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Kirill Smelkov
cython
Commits
c3f2d977
Commit
c3f2d977
authored
Sep 09, 2016
by
Robert Bradshaw
Browse files
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Browse Files
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Plain Diff
Distinguish between math suffix and type suffix for complex arithmetic.
This closes #1433.
parent
9e641a60
Changes
3
Hide whitespace changes
Inline
Side-by-side
Showing
3 changed files
with
50 additions
and
51 deletions
+50
-51
Cython/Compiler/ExprNodes.py
Cython/Compiler/ExprNodes.py
+1
-1
Cython/Compiler/PyrexTypes.py
Cython/Compiler/PyrexTypes.py
+7
-8
Cython/Utility/Complex.c
Cython/Utility/Complex.c
+42
-42
No files found.
Cython/Compiler/ExprNodes.py
View file @
c3f2d977
...
...
@@ -11116,7 +11116,7 @@ class PowNode(NumBinopNode):
if
self
.
type
.
real_type
.
is_float
:
self
.
operand1
=
self
.
operand1
.
coerce_to
(
self
.
type
,
env
)
self
.
operand2
=
self
.
operand2
.
coerce_to
(
self
.
type
,
env
)
self
.
pow_func
=
"__Pyx_c_pow"
+
self
.
type
.
real_type
.
math_h_modifier
self
.
pow_func
=
self
.
type
.
binary_op
(
'**'
)
else
:
error
(
self
.
pos
,
"complex int powers not supported"
)
self
.
pow_func
=
"<error>"
...
...
Cython/Compiler/PyrexTypes.py
View file @
c3f2d977
...
...
@@ -1968,14 +1968,11 @@ class CComplexType(CNumericType):
def
__init__
(
self
,
real_type
):
while
real_type
.
is_typedef
and
not
real_type
.
typedef_is_external
:
real_type
=
real_type
.
typedef_base_type
if
real_type
.
is_typedef
and
real_type
.
typedef_is_external
:
# The below is not actually used: Coercions are currently disabled
# so that complex types of external types can not be created
self
.
funcsuffix
=
"_%s"
%
real_type
.
specialization_name
()
elif
hasattr
(
real_type
,
'math_h_modifier'
):
self
.
funcsuffix
=
real_type
.
math_h_modifier
self
.
funcsuffix
=
"_%s"
%
real_type
.
specialization_name
()
if
real_type
.
is_float
:
self
.
math_h_modifier
=
real_type
.
math_h_modifier
else
:
self
.
funcsuffix
=
"_%s"
%
real_type
.
specialization_name
()
self
.
math_h_modifier
=
"_UNUSED"
self
.
real_type
=
real_type
CNumericType
.
__init__
(
self
,
real_type
.
rank
+
0.5
,
real_type
.
signed
)
...
...
@@ -2059,7 +2056,8 @@ class CComplexType(CNumericType):
'type'
:
self
.
empty_declaration_code
(),
'type_name'
:
self
.
specialization_name
(),
'real_type'
:
self
.
real_type
.
empty_declaration_code
(),
'm'
:
self
.
funcsuffix
,
'func_suffix'
:
self
.
funcsuffix
,
'm'
:
self
.
math_h_modifier
,
'is_float'
:
int
(
self
.
real_type
.
is_float
)
}
...
...
@@ -2118,6 +2116,7 @@ complex_ops = {
(
2
,
'-'
):
'diff'
,
(
2
,
'*'
):
'prod'
,
(
2
,
'/'
):
'quot'
,
(
2
,
'**'
):
'pow'
,
(
2
,
'=='
):
'eq'
,
}
...
...
Cython/Utility/Complex.c
View file @
c3f2d977
...
...
@@ -115,39 +115,39 @@ static {{type}} __Pyx_PyComplex_As_{{type_name}}(PyObject* o) {
/////////////// Arithmetic.proto ///////////////
#if CYTHON_CCOMPLEX
#define __Pyx_c_eq{{
m
}}(a, b) ((a)==(b))
#define __Pyx_c_sum{{
m
}}(a, b) ((a)+(b))
#define __Pyx_c_diff{{
m
}}(a, b) ((a)-(b))
#define __Pyx_c_prod{{
m
}}(a, b) ((a)*(b))
#define __Pyx_c_quot{{
m
}}(a, b) ((a)/(b))
#define __Pyx_c_neg{{
m
}}(a) (-(a))
#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{{
m
}}(z) ((z)==({{real_type}})0)
#define __Pyx_c_conj{{
m
}}(z) (::std::conj(z))
#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{{
m
}}(z) (::std::abs(z))
#define __Pyx_c_pow{{
m
}}(a, b) (::std::pow(a, b))
#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{{
m
}}(z) ((z)==0)
#define __Pyx_c_conj{{
m
}}(z) (conj{{m}}(z))
#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{{
m
}}(z) (cabs{{m}}(z))
#define __Pyx_c_pow{{
m
}}(a, b) (cpow{{m}}(a, b))
#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
{{
m
}}({{
type
}},
{{
type
}});
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_sum
{{
m
}}({{
type
}},
{{
type
}});
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_diff
{{
m
}}({{
type
}},
{{
type
}});
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_prod
{{
m
}}({{
type
}},
{{
type
}});
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_quot
{{
m
}}({{
type
}},
{{
type
}});
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_neg
{{
m
}}({{
type
}});
static
CYTHON_INLINE
int
__Pyx_c_is_zero
{{
m
}}({{
type
}});
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_conj
{{
m
}}({{
type
}});
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
{{
m
}}({{
type
}});
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_pow
{{
m
}}({{
type
}},
{{
type
}});
static
CYTHON_INLINE
{{
real_type
}}
__Pyx_c_abs
{{
func_suffix
}}({{
type
}});
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_pow
{{
func_suffix
}}({{
type
}},
{{
type
}});
#endif
#endif
...
...
@@ -155,22 +155,22 @@ static {{type}} __Pyx_PyComplex_As_{{type_name}}(PyObject* o) {
#if CYTHON_CCOMPLEX
#else
static
CYTHON_INLINE
int
__Pyx_c_eq
{{
m
}}({{
type
}}
a
,
{{
type
}}
b
)
{
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
{{
m
}}({{
type
}}
a
,
{{
type
}}
b
)
{
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
{{
m
}}({{
type
}}
a
,
{{
type
}}
b
)
{
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
{{
m
}}({{
type
}}
a
,
{{
type
}}
b
)
{
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
;
...
...
@@ -178,7 +178,7 @@ static {{type}} __Pyx_PyComplex_As_{{type_name}}(PyObject* o) {
}
#if {{is_float}}
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_quot
{{
m
}}({{
type
}}
a
,
{{
type
}}
b
)
{
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
))
{
...
...
@@ -198,7 +198,7 @@ static {{type}} __Pyx_PyComplex_As_{{type_name}}(PyObject* o) {
}
}
#else
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_quot
{{
m
}}({{
type
}}
a
,
{{
type
}}
b
)
{
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
{
...
...
@@ -210,30 +210,30 @@ static {{type}} __Pyx_PyComplex_As_{{type_name}}(PyObject* o) {
}
#endif
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_neg
{{
m
}}({{
type
}}
a
)
{
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
{{
m
}}({{
type
}}
a
)
{
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
{{
m
}}({{
type
}}
a
)
{
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
{{
m
}}({{
type
}}
z
)
{
static
CYTHON_INLINE
{{
real_type
}}
__Pyx_c_abs
{{
func_suffix
}}({{
type
}}
z
)
{
#if !defined(HAVE_HYPOT) || defined(_MSC_VER)
return
sqrt
{{
m
}}(
z
.
real
*
z
.
real
+
z
.
imag
*
z
.
imag
);
#else
return
hypot
{{
m
}}(
z
.
real
,
z
.
imag
);
#endif
}
static
CYTHON_INLINE
{{
type
}}
__Pyx_c_pow
{{
m
}}({{
type
}}
a
,
{{
type
}}
b
)
{
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
)
{
...
...
@@ -251,14 +251,14 @@ static {{type}} __Pyx_PyComplex_As_{{type_name}}(PyObject* o) {
case
1
:
return
a
;
case
2
:
z
=
__Pyx_c_prod
{{
m
}}(
a
,
a
);
return
__Pyx_c_prod
{{
m
}}(
a
,
a
);
z
=
__Pyx_c_prod
{{
func_suffix
}}(
a
,
a
);
return
__Pyx_c_prod
{{
func_suffix
}}(
a
,
a
);
case
3
:
z
=
__Pyx_c_prod
{{
m
}}(
a
,
a
);
return
__Pyx_c_prod
{{
m
}}(
z
,
a
);
z
=
__Pyx_c_prod
{{
func_suffix
}}(
a
,
a
);
return
__Pyx_c_prod
{{
func_suffix
}}(
z
,
a
);
case
4
:
z
=
__Pyx_c_prod
{{
m
}}(
a
,
a
);
return
__Pyx_c_prod
{{
m
}}(
z
,
z
);
z
=
__Pyx_c_prod
{{
func_suffix
}}(
a
,
a
);
return
__Pyx_c_prod
{{
func_suffix
}}(
z
,
z
);
}
}
if
(
a
.
imag
==
0
)
{
...
...
@@ -268,7 +268,7 @@ static {{type}} __Pyx_PyComplex_As_{{type_name}}(PyObject* o) {
r
=
a
.
real
;
theta
=
0
;
}
else
{
r
=
__Pyx_c_abs
{{
m
}}(
a
);
r
=
__Pyx_c_abs
{{
func_suffix
}}(
a
);
theta
=
atan2
{{
m
}}(
a
.
imag
,
a
.
real
);
}
lnr
=
log
{{
m
}}(
r
);
...
...
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