| from .functions import defun, defun_wrapped |
|
|
| def _hermite_param(ctx, n, z, parabolic_cylinder): |
| """ |
| Combined calculation of the Hermite polynomial H_n(z) (and its |
| generalization to complex n) and the parabolic cylinder |
| function D. |
| """ |
| n, ntyp = ctx._convert_param(n) |
| z = ctx.convert(z) |
| q = -ctx.mpq_1_2 |
| |
| |
| |
| |
| |
| |
| |
| |
| |
| |
| |
| |
| |
| |
| |
| if not z: |
| T1 = [2, ctx.pi], [n, 0.5], [], [q*(n-1)], [], [], 0 |
| if parabolic_cylinder: |
| T1[1][0] += q*n |
| return T1, |
| can_use_2f0 = ctx.isnpint(-n) or ctx.re(z) > 0 or \ |
| (ctx.re(z) == 0 and ctx.im(z) > 0) |
| expprec = ctx.prec*4 + 20 |
| if parabolic_cylinder: |
| u = ctx.fmul(ctx.fmul(z,z,prec=expprec), -0.25, exact=True) |
| w = ctx.fmul(z, ctx.sqrt(0.5,prec=expprec), prec=expprec) |
| else: |
| w = z |
| w2 = ctx.fmul(w, w, prec=expprec) |
| rw2 = ctx.fdiv(1, w2, prec=expprec) |
| nrw2 = ctx.fneg(rw2, exact=True) |
| nw = ctx.fneg(w, exact=True) |
| if can_use_2f0: |
| T1 = [2, w], [n, n], [], [], [q*n, q*(n-1)], [], nrw2 |
| terms = [T1] |
| else: |
| T1 = [2, nw], [n, n], [], [], [q*n, q*(n-1)], [], nrw2 |
| T2 = [2, ctx.pi, nw], [n+2, 0.5, 1], [], [q*n], [q*(n-1)], [1-q], w2 |
| terms = [T1,T2] |
| |
| if parabolic_cylinder: |
| expu = ctx.exp(u) |
| for i in range(len(terms)): |
| terms[i][1][0] += q*n |
| terms[i][0].append(expu) |
| terms[i][1].append(1) |
| return tuple(terms) |
|
|
| @defun |
| def hermite(ctx, n, z, **kwargs): |
| return ctx.hypercomb(lambda: _hermite_param(ctx, n, z, 0), [], **kwargs) |
|
|
| @defun |
| def pcfd(ctx, n, z, **kwargs): |
| r""" |
| Gives the parabolic cylinder function in Whittaker's notation |
| `D_n(z) = U(-n-1/2, z)` (see :func:`~mpmath.pcfu`). |
| It solves the differential equation |
| |
| .. math :: |
| |
| y'' + \left(n + \frac{1}{2} - \frac{1}{4} z^2\right) y = 0. |
| |
| and can be represented in terms of Hermite polynomials |
| (see :func:`~mpmath.hermite`) as |
| |
| .. math :: |
| |
| D_n(z) = 2^{-n/2} e^{-z^2/4} H_n\left(\frac{z}{\sqrt{2}}\right). |
| |
| **Plots** |
| |
| .. literalinclude :: /plots/pcfd.py |
| .. image :: /plots/pcfd.png |
| |
| **Examples** |
| |
| >>> from mpmath import * |
| >>> mp.dps = 25; mp.pretty = True |
| >>> pcfd(0,0); pcfd(1,0); pcfd(2,0); pcfd(3,0) |
| 1.0 |
| 0.0 |
| -1.0 |
| 0.0 |
| >>> pcfd(4,0); pcfd(-3,0) |
| 3.0 |
| 0.6266570686577501256039413 |
| >>> pcfd('1/2', 2+3j) |
| (-5.363331161232920734849056 - 3.858877821790010714163487j) |
| >>> pcfd(2, -10) |
| 1.374906442631438038871515e-9 |
| |
| Verifying the differential equation:: |
| |
| >>> n = mpf(2.5) |
| >>> y = lambda z: pcfd(n,z) |
| >>> z = 1.75 |
| >>> chop(diff(y,z,2) + (n+0.5-0.25*z**2)*y(z)) |
| 0.0 |
| |
| Rational Taylor series expansion when `n` is an integer:: |
| |
| >>> taylor(lambda z: pcfd(5,z), 0, 7) |
| [0.0, 15.0, 0.0, -13.75, 0.0, 3.96875, 0.0, -0.6015625] |
| |
| """ |
| return ctx.hypercomb(lambda: _hermite_param(ctx, n, z, 1), [], **kwargs) |
|
|
| @defun |
| def pcfu(ctx, a, z, **kwargs): |
| r""" |
| Gives the parabolic cylinder function `U(a,z)`, which may be |
| defined for `\Re(z) > 0` in terms of the confluent |
| U-function (see :func:`~mpmath.hyperu`) by |
| |
| .. math :: |
| |
| U(a,z) = 2^{-\frac{1}{4}-\frac{a}{2}} e^{-\frac{1}{4} z^2} |
| U\left(\frac{a}{2}+\frac{1}{4}, |
| \frac{1}{2}, \frac{1}{2}z^2\right) |
| |
| or, for arbitrary `z`, |
| |
| .. math :: |
| |
| e^{-\frac{1}{4}z^2} U(a,z) = |
| U(a,0) \,_1F_1\left(-\tfrac{a}{2}+\tfrac{1}{4}; |
| \tfrac{1}{2}; -\tfrac{1}{2}z^2\right) + |
| U'(a,0) z \,_1F_1\left(-\tfrac{a}{2}+\tfrac{3}{4}; |
| \tfrac{3}{2}; -\tfrac{1}{2}z^2\right). |
| |
| **Examples** |
| |
| Connection to other functions:: |
| |
| >>> from mpmath import * |
| >>> mp.dps = 25; mp.pretty = True |
| >>> z = mpf(3) |
| >>> pcfu(0.5,z) |
| 0.03210358129311151450551963 |
| >>> sqrt(pi/2)*exp(z**2/4)*erfc(z/sqrt(2)) |
| 0.03210358129311151450551963 |
| >>> pcfu(0.5,-z) |
| 23.75012332835297233711255 |
| >>> sqrt(pi/2)*exp(z**2/4)*erfc(-z/sqrt(2)) |
| 23.75012332835297233711255 |
| >>> pcfu(0.5,-z) |
| 23.75012332835297233711255 |
| >>> sqrt(pi/2)*exp(z**2/4)*erfc(-z/sqrt(2)) |
| 23.75012332835297233711255 |
| |
| """ |
| n, _ = ctx._convert_param(a) |
| return ctx.pcfd(-n-ctx.mpq_1_2, z) |
|
|
| @defun |
| def pcfv(ctx, a, z, **kwargs): |
| r""" |
| Gives the parabolic cylinder function `V(a,z)`, which can be |
| represented in terms of :func:`~mpmath.pcfu` as |
| |
| .. math :: |
| |
| V(a,z) = \frac{\Gamma(a+\tfrac{1}{2}) (U(a,-z)-\sin(\pi a) U(a,z)}{\pi}. |
| |
| **Examples** |
| |
| Wronskian relation between `U` and `V`:: |
| |
| >>> from mpmath import * |
| >>> mp.dps = 25; mp.pretty = True |
| >>> a, z = 2, 3 |
| >>> pcfu(a,z)*diff(pcfv,(a,z),(0,1))-diff(pcfu,(a,z),(0,1))*pcfv(a,z) |
| 0.7978845608028653558798921 |
| >>> sqrt(2/pi) |
| 0.7978845608028653558798921 |
| >>> a, z = 2.5, 3 |
| >>> pcfu(a,z)*diff(pcfv,(a,z),(0,1))-diff(pcfu,(a,z),(0,1))*pcfv(a,z) |
| 0.7978845608028653558798921 |
| >>> a, z = 0.25, -1 |
| >>> pcfu(a,z)*diff(pcfv,(a,z),(0,1))-diff(pcfu,(a,z),(0,1))*pcfv(a,z) |
| 0.7978845608028653558798921 |
| >>> a, z = 2+1j, 2+3j |
| >>> chop(pcfu(a,z)*diff(pcfv,(a,z),(0,1))-diff(pcfu,(a,z),(0,1))*pcfv(a,z)) |
| 0.7978845608028653558798921 |
| |
| """ |
| n, ntype = ctx._convert_param(a) |
| z = ctx.convert(z) |
| q = ctx.mpq_1_2 |
| r = ctx.mpq_1_4 |
| if ntype == 'Q' and ctx.isint(n*2): |
| |
| def h(): |
| jz = ctx.fmul(z, -1j, exact=True) |
| T1terms = _hermite_param(ctx, -n-q, z, 1) |
| T2terms = _hermite_param(ctx, n-q, jz, 1) |
| for T in T1terms: |
| T[0].append(1j) |
| T[1].append(1) |
| T[3].append(q-n) |
| u = ctx.expjpi((q*n-r)) * ctx.sqrt(2/ctx.pi) |
| for T in T2terms: |
| T[0].append(u) |
| T[1].append(1) |
| return T1terms + T2terms |
| v = ctx.hypercomb(h, [], **kwargs) |
| if ctx._is_real_type(n) and ctx._is_real_type(z): |
| v = ctx._re(v) |
| return v |
| else: |
| def h(n): |
| w = ctx.square_exp_arg(z, -0.25) |
| u = ctx.square_exp_arg(z, 0.5) |
| e = ctx.exp(w) |
| l = [ctx.pi, q, ctx.exp(w)] |
| Y1 = l, [-q, n*q+r, 1], [r-q*n], [], [q*n+r], [q], u |
| Y2 = l + [z], [-q, n*q-r, 1, 1], [1-r-q*n], [], [q*n+1-r], [1+q], u |
| c, s = ctx.cospi_sinpi(r+q*n) |
| Y1[0].append(s) |
| Y2[0].append(c) |
| for Y in (Y1, Y2): |
| Y[1].append(1) |
| Y[3].append(q-n) |
| return Y1, Y2 |
| return ctx.hypercomb(h, [n], **kwargs) |
|
|
|
|
| @defun |
| def pcfw(ctx, a, z, **kwargs): |
| r""" |
| Gives the parabolic cylinder function `W(a,z)` defined in (DLMF 12.14). |
| |
| **Examples** |
| |
| Value at the origin:: |
| |
| >>> from mpmath import * |
| >>> mp.dps = 25; mp.pretty = True |
| >>> a = mpf(0.25) |
| >>> pcfw(a,0) |
| 0.9722833245718180765617104 |
| >>> power(2,-0.75)*sqrt(abs(gamma(0.25+0.5j*a)/gamma(0.75+0.5j*a))) |
| 0.9722833245718180765617104 |
| >>> diff(pcfw,(a,0),(0,1)) |
| -0.5142533944210078966003624 |
| >>> -power(2,-0.25)*sqrt(abs(gamma(0.75+0.5j*a)/gamma(0.25+0.5j*a))) |
| -0.5142533944210078966003624 |
| |
| """ |
| n, _ = ctx._convert_param(a) |
| z = ctx.convert(z) |
| def terms(): |
| phi2 = ctx.arg(ctx.gamma(0.5 + ctx.j*n)) |
| phi2 = (ctx.loggamma(0.5+ctx.j*n) - ctx.loggamma(0.5-ctx.j*n))/2j |
| rho = ctx.pi/8 + 0.5*phi2 |
| |
| k = ctx.sqrt(1 + ctx.exp(2*ctx.pi*n)) - ctx.exp(ctx.pi*n) |
| C = ctx.sqrt(k/2) * ctx.exp(0.25*ctx.pi*n) |
| yield C * ctx.expj(rho) * ctx.pcfu(ctx.j*n, z*ctx.expjpi(-0.25)) |
| yield C * ctx.expj(-rho) * ctx.pcfu(-ctx.j*n, z*ctx.expjpi(0.25)) |
| v = ctx.sum_accurately(terms) |
| if ctx._is_real_type(n) and ctx._is_real_type(z): |
| v = ctx._re(v) |
| return v |
|
|
| """ |
| Even/odd PCFs. Useful? |
| |
| @defun |
| def pcfy1(ctx, a, z, **kwargs): |
| a, _ = ctx._convert_param(n) |
| z = ctx.convert(z) |
| def h(): |
| w = ctx.square_exp_arg(z) |
| w1 = ctx.fmul(w, -0.25, exact=True) |
| w2 = ctx.fmul(w, 0.5, exact=True) |
| e = ctx.exp(w1) |
| return [e], [1], [], [], [ctx.mpq_1_2*a+ctx.mpq_1_4], [ctx.mpq_1_2], w2 |
| return ctx.hypercomb(h, [], **kwargs) |
| |
| @defun |
| def pcfy2(ctx, a, z, **kwargs): |
| a, _ = ctx._convert_param(n) |
| z = ctx.convert(z) |
| def h(): |
| w = ctx.square_exp_arg(z) |
| w1 = ctx.fmul(w, -0.25, exact=True) |
| w2 = ctx.fmul(w, 0.5, exact=True) |
| e = ctx.exp(w1) |
| return [e, z], [1, 1], [], [], [ctx.mpq_1_2*a+ctx.mpq_3_4], \ |
| [ctx.mpq_3_2], w2 |
| return ctx.hypercomb(h, [], **kwargs) |
| """ |
|
|
| @defun_wrapped |
| def gegenbauer(ctx, n, a, z, **kwargs): |
| |
| if ctx.isnpint(a): |
| return 0*(z+n) |
| if ctx.isnpint(a+0.5): |
| |
| |
| if ctx.isnpint(n+1): |
| raise NotImplementedError("Gegenbauer function with two limits") |
| def h(a): |
| a2 = 2*a |
| T = [], [], [n+a2], [n+1, a2], [-n, n+a2], [a+0.5], 0.5*(1-z) |
| return [T] |
| return ctx.hypercomb(h, [a], **kwargs) |
| def h(n): |
| a2 = 2*a |
| T = [], [], [n+a2], [n+1, a2], [-n, n+a2], [a+0.5], 0.5*(1-z) |
| return [T] |
| return ctx.hypercomb(h, [n], **kwargs) |
|
|
| @defun_wrapped |
| def jacobi(ctx, n, a, b, x, **kwargs): |
| if not ctx.isnpint(a): |
| def h(n): |
| return (([], [], [a+n+1], [n+1, a+1], [-n, a+b+n+1], [a+1], (1-x)*0.5),) |
| return ctx.hypercomb(h, [n], **kwargs) |
| if not ctx.isint(b): |
| def h(n, a): |
| return (([], [], [-b], [n+1, -b-n], [-n, a+b+n+1], [b+1], (x+1)*0.5),) |
| return ctx.hypercomb(h, [n, a], **kwargs) |
| |
| return ctx.binomial(n+a,n) * ctx.hyp2f1(-n,1+n+a+b,a+1,(1-x)/2, **kwargs) |
|
|
| @defun_wrapped |
| def laguerre(ctx, n, a, z, **kwargs): |
| |
| |
| |
| def h(a): |
| return (([], [], [a+n+1], [a+1, n+1], [-n], [a+1], z),) |
| return ctx.hypercomb(h, [a], **kwargs) |
|
|
| @defun_wrapped |
| def legendre(ctx, n, x, **kwargs): |
| if ctx.isint(n): |
| n = int(n) |
| |
| if (n + (n < 0)) & 1: |
| if not x: |
| return x |
| mag = ctx.mag(x) |
| if mag < -2*ctx.prec-10: |
| return x |
| if mag < -5: |
| ctx.prec += -mag |
| return ctx.hyp2f1(-n,n+1,1,(1-x)/2, **kwargs) |
|
|
| @defun |
| def legenp(ctx, n, m, z, type=2, **kwargs): |
| |
| n = ctx.convert(n) |
| m = ctx.convert(m) |
| |
| if not m: |
| return ctx.legendre(n, z, **kwargs) |
| |
| if type == 2: |
| def h(n,m): |
| g = m*0.5 |
| T = [1+z, 1-z], [g, -g], [], [1-m], [-n, n+1], [1-m], 0.5*(1-z) |
| return (T,) |
| return ctx.hypercomb(h, [n,m], **kwargs) |
| if type == 3: |
| def h(n,m): |
| g = m*0.5 |
| T = [z+1, z-1], [g, -g], [], [1-m], [-n, n+1], [1-m], 0.5*(1-z) |
| return (T,) |
| return ctx.hypercomb(h, [n,m], **kwargs) |
| raise ValueError("requires type=2 or type=3") |
|
|
| @defun |
| def legenq(ctx, n, m, z, type=2, **kwargs): |
| |
| n = ctx.convert(n) |
| m = ctx.convert(m) |
| z = ctx.convert(z) |
| if z in (1, -1): |
| |
| |
| |
| return ctx.nan |
| if type == 2: |
| def h(n, m): |
| cos, sin = ctx.cospi_sinpi(m) |
| s = 2 * sin / ctx.pi |
| c = cos |
| a = 1+z |
| b = 1-z |
| u = m/2 |
| w = (1-z)/2 |
| T1 = [s, c, a, b], [-1, 1, u, -u], [], [1-m], \ |
| [-n, n+1], [1-m], w |
| T2 = [-s, a, b], [-1, -u, u], [n+m+1], [n-m+1, m+1], \ |
| [-n, n+1], [m+1], w |
| return T1, T2 |
| return ctx.hypercomb(h, [n, m], **kwargs) |
| if type == 3: |
| |
| |
| if abs(z) > 1: |
| def h(n, m): |
| T1 = [ctx.expjpi(m), 2, ctx.pi, z, z-1, z+1], \ |
| [1, -n-1, 0.5, -n-m-1, 0.5*m, 0.5*m], \ |
| [n+m+1], [n+1.5], \ |
| [0.5*(2+n+m), 0.5*(1+n+m)], [n+1.5], z**(-2) |
| return [T1] |
| return ctx.hypercomb(h, [n, m], **kwargs) |
| else: |
| |
| def h(n, m): |
| s = 2 * ctx.sinpi(m) / ctx.pi |
| c = ctx.expjpi(m) |
| a = 1+z |
| b = z-1 |
| u = m/2 |
| w = (1-z)/2 |
| T1 = [s, c, a, b], [-1, 1, u, -u], [], [1-m], \ |
| [-n, n+1], [1-m], w |
| T2 = [-s, c, a, b], [-1, 1, -u, u], [n+m+1], [n-m+1, m+1], \ |
| [-n, n+1], [m+1], w |
| return T1, T2 |
| return ctx.hypercomb(h, [n, m], **kwargs) |
| raise ValueError("requires type=2 or type=3") |
|
|
| @defun_wrapped |
| def chebyt(ctx, n, x, **kwargs): |
| if (not x) and ctx.isint(n) and int(ctx._re(n)) % 2 == 1: |
| return x * 0 |
| return ctx.hyp2f1(-n,n,(1,2),(1-x)/2, **kwargs) |
|
|
| @defun_wrapped |
| def chebyu(ctx, n, x, **kwargs): |
| if (not x) and ctx.isint(n) and int(ctx._re(n)) % 2 == 1: |
| return x * 0 |
| return (n+1) * ctx.hyp2f1(-n, n+2, (3,2), (1-x)/2, **kwargs) |
|
|
| @defun |
| def spherharm(ctx, l, m, theta, phi, **kwargs): |
| l = ctx.convert(l) |
| m = ctx.convert(m) |
| theta = ctx.convert(theta) |
| phi = ctx.convert(phi) |
| l_isint = ctx.isint(l) |
| l_natural = l_isint and l >= 0 |
| m_isint = ctx.isint(m) |
| if l_isint and l < 0 and m_isint: |
| return ctx.spherharm(-(l+1), m, theta, phi, **kwargs) |
| if theta == 0 and m_isint and m < 0: |
| return ctx.zero * 1j |
| if l_natural and m_isint: |
| if abs(m) > l: |
| return ctx.zero * 1j |
| |
| |
| def h(l,m): |
| absm = abs(m) |
| C = [-1, ctx.expj(m*phi), |
| (2*l+1)*ctx.fac(l+absm)/ctx.pi/ctx.fac(l-absm), |
| ctx.sin(theta)**2, |
| ctx.fac(absm), 2] |
| P = [0.5*m*(ctx.sign(m)+1), 1, 0.5, 0.5*absm, -1, -absm-1] |
| return ((C, P, [], [], [absm-l, l+absm+1], [absm+1], |
| ctx.sin(0.5*theta)**2),) |
| else: |
| |
| |
| def h(l,m): |
| if ctx.isnpint(l-m+1) or ctx.isnpint(l+m+1) or ctx.isnpint(1-m): |
| return (([0], [-1], [], [], [], [], 0),) |
| cos, sin = ctx.cos_sin(0.5*theta) |
| C = [0.5*ctx.expj(m*phi), (2*l+1)/ctx.pi, |
| ctx.gamma(l-m+1), ctx.gamma(l+m+1), |
| cos**2, sin**2] |
| P = [1, 0.5, 0.5, -0.5, 0.5*m, -0.5*m] |
| return ((C, P, [], [1-m], [-l,l+1], [1-m], sin**2),) |
| return ctx.hypercomb(h, [l,m], **kwargs) |
|
|
