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	/////////////// Header.proto ///////////////
	//@proto_block: h_code

	#if !defined(CYTHON_CCOMPLEX)
	#if defined(__cplusplus)
	#define CYTHON_CCOMPLEX 1
	#elif (defined(_Complex_I) && !defined(_MSC_VER)) \|\| ((defined (__STDC_VERSION__) && __STDC_VERSION__ >= 201112L) && !defined(__STDC_NO_COMPLEX__) && !defined(_MSC_VER))
	// <complex.h> should exist since C99, but only C11 defines a test to detect it.
	// MSVC defines "_Complex_I" but not "_Complex". See https://github.com/cython/cython/issues/5512
	#define CYTHON_CCOMPLEX 1
	#else
	#define CYTHON_CCOMPLEX 0
	#endif
	#endif

	#if CYTHON_CCOMPLEX
	#ifdef __cplusplus
	#include <complex>
	#else
	#include <complex.h>
	#endif
	#endif

	#if CYTHON_CCOMPLEX && !defined(__cplusplus) && defined(__sun__) && defined(__GNUC__)
	#undef _Complex_I
	#define _Complex_I 1.0fj
	#endif

	/////////////// RealImag.proto ///////////////

	#if CYTHON_CCOMPLEX
	#ifdef __cplusplus
	#define __Pyx_CREAL(z) ((z).real())
	#define __Pyx_CIMAG(z) ((z).imag())
	#else
	#define __Pyx_CREAL(z) (__real__(z))
	#define __Pyx_CIMAG(z) (__imag__(z))
	#endif
	#else
	#define __Pyx_CREAL(z) ((z).real)
	#define __Pyx_CIMAG(z) ((z).imag)
	#endif

	#if defined(__cplusplus) && CYTHON_CCOMPLEX \
	&& (defined(_WIN32) \|\| defined(__clang__) \|\| (defined(__GNUC__) && (__GNUC__ >= 5 \|\| __GNUC__ == 4 && __GNUC_MINOR__ >= 4 )) \|\| __cplusplus >= 201103)
	#define __Pyx_SET_CREAL(z,x) ((z).real(x))
	#define __Pyx_SET_CIMAG(z,y) ((z).imag(y))
	#else
	#define __Pyx_SET_CREAL(z,x) __Pyx_CREAL(z) = (x)
	#define __Pyx_SET_CIMAG(z,y) __Pyx_CIMAG(z) = (y)
	#endif

	/////////////// RealImag_Cy.proto ///////////////

	// alternative version of RealImag.proto for the case where
	// we definitely want to force it to use the Cython utility
	// code version of complex.
	// Because integer complex types simply aren't covered by
	// the C or C++ standards
	// (although practically will probably work in C++).

	#define __Pyx_CREAL_Cy(z) ((z).real)
	#define __Pyx_CIMAG_Cy(z) ((z).imag)
	#define __Pyx_SET_CREAL_Cy(z,x) __Pyx_CREAL_Cy(z) = (x)
	#define __Pyx_SET_CIMAG_Cy(z,y) __Pyx_CIMAG_cy(z) = (y)

	/////////////// RealImag_CyTypedef.proto //////////
	//@requires: RealImag
	//@requires: RealImag_Cy

	#if __cplusplus
	// C++ is fine with complexes based on typedefs because the template sees through them
	#define __Pyx_CREAL_CyTypedef(z) __Pyx_CREAL(z)
	#define __Pyx_CIMAG_CyTypedef(z) __Pyx_CIMAG(z)
	#define __Pyx_SET_CREAL_CyTypedef(z,x) __Pyx_SET_CREAL(z)
	#define __Pyx_SET_CIMAG_CyTypedef(z,x) __Pyx_SET_CIMAG(z)
	#else
	// C isn't
	#define __Pyx_CREAL_CyTypedef(z) __Pyx_CREAL_Cy(z)
	#define __Pyx_CIMAG_CyTypedef(z) __Pyx_CIMAG_Cy(z)
	#define __Pyx_SET_CREAL_CyTypedef(z,x) __Pyx_SET_CREAL_Cy(z)
	#define __Pyx_SET_CIMAG_CyTypedef(z,x) __Pyx_SET_CIMAG_Cy(z)
	#endif

	/////////////// Declarations.proto ///////////////
	//@proto_block: complex_type_declarations

	#if CYTHON_CCOMPLEX && ({{is_float}}) && (!{{is_extern_float_typedef}} \|\| __cplusplus)
	#ifdef __cplusplus
	typedef ::std::complex< {{real_type}} > {{type_name}};
	#else
	typedef {{real_type}} _Complex {{type_name}};
	#endif
	#else
	typedef struct { {{real_type}} real, imag; } {{type_name}};
	#endif

	static CYTHON_INLINE {{type}} {{type_name}}_from_parts({{real_type}}, {{real_type}});

	/////////////// Declarations ///////////////

	#if CYTHON_CCOMPLEX && ({{is_float}}) && (!{{is_extern_float_typedef}} \|\| __cplusplus)
	#ifdef __cplusplus
	static CYTHON_INLINE {{type}} {{type_name}}_from_parts({{real_type}} x, {{real_type}} y) {
	return ::std::complex< {{real_type}} >(x, y);
	}
	#else
	static CYTHON_INLINE {{type}} {{type_name}}_from_parts({{real_type}} x, {{real_type}} y) {
	return x + y*({{type}})_Complex_I;
	}
	#endif
	#else
	static CYTHON_INLINE {{type}} {{type_name}}_from_parts({{real_type}} x, {{real_type}} y) {
	{{type}} z;
	z.real = x;
	z.imag = y;
	return z;
	}
	#endif


	/////////////// ToPy.proto ///////////////

	{{py: func_suffix = "_CyTypedef" if is_extern_float_typedef else ("" if is_float else "_Cy")}}
	#define __pyx_PyComplex_FromComplex{{func_suffix}}(z) \
	PyComplex_FromDoubles((double)__Pyx_CREAL{{func_suffix}}(z), \
	(double)__Pyx_CIMAG{{func_suffix}}(z))

	/////////////// FromPy.proto ///////////////

	static {{type}} __Pyx_PyComplex_As_{{type_name}}(PyObject*);

	/////////////// FromPy ///////////////

	static {{type}} __Pyx_PyComplex_As_{{type_name}}(PyObject* o) {
	#if CYTHON_COMPILING_IN_LIMITED_API
	double real=-1.0, imag=-1.0;
	real = PyComplex_RealAsDouble(o);
	if (unlikely(real == -1.0 && PyErr_Occurred())) goto end;
	imag = PyComplex_ImagAsDouble(o);
	// No error check on imag since we do the same thing either way
	end:
	return {{type_name}}_from_parts(
	({{real_type}})real, ({{real_type}})imag
	);
	#else
	Py_complex cval;
	#if !CYTHON_COMPILING_IN_PYPY && !CYTHON_COMPILING_IN_GRAAL
	if (PyComplex_CheckExact(o))
	cval = ((PyComplexObject *)o)->cval;
	else
	#endif
	cval = PyComplex_AsCComplex(o);
	return {{type_name}}_from_parts(
	({{real_type}})cval.real,
	({{real_type}})cval.imag);
	#endif
	}


	/////////////// Arithmetic.proto ///////////////

	#if CYTHON_CCOMPLEX && ({{is_float}}) && (!{{is_extern_float_typedef}} \|\| __cplusplus)
	#define __Pyx_c_eq{{func_suffix}}(a, b) ((a)==(b))
	#define __Pyx_c_sum{{func_suffix}}(a, b) ((a)+(b))
	#define __Pyx_c_diff{{func_suffix}}(a, b) ((a)-(b))
	#define __Pyx_c_prod{{func_suffix}}(a, b) ((a)*(b))
	#define __Pyx_c_quot{{func_suffix}}(a, b) ((a)/(b))
	#define __Pyx_c_neg{{func_suffix}}(a) (-(a))
	#ifdef __cplusplus
	#define __Pyx_c_is_zero{{func_suffix}}(z) ((z)==({{real_type}})0)
	#define __Pyx_c_conj{{func_suffix}}(z) (::std::conj(z))
	#if {{is_float}}
	#define __Pyx_c_abs{{func_suffix}}(z) (::std::abs(z))
	#define __Pyx_c_pow{{func_suffix}}(a, b) (::std::pow(a, b))
	#endif
	#else
	#define __Pyx_c_is_zero{{func_suffix}}(z) ((z)==0)
	#define __Pyx_c_conj{{func_suffix}}(z) (conj{{m}}(z))
	#if {{is_float}}
	#define __Pyx_c_abs{{func_suffix}}(z) (cabs{{m}}(z))
	#define __Pyx_c_pow{{func_suffix}}(a, b) (cpow{{m}}(a, b))
	#endif
	#endif
	#else
	static CYTHON_INLINE int __Pyx_c_eq{{func_suffix}}({{type}}, {{type}});
	static CYTHON_INLINE {{type}} __Pyx_c_sum{{func_suffix}}({{type}}, {{type}});
	static CYTHON_INLINE {{type}} __Pyx_c_diff{{func_suffix}}({{type}}, {{type}});
	static CYTHON_INLINE {{type}} __Pyx_c_prod{{func_suffix}}({{type}}, {{type}});
	static CYTHON_INLINE {{type}} __Pyx_c_quot{{func_suffix}}({{type}}, {{type}});
	static CYTHON_INLINE {{type}} __Pyx_c_neg{{func_suffix}}({{type}});
	static CYTHON_INLINE int __Pyx_c_is_zero{{func_suffix}}({{type}});
	static CYTHON_INLINE {{type}} __Pyx_c_conj{{func_suffix}}({{type}});
	#if {{is_float}}
	static CYTHON_INLINE {{real_type}} __Pyx_c_abs{{func_suffix}}({{type}});
	static CYTHON_INLINE {{type}} __Pyx_c_pow{{func_suffix}}({{type}}, {{type}});
	#endif
	#endif

	/////////////// Arithmetic ///////////////

	#if CYTHON_CCOMPLEX && ({{is_float}}) && (!{{is_extern_float_typedef}} \|\| __cplusplus)
	#else
	static CYTHON_INLINE int __Pyx_c_eq{{func_suffix}}({{type}} a, {{type}} b) {
	return (a.real == b.real) && (a.imag == b.imag);
	}
	static CYTHON_INLINE {{type}} __Pyx_c_sum{{func_suffix}}({{type}} a, {{type}} b) {
	{{type}} z;
	z.real = a.real + b.real;
	z.imag = a.imag + b.imag;
	return z;
	}
	static CYTHON_INLINE {{type}} __Pyx_c_diff{{func_suffix}}({{type}} a, {{type}} b) {
	{{type}} z;
	z.real = a.real - b.real;
	z.imag = a.imag - b.imag;
	return z;
	}
	static CYTHON_INLINE {{type}} __Pyx_c_prod{{func_suffix}}({{type}} a, {{type}} b) {
	{{type}} z;
	z.real = a.real * b.real - a.imag * b.imag;
	z.imag = a.real * b.imag + a.imag * b.real;
	return z;
	}

	#if {{is_float}}
	static CYTHON_INLINE {{type}} __Pyx_c_quot{{func_suffix}}({{type}} a, {{type}} b) {
	if (b.imag == 0) {
	return {{type_name}}_from_parts(a.real / b.real, a.imag / b.real);
	} else if (fabs{{m}}(b.real) >= fabs{{m}}(b.imag)) {
	if (b.real == 0 && b.imag == 0) {
	return {{type_name}}_from_parts(a.real / b.real, a.imag / b.imag);
	} else {
	{{real_type}} r = b.imag / b.real;
	{{real_type}} s = ({{real_type}})(1.0) / (b.real + b.imag * r);
	return {{type_name}}_from_parts(
	(a.real + a.imag * r) * s, (a.imag - a.real * r) * s);
	}
	} else {
	{{real_type}} r = b.real / b.imag;
	{{real_type}} s = ({{real_type}})(1.0) / (b.imag + b.real * r);
	return {{type_name}}_from_parts(
	(a.real * r + a.imag) * s, (a.imag * r - a.real) * s);
	}
	}
	#else
	static CYTHON_INLINE {{type}} __Pyx_c_quot{{func_suffix}}({{type}} a, {{type}} b) {
	if (b.imag == 0) {
	return {{type_name}}_from_parts(a.real / b.real, a.imag / b.real);
	} else {
	{{real_type}} denom = b.real * b.real + b.imag * b.imag;
	return {{type_name}}_from_parts(
	(a.real * b.real + a.imag * b.imag) / denom,
	(a.imag * b.real - a.real * b.imag) / denom);
	}
	}
	#endif

	static CYTHON_INLINE {{type}} __Pyx_c_neg{{func_suffix}}({{type}} a) {
	{{type}} z;
	z.real = -a.real;
	z.imag = -a.imag;
	return z;
	}
	static CYTHON_INLINE int __Pyx_c_is_zero{{func_suffix}}({{type}} a) {
	return (a.real == 0) && (a.imag == 0);
	}
	static CYTHON_INLINE {{type}} __Pyx_c_conj{{func_suffix}}({{type}} a) {
	{{type}} z;
	z.real = a.real;
	z.imag = -a.imag;
	return z;
	}
	#if {{is_float}}
	static CYTHON_INLINE {{real_type}} __Pyx_c_abs{{func_suffix}}({{type}} z) {
	#if !defined(HAVE_HYPOT) \|\| defined(_MSC_VER)
	return sqrt{{m}}(z.realz.real + z.imagz.imag);
	#else
	return hypot{{m}}(z.real, z.imag);
	#endif
	}
	static CYTHON_INLINE {{type}} __Pyx_c_pow{{func_suffix}}({{type}} a, {{type}} b) {
	{{type}} z;
	{{real_type}} r, lnr, theta, z_r, z_theta;
	if (b.imag == 0 && b.real == (int)b.real) {
	if (b.real < 0) {
	{{real_type}} denom = a.real * a.real + a.imag * a.imag;
	a.real = a.real / denom;
	a.imag = -a.imag / denom;
	b.real = -b.real;
	}
	switch ((int)b.real) {
	case 0:
	z.real = 1;
	z.imag = 0;
	return z;
	case 1:
	return a;
	case 2:
	return __Pyx_c_prod{{func_suffix}}(a, a);
	case 3:
	z = __Pyx_c_prod{{func_suffix}}(a, a);
	return __Pyx_c_prod{{func_suffix}}(z, a);
	case 4:
	z = __Pyx_c_prod{{func_suffix}}(a, a);
	return __Pyx_c_prod{{func_suffix}}(z, z);
	}
	}
	if (a.imag == 0) {
	if (a.real == 0) {
	return a;
	} else if ((b.imag == 0) && (a.real >= 0)) {
	z.real = pow{{m}}(a.real, b.real);
	z.imag = 0;
	return z;
	} else if (a.real > 0) {
	r = a.real;
	theta = 0;
	} else {
	r = -a.real;
	theta = atan2{{m}}(0.0, -1.0);
	}
	} else {
	r = __Pyx_c_abs{{func_suffix}}(a);
	theta = atan2{{m}}(a.imag, a.real);
	}
	lnr = log{{m}}(r);
	z_r = exp{{m}}(lnr * b.real - theta * b.imag);
	z_theta = theta * b.real + lnr * b.imag;
	z.real = z_r * cos{{m}}(z_theta);
	z.imag = z_r * sin{{m}}(z_theta);
	return z;
	}
	#endif
	#endif

	/////////////// SoftComplexToDouble.proto //////////////////

	static double __Pyx_SoftComplexToDouble(__pyx_t_double_complex value, int have_nogil); /* proto */

	/////////////// SoftComplexToDouble //////////////////
	//@requires: RealImag

	static double __Pyx_SoftComplexToDouble(__pyx_t_double_complex value, int have_nogil) {
	// This isn't an absolutely perfect match for the Python behaviour:
	// In Python the type would be determined right after the number is
	// created (usually '**'), while here it's determined when coerced
	// to a PyObject, which may be a few operations later.
	if (unlikely(__Pyx_CIMAG(value))) {
	PyGILState_STATE gilstate;
	if (have_nogil)
	gilstate = PyGILState_Ensure();
	PyErr_SetString(PyExc_TypeError,
	"Cannot convert 'complex' with non-zero imaginary component to 'double' "
	"(this most likely comes from the '**' operator; "
	"use 'cython.cpow(True)' to return 'nan' instead of a "
	"complex number).");
	if (have_nogil)
	PyGILState_Release(gilstate);
	return -1.;
	}
	return __Pyx_CREAL(value);
	}

	///////// SoftComplexToPy.proto ///////////////////////

	static PyObject __pyx_Py_FromSoftComplex(__pyx_t_double_complex value); / proto */

	//////// SoftComplexToPy ////////////////
	//@requires: RealImag

	static PyObject *__pyx_Py_FromSoftComplex(__pyx_t_double_complex value) {
	if (__Pyx_CIMAG(value)) {
	return PyComplex_FromDoubles(__Pyx_CREAL(value), __Pyx_CIMAG(value));
	} else {
	return PyFloat_FromDouble(__Pyx_CREAL(value));
	}
	}