/* Complex object implementation */ /* Borrows heavily from floatobject.c */ /* Submitted by Jim Hugunin */ #include "Python.h" #include "structmember.h" /*[clinic input] class complex "PyComplexObject *" "&PyComplex_Type" [clinic start generated code]*/ /*[clinic end generated code: output=da39a3ee5e6b4b0d input=819e057d2d10f5ec]*/ #include "clinic/complexobject.c.h" /* elementary operations on complex numbers */ static Py_complex c_1 = {1., 0.}; Py_complex _Py_c_sum(Py_complex a, Py_complex b) { Py_complex r; r.real = a.real + b.real; r.imag = a.imag + b.imag; return r; } Py_complex _Py_c_diff(Py_complex a, Py_complex b) { Py_complex r; r.real = a.real - b.real; r.imag = a.imag - b.imag; return r; } Py_complex _Py_c_neg(Py_complex a) { Py_complex r; r.real = -a.real; r.imag = -a.imag; return r; } Py_complex _Py_c_prod(Py_complex a, Py_complex b) { Py_complex r; r.real = a.real*b.real - a.imag*b.imag; r.imag = a.real*b.imag + a.imag*b.real; return r; } Py_complex _Py_c_quot(Py_complex a, Py_complex b) { /****************************************************************** This was the original algorithm. It's grossly prone to spurious overflow and underflow errors. It also merrily divides by 0 despite checking for that(!). The code still serves a doc purpose here, as the algorithm following is a simple by-cases transformation of this one: Py_complex r; double d = b.real*b.real + b.imag*b.imag; if (d == 0.) errno = EDOM; r.real = (a.real*b.real + a.imag*b.imag)/d; r.imag = (a.imag*b.real - a.real*b.imag)/d; return r; ******************************************************************/ /* This algorithm is better, and is pretty obvious: first divide the * numerators and denominator by whichever of {b.real, b.imag} has * larger magnitude. The earliest reference I found was to CACM * Algorithm 116 (Complex Division, Robert L. Smith, Stanford * University). As usual, though, we're still ignoring all IEEE * endcases. */ Py_complex r; /* the result */ const double abs_breal = b.real < 0 ? -b.real : b.real; const double abs_bimag = b.imag < 0 ? -b.imag : b.imag; if (abs_breal >= abs_bimag) { /* divide tops and bottom by b.real */ if (abs_breal == 0.0) { errno = EDOM; r.real = r.imag = 0.0; } else { const double ratio = b.imag / b.real; const double denom = b.real + b.imag * ratio; r.real = (a.real + a.imag * ratio) / denom; r.imag = (a.imag - a.real * ratio) / denom; } } else if (abs_bimag >= abs_breal) { /* divide tops and bottom by b.imag */ const double ratio = b.real / b.imag; const double denom = b.real * ratio + b.imag; assert(b.imag != 0.0); r.real = (a.real * ratio + a.imag) / denom; r.imag = (a.imag * ratio - a.real) / denom; } else { /* At least one of b.real or b.imag is a NaN */ r.real = r.imag = Py_NAN; } return r; } Py_complex _Py_c_pow(Py_complex a, Py_complex b) { Py_complex r; double vabs,len,at,phase; if (b.real == 0. && b.imag == 0.) { r.real = 1.; r.imag = 0.; } else if (a.real == 0. && a.imag == 0.) { if (b.imag != 0. || b.real < 0.) errno = EDOM; r.real = 0.; r.imag = 0.; } else { vabs = hypot(a.real,a.imag); len = pow(vabs,b.real); at = atan2(a.imag, a.real); phase = at*b.real; if (b.imag != 0.0) { len /= exp(at*b.imag); phase += b.imag*log(vabs); } r.real = len*cos(phase); r.imag = len*sin(phase); } return r; } static Py_complex c_powu(Py_complex x, long n) { Py_complex r, p; long mask = 1; r = c_1; p = x; while (mask > 0 && n >= mask) { if (n & mask) r = _Py_c_prod(r,p); mask <<= 1; p = _Py_c_prod(p,p); } return r; } static Py_complex c_powi(Py_complex x, long n) { Py_complex cn; if (n > 100 || n < -100) { cn.real = (double) n; cn.imag = 0.; return _Py_c_pow(x,cn); } else if (n > 0) return c_powu(x,n); else return _Py_c_quot(c_1, c_powu(x,-n)); } double _Py_c_abs(Py_complex z) { /* sets errno = ERANGE on overflow; otherwise errno = 0 */ double result; if (!Py_IS_FINITE(z.real) || !Py_IS_FINITE(z.imag)) { /* C99 rules: if either the real or the imaginary part is an infinity, return infinity, even if the other part is a NaN. */ if (Py_IS_INFINITY(z.real)) { result = fabs(z.real); errno = 0; return result; } if (Py_IS_INFINITY(z.imag)) { result = fabs(z.imag); errno = 0; return result; } /* either the real or imaginary part is a NaN, and neither is infinite. Result should be NaN. */ return Py_NAN; } result = hypot(z.real, z.imag); if (!Py_IS_FINITE(result)) errno = ERANGE; else errno = 0; return result; } static PyObject * complex_subtype_from_c_complex(PyTypeObject *type, Py_complex cval) { PyObject *op; op = type->tp_alloc(type, 0); if (op != NULL) ((PyComplexObject *)op)->cval = cval; return op; } PyObject * PyComplex_FromCComplex(Py_complex cval) { PyComplexObject *op; /* Inline PyObject_New */ op = (PyComplexObject *) PyObject_MALLOC(sizeof(PyComplexObject)); if (op == NULL) return PyErr_NoMemory(); (void)PyObject_INIT(op, &PyComplex_Type); op->cval = cval; return (PyObject *) op; } static PyObject * complex_subtype_from_doubles(PyTypeObject *type, double real, double imag) { Py_complex c; c.real = real; c.imag = imag; return complex_subtype_from_c_complex(type, c); } PyObject * PyComplex_FromDoubles(double real, double imag) { Py_complex c; c.real = real; c.imag = imag; return PyComplex_FromCComplex(c); } double PyComplex_RealAsDouble(PyObject *op) { if (PyComplex_Check(op)) { return ((PyComplexObject *)op)->cval.real; } else { return PyFloat_AsDouble(op); } } double PyComplex_ImagAsDouble(PyObject *op) { if (PyComplex_Check(op)) { return ((PyComplexObject *)op)->cval.imag; } else { return 0.0; } } static PyObject * try_complex_special_method(PyObject *op) { PyObject *f; _Py_IDENTIFIER(__complex__); f = _PyObject_LookupSpecial(op, &PyId___complex__); if (f) { PyObject *res = _PyObject_CallNoArg(f); Py_DECREF(f); if (res != NULL && !PyComplex_Check(res)) { PyErr_SetString(PyExc_TypeError, "__complex__ should return a complex object"); Py_DECREF(res); return NULL; } return res; } return NULL; } Py_complex PyComplex_AsCComplex(PyObject *op) { Py_complex cv; PyObject *newop = NULL; assert(op); /* If op is already of type PyComplex_Type, return its value */ if (PyComplex_Check(op)) { return ((PyComplexObject *)op)->cval; } /* If not, use op's __complex__ method, if it exists */ /* return -1 on failure */ cv.real = -1.; cv.imag = 0.; newop = try_complex_special_method(op); if (newop) { cv = ((PyComplexObject *)newop)->cval; Py_DECREF(newop); return cv; } else if (PyErr_Occurred()) { return cv; } /* If neither of the above works, interpret op as a float giving the real part of the result, and fill in the imaginary part as 0. */ else { /* PyFloat_AsDouble will return -1 on failure */ cv.real = PyFloat_AsDouble(op); return cv; } } static void complex_dealloc(PyObject *op) { op->ob_type->tp_free(op); } static PyObject * complex_repr(PyComplexObject *v) { int precision = 0; char format_code = 'r'; PyObject *result = NULL; /* If these are non-NULL, they'll need to be freed. */ char *pre = NULL; char *im = NULL; /* These do not need to be freed. re is either an alias for pre or a pointer to a constant. lead and tail are pointers to constants. */ char *re = NULL; char *lead = ""; char *tail = ""; if (v->cval.real == 0. && copysign(1.0, v->cval.real)==1.0) { /* Real part is +0: just output the imaginary part and do not include parens. */ re = ""; im = PyOS_double_to_string(v->cval.imag, format_code, precision, 0, NULL); if (!im) { PyErr_NoMemory(); goto done; } } else { /* Format imaginary part with sign, real part without. Include parens in the result. */ pre = PyOS_double_to_string(v->cval.real, format_code, precision, 0, NULL); if (!pre) { PyErr_NoMemory(); goto done; } re = pre; im = PyOS_double_to_string(v->cval.imag, format_code, precision, Py_DTSF_SIGN, NULL); if (!im) { PyErr_NoMemory(); goto done; } lead = "("; tail = ")"; } result = PyUnicode_FromFormat("%s%s%sj%s", lead, re, im, tail); done: PyMem_Free(im); PyMem_Free(pre); return result; } static Py_hash_t complex_hash(PyComplexObject *v) { Py_uhash_t hashreal, hashimag, combined; hashreal = (Py_uhash_t)_Py_HashDouble(v->cval.real); if (hashreal == (Py_uhash_t)-1) return -1; hashimag = (Py_uhash_t)_Py_HashDouble(v->cval.imag); if (hashimag == (Py_uhash_t)-1) return -1; /* Note: if the imaginary part is 0, hashimag is 0 now, * so the following returns hashreal unchanged. This is * important because numbers of different types that * compare equal must have the same hash value, so that * hash(x + 0*j) must equal hash(x). */ combined = hashreal + _PyHASH_IMAG * hashimag; if (combined == (Py_uhash_t)-1) combined = (Py_uhash_t)-2; return (Py_hash_t)combined; } /* This macro may return! */ #define TO_COMPLEX(obj, c) \ if (PyComplex_Check(obj)) \ c = ((PyComplexObject *)(obj))->cval; \ else if (to_complex(&(obj), &(c)) < 0) \ return (obj) static int to_complex(PyObject **pobj, Py_complex *pc) { PyObject *obj = *pobj; pc->real = pc->imag = 0.0; if (PyLong_Check(obj)) { pc->real = PyLong_AsDouble(obj); if (pc->real == -1.0 && PyErr_Occurred()) { *pobj = NULL; return -1; } return 0; } if (PyFloat_Check(obj)) { pc->real = PyFloat_AsDouble(obj); return 0; } Py_INCREF(Py_NotImplemented); *pobj = Py_NotImplemented; return -1; } static PyObject * complex_add(PyObject *v, PyObject *w) { Py_complex result; Py_complex a, b; TO_COMPLEX(v, a); TO_COMPLEX(w, b); PyFPE_START_PROTECT("complex_add", return 0) result = _Py_c_sum(a, b); PyFPE_END_PROTECT(result) return PyComplex_FromCComplex(result); } static PyObject * complex_sub(PyObject *v, PyObject *w) { Py_complex result; Py_complex a, b; TO_COMPLEX(v, a); TO_COMPLEX(w, b); PyFPE_START_PROTECT("complex_sub", return 0) result = _Py_c_diff(a, b); PyFPE_END_PROTECT(result) return PyComplex_FromCComplex(result); } static PyObject * complex_mul(PyObject *v, PyObject *w) { Py_complex result; Py_complex a, b; TO_COMPLEX(v, a); TO_COMPLEX(w, b); PyFPE_START_PROTECT("complex_mul", return 0) result = _Py_c_prod(a, b); PyFPE_END_PROTECT(result) return PyComplex_FromCComplex(result); } static PyObject * complex_div(PyObject *v, PyObject *w) { Py_complex quot; Py_complex a, b; TO_COMPLEX(v, a); TO_COMPLEX(w, b); PyFPE_START_PROTECT("complex_div", return 0) errno = 0; quot = _Py_c_quot(a, b); PyFPE_END_PROTECT(quot) if (errno == EDOM) { PyErr_SetString(PyExc_ZeroDivisionError, "complex division by zero"); return NULL; } return PyComplex_FromCComplex(quot); } static PyObject * complex_remainder(PyObject *v, PyObject *w) { PyErr_SetString(PyExc_TypeError, "can't mod complex numbers."); return NULL; } static PyObject * complex_divmod(PyObject *v, PyObject *w) { PyErr_SetString(PyExc_TypeError, "can't take floor or mod of complex number."); return NULL; } static PyObject * complex_pow(PyObject *v, PyObject *w, PyObject *z) { Py_complex p; Py_complex exponent; long int_exponent; Py_complex a, b; TO_COMPLEX(v, a); TO_COMPLEX(w, b); if (z != Py_None) { PyErr_SetString(PyExc_ValueError, "complex modulo"); return NULL; } PyFPE_START_PROTECT("complex_pow", return 0) errno = 0; exponent = b; int_exponent = (long)exponent.real; if (exponent.imag == 0. && exponent.real == int_exponent) p = c_powi(a, int_exponent); else p = _Py_c_pow(a, exponent); PyFPE_END_PROTECT(p) Py_ADJUST_ERANGE2(p.real, p.imag); if (errno == EDOM) { PyErr_SetString(PyExc_ZeroDivisionError, "0.0 to a negative or complex power"); return NULL; } else if (errno == ERANGE) { PyErr_SetString(PyExc_OverflowError, "complex exponentiation"); return NULL; } return PyComplex_FromCComplex(p); } static PyObject * complex_int_div(PyObject *v, PyObject *w) { PyErr_SetString(PyExc_TypeError, "can't take floor of complex number."); return NULL; } static PyObject * complex_neg(PyComplexObject *v) { Py_complex neg; neg.real = -v->cval.real; neg.imag = -v->cval.imag; return PyComplex_FromCComplex(neg); } static PyObject * complex_pos(PyComplexObject *v) { if (PyComplex_CheckExact(v)) { Py_INCREF(v); return (PyObject *)v; } else return PyComplex_FromCComplex(v->cval); } static PyObject * complex_abs(PyComplexObject *v) { double result; PyFPE_START_PROTECT("complex_abs", return 0) result = _Py_c_abs(v->cval); PyFPE_END_PROTECT(result) if (errno == ERANGE) { PyErr_SetString(PyExc_OverflowError, "absolute value too large"); return NULL; } return PyFloat_FromDouble(result); } static int complex_bool(PyComplexObject *v) { return v->cval.real != 0.0 || v->cval.imag != 0.0; } static PyObject * complex_richcompare(PyObject *v, PyObject *w, int op) { PyObject *res; Py_complex i; int equal; if (op != Py_EQ && op != Py_NE) { goto Unimplemented; } assert(PyComplex_Check(v)); TO_COMPLEX(v, i); if (PyLong_Check(w)) { /* Check for 0.0 imaginary part first to avoid the rich * comparison when possible. */ if (i.imag == 0.0) { PyObject *j, *sub_res; j = PyFloat_FromDouble(i.real); if (j == NULL) return NULL; sub_res = PyObject_RichCompare(j, w, op); Py_DECREF(j); return sub_res; } else { equal = 0; } } else if (PyFloat_Check(w)) { equal = (i.real == PyFloat_AsDouble(w) && i.imag == 0.0); } else if (PyComplex_Check(w)) { Py_complex j; TO_COMPLEX(w, j); equal = (i.real == j.real && i.imag == j.imag); } else { goto Unimplemented; } if (equal == (op == Py_EQ)) res = Py_True; else res = Py_False; Py_INCREF(res); return res; Unimplemented: Py_RETURN_NOTIMPLEMENTED; } static PyObject * complex_int(PyObject *v) { PyErr_SetString(PyExc_TypeError, "can't convert complex to int"); return NULL; } static PyObject * complex_float(PyObject *v) { PyErr_SetString(PyExc_TypeError, "can't convert complex to float"); return NULL; } static PyObject * complex_conjugate(PyObject *self) { Py_complex c; c = ((PyComplexObject *)self)->cval; c.imag = -c.imag; return PyComplex_FromCComplex(c); } PyDoc_STRVAR(complex_conjugate_doc, "complex.conjugate() -> complex\n" "\n" "Return the complex conjugate of its argument. (3-4j).conjugate() == 3+4j."); static PyObject * complex_getnewargs(PyComplexObject *v) { Py_complex c = v->cval; return Py_BuildValue("(dd)", c.real, c.imag); } PyDoc_STRVAR(complex__format__doc, "complex.__format__() -> str\n" "\n" "Convert to a string according to format_spec."); static PyObject * complex__format__(PyObject* self, PyObject* args) { PyObject *format_spec; _PyUnicodeWriter writer; int ret; if (!PyArg_ParseTuple(args, "U:__format__", &format_spec)) return NULL; _PyUnicodeWriter_Init(&writer); ret = _PyComplex_FormatAdvancedWriter( &writer, self, format_spec, 0, PyUnicode_GET_LENGTH(format_spec)); if (ret == -1) { _PyUnicodeWriter_Dealloc(&writer); return NULL; } return _PyUnicodeWriter_Finish(&writer); } #if 0 static PyObject * complex_is_finite(PyObject *self) { Py_complex c; c = ((PyComplexObject *)self)->cval; return PyBool_FromLong((long)(Py_IS_FINITE(c.real) && Py_IS_FINITE(c.imag))); } PyDoc_STRVAR(complex_is_finite_doc, "complex.is_finite() -> bool\n" "\n" "Returns True if the real and the imaginary part is finite."); #endif static PyMethodDef complex_methods[] = { {"conjugate", (PyCFunction)complex_conjugate, METH_NOARGS, complex_conjugate_doc}, #if 0 {"is_finite", (PyCFunction)complex_is_finite, METH_NOARGS, complex_is_finite_doc}, #endif {"__getnewargs__", (PyCFunction)complex_getnewargs, METH_NOARGS}, {"__format__", (PyCFunction)complex__format__, METH_VARARGS, complex__format__doc}, {NULL, NULL} /* sentinel */ }; static PyMemberDef complex_members[] = { {"real", T_DOUBLE, offsetof(PyComplexObject, cval.real), READONLY, "the real part of a complex number"}, {"imag", T_DOUBLE, offsetof(PyComplexObject, cval.imag), READONLY, "the imaginary part of a complex number"}, {0}, }; static PyObject * complex_from_string_inner(const char *s, Py_ssize_t len, void *type) { double x=0.0, y=0.0, z; int got_bracket=0; const char *start; char *end; /* position on first nonblank */ start = s; while (Py_ISSPACE(*s)) s++; if (*s == '(') { /* Skip over possible bracket from repr(). */ got_bracket = 1; s++; while (Py_ISSPACE(*s)) s++; } /* a valid complex string usually takes one of the three forms: - real part only j - imaginary part only j - real and imaginary parts where represents any numeric string that's accepted by the float constructor (including 'nan', 'inf', 'infinity', etc.), and is any string of the form whose first character is '+' or '-'. For backwards compatibility, the extra forms j j j are also accepted, though support for these forms may be removed from a future version of Python. */ /* first look for forms starting with */ z = PyOS_string_to_double(s, &end, NULL); if (z == -1.0 && PyErr_Occurred()) { if (PyErr_ExceptionMatches(PyExc_ValueError)) PyErr_Clear(); else return NULL; } if (end != s) { /* all 4 forms starting with land here */ s = end; if (*s == '+' || *s == '-') { /* j | j */ x = z; y = PyOS_string_to_double(s, &end, NULL); if (y == -1.0 && PyErr_Occurred()) { if (PyErr_ExceptionMatches(PyExc_ValueError)) PyErr_Clear(); else return NULL; } if (end != s) /* j */ s = end; else { /* j */ y = *s == '+' ? 1.0 : -1.0; s++; } if (!(*s == 'j' || *s == 'J')) goto parse_error; s++; } else if (*s == 'j' || *s == 'J') { /* j */ s++; y = z; } else /* */ x = z; } else { /* not starting with ; must be j or j */ if (*s == '+' || *s == '-') { /* j */ y = *s == '+' ? 1.0 : -1.0; s++; } else /* j */ y = 1.0; if (!(*s == 'j' || *s == 'J')) goto parse_error; s++; } /* trailing whitespace and closing bracket */ while (Py_ISSPACE(*s)) s++; if (got_bracket) { /* if there was an opening parenthesis, then the corresponding closing parenthesis should be right here */ if (*s != ')') goto parse_error; s++; while (Py_ISSPACE(*s)) s++; } /* we should now be at the end of the string */ if (s-start != len) goto parse_error; return complex_subtype_from_doubles((PyTypeObject *)type, x, y); parse_error: PyErr_SetString(PyExc_ValueError, "complex() arg is a malformed string"); return NULL; } static PyObject * complex_subtype_from_string(PyTypeObject *type, PyObject *v) { const char *s; PyObject *s_buffer = NULL, *result = NULL; Py_ssize_t len; if (PyUnicode_Check(v)) { s_buffer = _PyUnicode_TransformDecimalAndSpaceToASCII(v); if (s_buffer == NULL) { return NULL; } s = PyUnicode_AsUTF8AndSize(s_buffer, &len); if (s == NULL) { goto exit; } } else { PyErr_Format(PyExc_TypeError, "complex() argument must be a string or a number, not '%.200s'", Py_TYPE(v)->tp_name); return NULL; } result = _Py_string_to_number_with_underscores(s, len, "complex", v, type, complex_from_string_inner); exit: Py_DECREF(s_buffer); return result; } /*[clinic input] @classmethod complex.__new__ as complex_new real as r: object(c_default="Py_False") = 0 imag as i: object(c_default="NULL") = 0 Create a complex number from a real part and an optional imaginary part. This is equivalent to (real + imag*1j) where imag defaults to 0. [clinic start generated code]*/ static PyObject * complex_new_impl(PyTypeObject *type, PyObject *r, PyObject *i) /*[clinic end generated code: output=b6c7dd577b537dc1 input=e3d6b77ddcf280da]*/ { PyObject *tmp; PyNumberMethods *nbr, *nbi = NULL; Py_complex cr, ci; int own_r = 0; int cr_is_complex = 0; int ci_is_complex = 0; /* Special-case for a single argument when type(arg) is complex. */ if (PyComplex_CheckExact(r) && i == NULL && type == &PyComplex_Type) { /* Note that we can't know whether it's safe to return a complex *subclass* instance as-is, hence the restriction to exact complexes here. If either the input or the output is a complex subclass, it will be handled below as a non-orthogonal vector. */ Py_INCREF(r); return r; } if (PyUnicode_Check(r)) { if (i != NULL) { PyErr_SetString(PyExc_TypeError, "complex() can't take second arg" " if first is a string"); return NULL; } return complex_subtype_from_string(type, r); } if (i != NULL && PyUnicode_Check(i)) { PyErr_SetString(PyExc_TypeError, "complex() second arg can't be a string"); return NULL; } tmp = try_complex_special_method(r); if (tmp) { r = tmp; own_r = 1; } else if (PyErr_Occurred()) { return NULL; } nbr = r->ob_type->tp_as_number; if (nbr == NULL || nbr->nb_float == NULL) { PyErr_Format(PyExc_TypeError, "complex() first argument must be a string or a number, " "not '%.200s'", Py_TYPE(r)->tp_name); if (own_r) { Py_DECREF(r); } return NULL; } if (i != NULL) { nbi = i->ob_type->tp_as_number; if (nbi == NULL || nbi->nb_float == NULL) { PyErr_Format(PyExc_TypeError, "complex() second argument must be a number, " "not '%.200s'", Py_TYPE(i)->tp_name); if (own_r) { Py_DECREF(r); } return NULL; } } /* If we get this far, then the "real" and "imag" parts should both be treated as numbers, and the constructor should return a complex number equal to (real + imag*1j). Note that we do NOT assume the input to already be in canonical form; the "real" and "imag" parts might themselves be complex numbers, which slightly complicates the code below. */ if (PyComplex_Check(r)) { /* Note that if r is of a complex subtype, we're only retaining its real & imag parts here, and the return value is (properly) of the builtin complex type. */ cr = ((PyComplexObject*)r)->cval; cr_is_complex = 1; if (own_r) { Py_DECREF(r); } } else { /* The "real" part really is entirely real, and contributes nothing in the imaginary direction. Just treat it as a double. */ tmp = PyNumber_Float(r); if (own_r) { /* r was a newly created complex number, rather than the original "real" argument. */ Py_DECREF(r); } if (tmp == NULL) return NULL; if (!PyFloat_Check(tmp)) { PyErr_SetString(PyExc_TypeError, "float(r) didn't return a float"); Py_DECREF(tmp); return NULL; } cr.real = PyFloat_AsDouble(tmp); cr.imag = 0.0; Py_DECREF(tmp); } if (i == NULL) { ci.real = cr.imag; } else if (PyComplex_Check(i)) { ci = ((PyComplexObject*)i)->cval; ci_is_complex = 1; } else { /* The "imag" part really is entirely imaginary, and contributes nothing in the real direction. Just treat it as a double. */ tmp = (*nbi->nb_float)(i); if (tmp == NULL) return NULL; ci.real = PyFloat_AsDouble(tmp); Py_DECREF(tmp); } /* If the input was in canonical form, then the "real" and "imag" parts are real numbers, so that ci.imag and cr.imag are zero. We need this correction in case they were not real numbers. */ if (ci_is_complex) { cr.real -= ci.imag; } if (cr_is_complex && i != NULL) { ci.real += cr.imag; } return complex_subtype_from_doubles(type, cr.real, ci.real); } static PyNumberMethods complex_as_number = { (binaryfunc)complex_add, /* nb_add */ (binaryfunc)complex_sub, /* nb_subtract */ (binaryfunc)complex_mul, /* nb_multiply */ (binaryfunc)complex_remainder, /* nb_remainder */ (binaryfunc)complex_divmod, /* nb_divmod */ (ternaryfunc)complex_pow, /* nb_power */ (unaryfunc)complex_neg, /* nb_negative */ (unaryfunc)complex_pos, /* nb_positive */ (unaryfunc)complex_abs, /* nb_absolute */ (inquiry)complex_bool, /* nb_bool */ 0, /* nb_invert */ 0, /* nb_lshift */ 0, /* nb_rshift */ 0, /* nb_and */ 0, /* nb_xor */ 0, /* nb_or */ complex_int, /* nb_int */ 0, /* nb_reserved */ complex_float, /* nb_float */ 0, /* nb_inplace_add */ 0, /* nb_inplace_subtract */ 0, /* nb_inplace_multiply*/ 0, /* nb_inplace_remainder */ 0, /* nb_inplace_power */ 0, /* nb_inplace_lshift */ 0, /* nb_inplace_rshift */ 0, /* nb_inplace_and */ 0, /* nb_inplace_xor */ 0, /* nb_inplace_or */ (binaryfunc)complex_int_div, /* nb_floor_divide */ (binaryfunc)complex_div, /* nb_true_divide */ 0, /* nb_inplace_floor_divide */ 0, /* nb_inplace_true_divide */ }; PyTypeObject PyComplex_Type = { PyVarObject_HEAD_INIT(&PyType_Type, 0) "complex", sizeof(PyComplexObject), 0, complex_dealloc, /* tp_dealloc */ 0, /* tp_print */ 0, /* tp_getattr */ 0, /* tp_setattr */ 0, /* tp_reserved */ (reprfunc)complex_repr, /* tp_repr */ &complex_as_number, /* tp_as_number */ 0, /* tp_as_sequence */ 0, /* tp_as_mapping */ (hashfunc)complex_hash, /* tp_hash */ 0, /* tp_call */ (reprfunc)complex_repr, /* tp_str */ PyObject_GenericGetAttr, /* tp_getattro */ 0, /* tp_setattro */ 0, /* tp_as_buffer */ Py_TPFLAGS_DEFAULT | Py_TPFLAGS_BASETYPE, /* tp_flags */ complex_new__doc__, /* tp_doc */ 0, /* tp_traverse */ 0, /* tp_clear */ complex_richcompare, /* tp_richcompare */ 0, /* tp_weaklistoffset */ 0, /* tp_iter */ 0, /* tp_iternext */ complex_methods, /* tp_methods */ complex_members, /* tp_members */ 0, /* tp_getset */ 0, /* tp_base */ 0, /* tp_dict */ 0, /* tp_descr_get */ 0, /* tp_descr_set */ 0, /* tp_dictoffset */ 0, /* tp_init */ PyType_GenericAlloc, /* tp_alloc */ complex_new, /* tp_new */ PyObject_Del, /* tp_free */ };