctx.prec, force_series=True) | |
| except ctx.NoConvergence: | |
| pass | |
| def h(): | |
| A = ctx.airybi(z, **kwargs)/3 | |
| B = -2*ctx.pi | |
| if which == 1: | |
| A *= 2 | |
| B *= -1 | |
| ctx.prec += extraprec | |
| w = z**3/9 | |
| ctx.prec -= extraprec | |
| T1 = [A], [1], [], [], [], [], 0 | |
| T2 = [B,z], [-1,2], [], [], [1], [ctx.mpq_4_3,ctx.mpq_5_3], w | |
| return T1, T2 | |
| return ctx.hypercomb(h, [], **kwargs) | |
| def scorergi(ctx, z, **kwargs): | |
| return _scorer(ctx, z, 0, kwargs) | |
| def scorerhi(ctx, z, **kwargs): | |
| return _scorer(ctx, z, 1, kwargs) | |
| def coulombc(ctx, l, eta, _cache={}): | |
| if (l, eta) in _cache and _cache[l,eta][0] >= ctx.prec: | |
| return +_cache[l,eta][1] | |
| G3 = ctx.loggamma(2*l+2) | |
| G1 = ctx.loggamma(1+l+ctx.j*eta) | |
| G2 = ctx.loggamma(1+l-ctx.j*eta) | |
| v = 2**l * ctx.exp((-ctx.pi*eta+G1+G2)/2 - G3) | |
| if not (ctx.im(l) or ctx.im(eta)): | |
| v = ctx.re(v) | |
| _cache[l,eta] = (ctx.prec, v) | |
| return v | |
| def coulombf(ctx, l, eta, z, w=1, chop=True, **kwargs): | |
| # Regular Coulomb wave function | |
| # Note: w can be either 1 or -1; the other may be better in some cases | |
| # TODO: check that chop=True chops when and only when it should | |
| #ctx.prec += 10 | |
| def h(l, eta): | |
| try: | |
| jw = ctx.j*w | |
| jwz = ctx.fmul(jw, z, exact=True) | |
| jwz2 = ctx.fmul(jwz, -2, exact=True) | |
| C = ctx.coulombc(l, eta) | |
| T1 = [C, z, ctx.exp(jwz)], [1, l+1, 1], [], [], [1+l+jw*eta], \ | |
| [2*l+2], jwz2 | |
| except ValueError: | |
| T1 = [0], [-1], [], [], [], [], 0 | |
| return (T1,) | |
| v = ctx.hypercomb(h, [l,eta], **kwargs) | |
| if chop and (not ctx.im(l)) and (not ctx.im(eta)) and (not ctx.im(z)) and \ | |
| (ctx.re(z) >= 0): | |
| v = ctx.re(v) | |
| return v | |
| def _coulomb_chi(ctx, l, eta, _cache={}): | |
| if (l, eta) in _cache and _cache[l,eta][0] >= ctx.prec: | |
| return _cache[l,eta][1] | |
| def terms(): | |
| l2 = -l-1 | |
| jeta = ctx.j*eta | |
| return [ctx.loggamma(1+l+jeta) * (-0.5j), | |
| ctx.loggamma(1+l-jeta) * (0.5j), | |
| ctx.loggamma(1+l2+jeta) * (0.5j), | |
| ctx.loggamma(1+l2-jeta) * (-0.5j), | |
| -(l+0.5)*ctx.pi] | |
| v = ctx.sum_accurately(terms, 1) | |
| _cache[l,eta] = (ctx.prec, v) | |
| return v | |
| def coulombg(ctx, l, eta, z, w=1, chop=True, **kwargs): | |
| # Irregular Coulomb wave function | |
| # Note: w can be either 1 or -1; the other may be better in some cases | |
| # TODO: check that chop=True chops when and only when it should | |
| if not ctx._im(l): | |
| l = ctx._re(l) # XXX: for isint | |
| def h(l, eta): | |
| # Force perturbation for integers and half-integers | |
| if ctx.isint(l*2): | |
| T1 = [0], [-1], [], [], [], [], 0 | |
| return (T1,) | |
| l2 = -l-1 | |
| try: | |
| chi = ctx._coulomb_chi(l, eta) | |
| jw = ctx.j*w | |
| s = ctx.sin(chi); c = ctx.cos(chi) | |
| C1 = ctx.coulombc(l,eta) | |
| C2 = ctx.coulombc(l2,eta) | |
| u = ctx.exp(jw*z) | |
| x = -2*jw*z | |
| T1 = [s, C1, z, u, c], [-1, 1, l+1, 1, 1], [], [], \ | |
| [1+l+jw*eta], [2*l+2], x | |
| T2 = [-s, C2, z, u], [-1, 1, l2+1, 1], [], [], \ | |
| [1+l2+jw*eta], [2*l2+2], x | |
| return T1, T2 | |
| except ValueError: | |
| T1 = [0], [-1], [], [], [], [], 0 | |
| return (T1,) | |
| v = ctx.hypercomb(h, [l,eta], **kwargs) | |
| if chop and (not ctx._im(l)) and (not ctx._im(eta)) and (not ctx._im(z)) and \ | |
| (ctx._re(z) >= 0): | |
| v = ctx._re(v) | |
| return v | |
| def mcmahon(ctx,kind,prime,v,m): | |
| """ | |
| Computes an estimate for the location of the Bessel function zero | |
| j_{v,m}, y_{v,m}, j'_{v,m} or y'_{v,m} using McMahon's asymptotic | |
| expansion (Abramowitz & Stegun 9.5.12-13, DLMF 20.21(vi)). | |
| Returns (r,err) where r is the estimated location of the root | |
| and err is a positive number estimating the error of the | |
| asymptotic expansion. | |
| """ | |
| u = 4*v**2 | |
| if kind == 1 and not prime: b = (4*m+2*v-1)*ctx.pi/4 | |
| if kind == 2 and not prime: b = (4*m+2*v-3)*ctx.pi/4 | |
| if kind == 1 and prime: b = (4*m+2*v-3)*ctx.pi/4 | |
| if kind == 2 and prime: b = (4*m+2*v-1)*ctx.pi/4 | |
| if not prime: | |
| s1 = b | |
| s2 = -(u-1)/(8*b) | |
| s3 = -4*(u-1)*(7*u-31)/(3*(8*b)**3) | |
| s4 = -32*(u-1)*(83*u**2-982*u+3779)/(15*(8*b)**5) | |
| s5 = -64*(u-1)*(6949*u**3-153855*u**2+1585743*u-6277237)/(105*(8*b)**7) | |
| if prime: | |
| s1 = b | |
| s2 = -(u+3)/(8*b) | |
| s3 = -4*(7*u**2+82*u-9)/(3*(8*b)**3) | |
| s4 = -32*(83*u**3+2075*u**2-3039*u+3537)/(15*(8*b)**5) | |
| s5 = -64*(6949*u**4+296492*u**3-1248002*u**2+7414380*u-5853627)/(105*(8*b)**7) | |
| terms = [s1,s2,s3,s4,s5] | |
| s = s1 | |
| err = 0.0 | |
| for i in range(1,len(terms)): | |
| if abs(terms[i]) < abs(terms[i-1]): | |
| s += terms[i] | |
| else: | |
| err = abs(terms[i]) | |
| if i == len(terms)-1: | |
| err = abs(terms[-1]) | |
| return s, err | |
| def generalized_bisection(ctx,f,a,b,n): | |
| """ | |
| Given f known to have exactly n simple roots within [a,b], | |
| return a list of n intervals isolating the roots | |
| and having opposite signs at the endpoints. | |
| TODO: this can be optimized, e.g. by reusing evaluation points. | |
| """ | |
| if n < 1: | |
| raise ValueError("n cannot be less than 1") | |
| N = n+1 | |
| points = [] | |
| signs = [] | |
| while 1: | |
| points = ctx.linspace(a,b,N) | |
| signs = [ctx.sign(f(x)) for x in points] | |
| ok_intervals = [(points[i],points[i+1]) for i in range(N-1) \ | |
| if signs[i]*signs[i+1] == -1] | |
| if len(ok_intervals) == n: | |
| return ok_intervals | |
| N = N*2 | |
| def find_in_interval(ctx, f, ab): | |
| return ctx.findroot(f, ab, solver='illinois', verify=False) | |
| def bessel_zero(ctx, kind, prime, v, m, isoltol=0.01, _interval_cache={}): | |
| prec = ctx.prec | |
| workprec = max(prec, ctx.mag(v), ctx.mag(m))+10 | |
| try: | |
| ctx.prec = workprec | |
| v = ctx.mpf(v) | |
| m = int(m) | |
| prime = int(prime) | |
| if v < 0: | |
| raise ValueError("v cannot be negative") | |
| if m < 1: | |
| raise ValueError("m cannot be less than 1") | |
| if not prime in (0,1): | |
| raise ValueError("prime should lie between 0 and 1") | |
| if kind == 1: | |
| if prime: f = lambda x: ctx.besselj(v,x,derivative=1) | |
| else: f = lambda x: ctx.besselj(v,x) | |
| if kind == 2: | |
| if prime: f = lambda x: ctx.bessely(v,x,derivative=1) | |
| else: f = lambda x: ctx.bessely(v,x) | |
| # The first root of J' is very close to 0 for small | |
| # orders, and this needs to be special-cased | |
| if kind == 1 and prime and m == 1: | |
| if v == 0: | |
| return ctx.zero | |
| if v <= 1: | |
| # TODO: use v <= j'_{v,1} < y_{v,1}? | |
| r = 2*ctx.sqrt(v*(1+v)/(v+2)) | |
| return find_in_interval(ctx, f, (r/10, 2*r)) | |
| if (kind,prime,v,m) in _interval_cache: | |
| return find_in_interval(ctx, f, _interval_cache[kind,prime,v,m]) | |
| r, err = mcmahon(ctx, kind, prime, v, m) | |
| if err < isoltol: | |
| return find_in_interval(ctx, f, (r-isoltol, r+isoltol)) | |
| # An x such that 0 < x < r_{v,1} | |
| if kind == 1 and not prime: low = 2.4 | |
| if kind == 1 and prime: low = 1.8 | |
| if kind == 2 and not prime: low = 0.8 | |
| if kind == 2 and prime: low = 2.0 | |
| n = m+1 | |
| while 1: | |
| r1, err = mcmahon(ctx, kind, prime, v, n) | |
| if err < isoltol: | |
| r2, err2 = mcmahon(ctx, kind, prime, v, n+1) | |
| intervals = generalized_bisection(ctx, f, low, 0.5*(r1+r2), n) | |
| for k, ab in enumerate(intervals): | |
| _interval_cache[kind,prime,v,k+1] = ab | |
| return find_in_interval(ctx, f, intervals[m-1]) | |
| else: | |
| n = n*2 | |
| finally: | |
| ctx.prec = prec | |
| def besseljzero(ctx, v, m, derivative=0): | |
| r""" | |
| For a real order `\nu \ge 0` and a positive integer `m`, returns | |
| `j_{\nu,m}`, the `m`-th positive zero of the Bessel function of the | |
| first kind `J_{\nu}(z)` (see :func:`~mpmath.besselj`). Alternatively, | |
| with *derivative=1*, gives the first nonnegative simple zero | |
| `j'_{\nu,m}` of `J'_{\nu}(z)`. | |
| The indexing convention is that used by Abramowitz & Stegun | |
| and the DLMF. Note the special case `j'_{0,1} = 0`, while all other | |
| zeros are positive. In effect, only simple zeros are counted | |
| (all zeros of Bessel functions are simple except possibly `z = 0`) | |
| and `j_{\nu,m}` becomes a monotonic function of both `\nu` | |
| and `m`. | |
| The zeros are interlaced according to the inequalities | |
| .. math :: | |
| j'_{\nu,k} < j_{\nu,k} < j'_{\nu,k+1} | |
| j_{\nu,1} < j_{\nu+1,2} < j_{\nu,2} < j_{\nu+1,2} < j_{\nu,3} < \cdots | |
| **Examples** | |
| Initial zeros of the Bessel functions `J_0(z), J_1(z), J_2(z)`:: | |
| >>> from mpmath import * | |
| >>> mp.dps = 25; mp.pretty = True | |
| >>> besseljzero(0,1); besseljzero(0,2); besseljzero(0,3) | |
| 2.404825557695772768621632 | |
| 5.520078110286310649596604 | |
| 8.653727912911012216954199 | |
| >>> besseljzero(1,1); besseljzero(1,2); besseljzero(1,3) | |
| 3.831705970207512315614436 | |
| 7.01558666981561875353705 | |
| 10.17346813506272207718571 | |
| >>> besseljzero(2,1); besseljzero(2,2); besseljzero(2,3) | |
| 5.135622301840682556301402 | |
| 8.417244140399864857783614 | |
| 11.61984117214905942709415 | |
| Initial zeros of `J'_0(z), J'_1(z), J'_2(z)`:: | |
| 0.0 | |
| 3.831705970207512315614436 | |
| 7.01558666981561875353705 | |
| >>> besseljzero(1,1,1); besseljzero(1,2,1); besseljzero(1,3,1) | |
| 1.84118378134065930264363 | |
| 5.331442773525032636884016 | |
| 8.536316366346285834358961 | |
| >>> besseljzero(2,1,1); besseljzero(2,2,1); besseljzero(2,3,1) | |
| 3.054236928227140322755932 | |
| 6.706133194158459146634394 | |
| 9.969467823087595793179143 | |
| Zeros with large index:: | |
| >>> besseljzero(0,100); besseljzero(0,1000); besseljzero(0,10000) | |
| 313.3742660775278447196902 | |
| 3140.807295225078628895545 | |
| 31415.14114171350798533666 | |
| >>> besseljzero(5,100); besseljzero(5,1000); besseljzero(5,10000) | |
| 321.1893195676003157339222 | |
| 3148.657306813047523500494 | |
| 31422.9947255486291798943 | |
| >>> besseljzero(0,100,1); besseljzero(0,1000,1); besseljzero(0,10000,1) | |
| 311.8018681873704508125112 | |
| 3139.236339643802482833973 | |
| 31413.57032947022399485808 | |
| Zeros of functions with large order:: | |
| >>> besseljzero(50,1) | |
| 57.11689916011917411936228 | |
| >>> besseljzero(50,2) | |
| 62.80769876483536093435393 | |
| >>> besseljzero(50,100) | |
| 388.6936600656058834640981 | |
| >>> besseljzero(50,1,1) | |
| 52.99764038731665010944037 | |
| >>> besseljzero(50,2,1) | |
| 60.02631933279942589882363 | |
| >>> besseljzero(50,100,1) | |
| 387.1083151608726181086283 | |
| Zeros of functions with fractional order:: | |
| >>> besseljzero(0.5,1); besseljzero(1.5,1); besseljzero(2.25,4) | |
| 3.141592653589793238462643 | |
| 4.493409457909064175307881 | |
| 15.15657692957458622921634 | |
| Both `J_{\nu}(z)` and `J'_{\nu}(z)` can be expressed as infinite | |
| products over their zeros:: | |
| >>> v,z = 2, mpf(1) | |
| >>> (z/2)**v/gamma(v+1) * \ | |
| ... nprod(lambda k: 1-(z/besseljzero(v,k))**2, [1,inf]) | |
| ... | |
| 0.1149034849319004804696469 | |
| >>> besselj(v,z) | |
| 0.1149034849319004804696469 | |
| >>> (z/2)**(v-1)/2/gamma(v) * \ | |
| ... nprod(lambda k: 1-(z/besseljzero(v,k,1))**2, [1,inf]) | |
| ... | |
| 0.2102436158811325550203884 | |
| >>> besselj(v,z,1) | |
| 0.2102436158811325550203884 | |
| """ | |
| return +bessel_zero(ctx, 1, derivative, v, m) | |
| def besselyzero(ctx, v, m, derivative=0): | |
| r""" | |
| For a real order `\nu \ge 0` and a positive integer `m`, returns | |
| `y_{\nu,m}`, the `m`-th positive zero of the Bessel function of the | |
| second kind `Y_{\nu}(z)` (see :func:`~mpmath.bessely`). Alternatively, | |
| with *derivative=1*, gives the first positive zero `y'_{\nu,m}` of | |
| `Y'_{\nu}(z)`. | |
| The zeros are interlaced according to the inequalities | |
| .. math :: | |
| y_{\nu,k} < y'_{\nu,k} < y_{\nu,k+1} | |
| y_{\nu,1} < y_{\nu+1,2} < y_{\nu,2} < y_{\nu+1,2} < y_{\nu,3} < \cdots | |
| **Examples** | |
| Initial zeros of the Bessel functions `Y_0(z), Y_1(z), Y_2(z)`:: | |
| >>> from mpmath import * | |
| >>> mp.dps = 25; mp.pretty = True | |
| >>> besselyzero(0,1); besselyzero(0,2); besselyzero(0,3) | |
| 0.8935769662791675215848871 | |
| 3.957678419314857868375677 | |
| 7.086051060301772697623625 | |
| >>> besselyzero(1,1); besselyzero(1,2); besselyzero(1,3) | |
| 2.197141326031017035149034 | |
| 5.429681040794135132772005 | |
| 8.596005868331168926429606 | |
| >>> besselyzero(2,1); besselyzero(2,2); besselyzero(2,3) | |
| 3.384241767149593472701426 | |
| 6.793807513268267538291167 | |
| 10.02347797936003797850539 | |
| Initial zeros of `Y'_0(z), Y'_1(z), Y'_2(z)`:: | |
| >>> besselyzero(0,1,1); besselyzero(0,2,1); besselyzero(0,3,1) | |
| 2.197141326031017035149034 | |
| 5.429681040794135132772005 | |
| 8.596005868331168926429606 | |
| >>> besselyzero(1,1,1); besselyzero(1,2,1); besselyzero(1,3,1) | |
| 3.683022856585177699898967 | |
| 6.941499953654175655751944 | |
| 10.12340465543661307978775 | |
| >>> besselyzero(2,1,1); besselyzero(2,2,1); besselyzero(2,3,1) | |
| 5.002582931446063945200176 | |
| 8.350724701413079526349714 | |
| 11.57419546521764654624265 | |
| Zeros with large index:: | |
| >>> besselyzero(0,100); besselyzero(0,1000); besselyzero(0,10000) | |
| 311.8034717601871549333419 | |
| 3139.236498918198006794026 | |
| 31413.57034538691205229188 | |
| >>> besselyzero(5,100); besselyzero(5,1000); besselyzero(5,10000) | |
| 319.6183338562782156235062 | |
| 3147.086508524556404473186 | |
| 31421.42392920214673402828 | |
| >>> besselyzero(0,100,1); besselyzero(0,1000,1); besselyzero(0,10000,1) | |
| 313.3726705426359345050449 | |
| 3140.807136030340213610065 | |
| 31415.14112579761578220175 | |
| Zeros of functions with large order:: | |
| >>> besselyzero(50,1) | |
| 53.50285882040036394680237 | |
| >>> besselyzero(50,2) | |
| 60.11244442774058114686022 | |
| >>> besselyzero(50,100) | |
| 387.1096509824943957706835 | |
| >>> besselyzero(50,1,1) | |
| 56.96290427516751320063605 | |
| >>> besselyzero(50,2,1) | |
| 62.74888166945933944036623 | |
| >>> besselyzero(50,100,1) | |
| 388.6923300548309258355475 | |
| Zeros of functions with fractional order:: | |
| >>> besselyzero(0.5,1); besselyzero(1.5,1); besselyzero(2.25,4) | |
| 1.570796326794896619231322 | |
| 2.798386045783887136720249 | |
| 13.56721208770735123376018 | |
| """ | |
| return +bessel_zero(ctx, 2, derivative, v, m) | |