我们从Python开源项目中,提取了以下9个代码示例,用于说明如何使用scipy.special.factorial()。
def FF_Yang_Dou_residual(vbyu, *args): """ The Yang_Dou residual function; to be used by numerical root finder """ (Re, rough) = args Rstar = Re / (2 * vbyu * rough) theta = np.pi * np.log( Rstar / 1.25) / np.log(100 / 1.25) alpha = (1 - np.cos(theta)) / 2 beta = 1 - (1 - 0.107) * (alpha + theta/np.pi) / 2 R = Re / (2 * vbyu) rt = 1. for i in range(1,5): rt = rt - 1. / np.e * ( i / factorial(i) * (67.8 / R) ** (2 * i)) return vbyu - (1 - rt) * R / 4. - rt * (2.5 * np.log(R) - 66.69 * R**-0.72 + 1.8 - (2.5 * np.log( (1 + alpha * Rstar / 5) / (1 + alpha * beta * Rstar / 5)) + (5.8 + 1.25) * (alpha * Rstar / ( 5 + alpha * Rstar)) ** 2 + 2.5 * (alpha * Rstar / (5 + alpha * Rstar)) - (5.8 + 1.25) * (alpha * beta * Rstar / (5 + alpha * beta * Rstar)) ** 2 - 2.5 * (alpha * beta * Rstar / ( 5 + alpha * beta * Rstar))))
def approx_expm(self,M,exp_t, scaling_terms): #approximate the exp at the beginning to estimate the number of taylor terms and scaling and squaring needed U=np.identity(len(M),dtype=M.dtype) Mt=np.identity(len(M),dtype=M.dtype) factorial=1.0 #for factorials for ii in xrange(1,exp_t): factorial*=ii Mt=np.dot(Mt,M) U+=Mt/((2.**float(ii*scaling_terms))*factorial) #scaling by 2**scaling_terms for ii in xrange(scaling_terms): U=np.dot(U,U) #squaring scaling times return U
def approx_exp(self,M,exp_t, scaling_terms): # the scaling and squaring of matrix exponential with taylor expansions U=1.0 Mt=1.0 factorial=1.0 #for factorials for ii in xrange(1,exp_t): factorial*=ii Mt=M*Mt U+=Mt/((2.**float(ii*scaling_terms))*factorial) #scaling by 2**scaling_terms for ii in xrange(scaling_terms): U=np.dot(U,U) #squaring scaling times return U
def sph_harm(m, n, az, el, type='complex'): '''Compute sphercial harmonics Parameters ---------- m : (int) Order of the spherical harmonic. abs(m) <= n n : (int) Degree of the harmonic, sometimes called l. n >= 0 az: (float) Azimuthal (longitudinal) coordinate [0, 2pi], also called Theta. el : (float) Elevation (colatitudinal) coordinate [0, pi], also called Phi. Returns ------- y_mn : (complex float) Complex spherical harmonic of order m and degree n, sampled at theta = az, phi = el ''' if type == 'legacy': return scy.sph_harm(m, n, az, el) elif type == 'real': Lnm = scy.lpmv(_np.abs(m), n, _np.cos(el)) factor_1 = (2 * n + 1) / (4 * _np.pi) factor_2 = scy.factorial(n - _np.abs(m)) / scy.factorial(n + abs(m)) if m != 0: factor_1 = 2 * factor_1 if m < 0: return (-1) ** m * _np.sqrt(factor_1 * factor_2) * Lnm * _np.sin(m * az) else: return (-1) ** m * _np.sqrt(factor_1 * factor_2) * Lnm * _np.cos(m * az) else: # For the correct Condon–Shortley phase, all m>0 need to be increased by 1 return (-1) ** _np.float_(m - (m < 0) * (m % 2)) * scy.sph_harm(m, n, az, el)
def test_factorial(): if scipy_factorial is None: return for i in range(20): assert_equal(factorial(i), scipy_factorial(i))
def factorial(N): """Compute the factorial of N. If N <= 16, use a fast lookup table; otherwise use scipy.special.factorial """ if N < len(FACTORIALS): return FACTORIALS[N] elif scipy_special is None: raise ValueError("need scipy for computing larger factorials") else: return int(scipy_special.factorial(N))
def fun(self, x, *args): self.nfev += 1 return (prod(x) - factorial(self.N)) ** 2.0
def weights(dim, degree): # 1D sigma-points (x) and weights (w) x, w = hermegauss(degree) # hermegauss() provides weights that cause posdef errors w = factorial(degree) / (degree ** 2 * hermeval(x, [0] * (degree - 1) + [1]) ** 2) return np.prod(cartesian([w] * dim), axis=1)
def run(self, t,seed=None,plot=False): """ Gillespie Implementation """ l = self.reactions[:,0] r = self.reactions[:,1] change=r-l time =0 times =[] output =[] times.append(time) output.append(self.population) while time<t: lam = np.prod(comb(self.population,l)*factorial(l),axis=-1)*self.rates lam_sum = np.sum(lam) dt = np.log(1.0/np.random.uniform(0,1))*(1.0/(lam_sum)) react = np.where(np.random.multinomial(1,lam/lam_sum)==1)[0][0] self.population = self.population + change[react] time += dt output.append(self.population) times.append(time) output = np.array(output) times = np.array(times) if plot: for i in xrange(output.shape[1]): label = self.species[i] plt.plot(times, output[:, i], label=label) plt.legend(loc='best') plt.xlabel('t') plt.title('Population Profile') plt.grid() plt.show() return times,output # def main(): # reactions = [[[1,0],[0,1]], [[0,1],[1,0]]] # rates = [1,1] # system = MassActionSystem(reactions,rates) # system.set_concentrations([2.,4.]) # system.run() # print system.current_concentrations() # print system.dydt() # system = StochasticSystem(reactions,rates) # population = [10,0] # system.set_population(population) # t,o = system.run(10,plot=True) # return
