h|t __text__TEXT`!__data__DATA  *__const__TEXT__literal8__TEXTPH<__cstring__TEXT/ __bss__DATAt__literal4__TEXT$__const__DATA__picsymbolstub2__TEXT*x__la_sym_ptr2__DATAP .__nl_symbol_ptr__DATAT@!(__textcoal_nt__TEXTlX! @/hP( P(/.UVS VT$4$D$D$ D$$z $D$D$AT$nD$4$ $tE$$L$$t N9Bt?Jt$$Lu [^]#6$$=jːUWVUMS}؁uЋGT$EEZT$ D$RE M؉|$t$L$T$$@rE̋?9PtT$@$E@E7EQ1]f.E؉]MX$^M\eX^eYY?$$XݝPUPY4$E̋00tm,$[^_]ËE̋x$W$ݝPPJE̋;9PtT$@$t E*@SED$D$ $҅SE|$ D$D$ $҅E t_D$W$ISC u<$t$Ѕu뽋GM1EAEEЉEG]E9ƉE]s{Q7f.EX<^E\}h^}YY?<$hݝPEPY4;urE$t t3StP`ED$E$<$1ڋG<$P݃7$ݝPP$ $O11$3144$1KCL$EUWVUMS}؃|uЋKT$ EEZT$ D$VE M؉|$t$L$T$$GE̋C9PtT$@$E@EUmf(Z\mXYYY^K Y$X^e?E̋00t]$ |[^_]ËE̋x$WۋE̋?9PtT$@$:t E*@IWED$D$ $҅lWeEt$ D$D$ $҅2~ tD$[$)W |$4$ЅuFEGEC1҉EEe؋F9sSf(f(ZXY^K YɋMf(,ыM\YYX^<у9rыE$t t0WtP`E|$$L4$.1݋F4$Pō$11 $1$1AGL$UWVUԍMS}ȁuċT$EԋEZT$ D$E Mȉ|$t$L$T$$u) L$$[^_]ÍU؍}U|$ t$ED$Eĉ$1҅.tËE9PtT$@$\E@E) QEȉf.]93E 1Y@^EQf.Uf(ЋMXQ \]f.Y^z}u{XE$^\$hhݝPMPY<$%E00tm,$Ex$W݃ X$EݝPXPM $ݝPP $ݝPPE9PtT$@$t E*@TED$D$ $҅kdEԉ|$ D$D$ $҅E0 tD$T u<$t$ЅuGŋGMEAE EQEȋGf.]E|vE1Y@;u^xQ f.$Ef(Q 4XЋE\uf.Y^X݅x$^\$hEhݝPEPY<;uZu4$t t3tP`ED$Eԉ$<$1ڋG<$P݃ X$BEݝPXP݃ $ݝPP $ݝPPm $11B4$m1$X1BUVS:`EZ ك ]E]U݃]Xf(YMw.Me: YfT"Xf.1Z4<UeXf(\YYYYYXXe\XU^^ƒXXmm~E`[^]f(ك" XY1Z]M]M}\X$f(uYYf(f(XYM\]XEYYYY\}Ye^f(X\uXmYYX^XX]]Um: Z& fT)f.w]EYEE]Z* E}d$$Y} $ E]XE볐b (H@ƪ?iQHT?pᵪ?N5n<@؟C*@MV(@Jl|fͿX(?_mxyô ,h>k@A 0?5x&7ݷ?%)k?5qu/:Aш@Π>?~=?9B.-DT! @9B.?~=?333333?2@ffffff?xwxcygaussgauss(x, w, xc=0.0, y=None) Gaussian lineshape function Calculate normalized Gaussian with full-width at half maximum |w| at |x|, optionally specifying the line-center |xc|. If, and only if |x| is an array an optional output array |y| can be specified. In this case |x| and |y| must be one-dimensional numarray with identical shapes. If |x| is an scalar the routine always gives the result as scalar return value.lorentzlorentz(x, w, xc=0.0, y=None) Lorentzian lineshape function Calculate normalized Lorentzian with full-width at half maximum |w| at |x|, optionally specifying the line-center |xc|. If, and only if |x| is an array an optional output array |y| can be specified. In this case |x| and |y| must be one-dimensional numarray with identical shapes. If |x| is an scalar the routine always gives the result as scalar return value.voigtvoigt(x, w, xc=0.0, y=None) Voigt-lineshape function Calculate normalized Voigt-profile with Gaussian full-width at half maximum |w[0]| and Lorentzian full-width at half maximum |w[1]| at |x|, optionally specifying the line-center |xc|. If, and only if |x| is an array an optional output array |y| can be specified. In this case |x| and |y| must be one-dimensional numarray with identical shapes. If |x| is an scalar the routine always gives the result as scalar return value. This function uses Humlicek's 12-point formula to approximate the Voigt profile (J. Humlicek, J. Quant. Spectrosc. Radiat. Transfer, 21, 309 (1978))._lineshape_lineshape.errorerrornumarray.libnumarray_C_APICan't get API for module 'numarray.libnumarray'numarray.libnumarray failed to import... exiting. Od|dOgauss: x must be scalar or 1d array.gauss: x and y numarray must have same length.Call to API function without first calling import_libnumarray() in Packages/Convolve/Src/_lineshapemodule.cgauss: invalid parameterslorentz: x must be scalar or 1d array.lorentz: x and y numarray must have same length.lorentz: invalid parametersOO|dOvoigt: invalid parametersddvoigt: x must be scalar or 1d array.voigt: x and y numarray must have same length.@?@B@⍀P⍀P⍀P⍀P⍀Psn⍀PZUq⍀qPA<\⍀\P(#G⍀GP 2⍀2P⍀P⍀P⍀P⍀P⍀Pyt⍀P`[⍀PGB⍀P.)u⍀uP`⍀`P6Oh0Ib{$Ë$          N  H B . "       Y  Y} u Y\ ? 7 pY  xY  Y tY s " xY pY pY  Yu tYj xY` `Y tY tY  \Y  Y I xY0    xYp pYI pYA '  `Y MY dY3Y -YYqHYghYU 9d3&     t _hO' t xt`tI 5\  h  `n Ns@24(h d!l! ! ! ! X!y q!Pt!;  `!X! !^t!S Kx!A!t!t! \! ` C  `!X!  `!u Us!G!9 !/h! t   @   T  X    } qx g a G A 9  `  |ld`\TPLD@40,(   PP  LL  HH  DD  @~@x s m<se<s_ Z T8ZL8ZF A ;4A34A- ( "0(0(  ,,  ((  $$       ~ y sykye ` Z`R`L G A G9 G3 . (. .   L H D @ < 8 4 0 , ( $          dJds< P 4H` HDlDn Do=DpEDoNDpPDqeDpoxDquDrDs t1$lMY@mzh-@T~fv %;L]r-AVr  @m# $@r23@rF@rZ[\]@rkl@r@r   $DDDD!D$D*D-D3D=D@DCDKD\DaDDD6D4D7D6D4D7D4DD4D7D?DGDUDdDDD9D?D\DDDD6DDDD4DD4D6D4D6D7D6,D4D?DNDD$ @@!& k@@Y)l%}-@Rv!)LT@4@4 4 4  @5  ! " @4- @48 4B 4M N @5W X ?Y ?Z G[ @j }k @4v @4 4 4 } @5 }         4 4 4!!@5 ! !!!!!!4)!43!4>!?!@!4J!4T!4_!`!@5i!j!7k!7l!?m!?n!y!!!!!4!4!4!!@5!!!!!! !$D DDDD D#D&D,D6D9D<DDDUDZDzDD?DBDADBDADBDADBDDBDDD DDTD^DDDDDD D&DA+D-D?0DA?DBgDADDDDD1!$ !! !"@"@"("3"&4W"`"i"@t"@"&""""@""@?"""@?""""3"""T"^""""#&#@? #@?#@?##+$#@@-#+.#-/#-0#@?;#@?F#@?R#0S#@@\#?]#^#_#`#a#Hb#$<DHD MDSD YD\D bD eD kD uD xD{D DD DD7DD D@ DE DQ DT DV DZ D] Dl Dv D D D D D D c# D D D% D D" D%X D&^ D's D( D, D- D, D- D. D D. D D D D D D D D D D D D D& D; D? DG D D0 D4 D5 D$ q#$H## ##@#@###&H$ !$ *$ 3$@ >$ H$eI$J$T$_$&Ho$ x$ $ $@ $ $$$$6 $@$@ $@$@$$E $@$$E $Q $T %@ %@%!%V "%@+%6%V 7%@C% D% E% F% G% H%@W%U X%@c%@n%y%U z%@%%U %@%U % % % % % %%% % %,%-% %.% %%% %@%x & & & &&!& "&@+&x6& 7& 8&@A&xL& M& N&@W&xb& c&@o& p& q& r& s& t& u&,&-& &.& &&& &@&x& &@& &V &s &s &s &s & &$tDO Da D` DO D` Da Dc Da Dc Da Db Dc De>DfRDhWDf\DgaDffDhjDgnDhrDeDhDeDhDeD}DmDnDpDnDpDn DrDqDrDq"Dr&Do*Dr.DoEDrIDmyDr|DmDrDmDwDzDx&$O &G&G'@G '&P?'&TR'&X d'&\Pt'@]'@]'@]']']'@]'@]'@^' ''&P'&T'&X  (&\P(@]%(@]1(@]=(]I(]U(@]b(@]o(@^x(y(z($`{((3t((x(&>`('(d) l pfm0Z}DxV A_init_lineshape___i686.get_pc_thunk.bx___i686.get_pc_thunk.axdyld_stub_binding_helper_PyExc_ImportError_PyCObject_Type_PyInt_Type_PyFloat_Type_PyExc_RuntimeError__Py_NoneStruct_PyErr_Print_PyErr_Occurred_PyCObject_AsVoidPtr_PyDict_GetItemString_PyImport_ImportModule_PyDict_SetItemString_PyErr_NewException_PyModule_GetDict_Py_InitModule4_PyArg_ParseTuple_Py_FatalError_PyFloat_FromDouble_PyEval_RestoreThread_sqrt_PyEval_SaveThread_PyType_IsSubtype_PyErr_Format_PyArg_ParseTupleAndKeywords_exp_pow/mnt/gmirror/ports/math/py-numarray/work/numarray-1.5.2/Packages/Convolve/Src/_lineshapemodule.cgcc2_compiled._T_v12.0_alpha_v12.1_beta_v12.2_y0_v12.3_kwlist.4_kwlist.5_kwlist.6__lineshape_Methods__lineshape_gauss__lineshape_lorentz__lineshape_voigt__Error_libnumarray_APIinit_lineshape:F(0,1)=(0,1)void:t(0,1)m:r(0,2)=*(0,3)=(0,4)=xs_object:PyObject:t(0,3)_object:T(0,4)=s8ob_refcnt:(0,5)=r(0,5);-2147483648;2147483647;,0,32;ob_type:(0,6)=*(0,7)=xs_typeobject:,32,32;;int:t(0,5)_typeobject:T(0,7)=s192ob_refcnt:(0,5),0,32;ob_type:(0,6),32,32;ob_size:(0,5),64,32;tp_name:(0,8)=*(0,9)=r(0,9);0;127;,96,32;tp_basicsize:(0,5),128,32;tp_itemsize:(0,5),160,32;tp_dealloc:(0,10)=(0,11)=*(0,12)=f(0,1),192,32;tp_print:(0,13)=(0,14)=*(0,15)=f(0,5),224,32;tp_getattr:(0,16)=(0,17)=*(0,18)=f(0,2),256,32;tp_setattr:(0,19)=(0,20)=*(0,21)=f(0,5),288,32;tp_compare:(0,22)=(0,23)=*(0,24)=f(0,5),320,32;tp_repr:(0,25)=(0,26)=*(0,27)=f(0,2),352,32;tp_as_number:(0,28)=*(0,29)=(0,30)=s152nb_add:(0,31)=(0,32)=*(0,33)=f(0,2),0,32;nb_subtract:(0,31),32,32;nb_multiply:(0,31),64,32;nb_divide:(0,31),96,32;nb_remainder:(0,31),128,32;nb_divmod:(0,31),160,32;nb_power:(0,34)=(0,35)=*(0,36)=f(0,2),192,32;nb_negative:(0,37)=(0,26),224,32;nb_positive:(0,37),256,32;nb_absolute:(0,37),288,32;nb_nonzero:(0,38)=(0,39)=*(0,40)=f(0,5),320,32;nb_invert:(0,37),352,32;nb_lshift:(0,31),384,32;nb_rshift:(0,31),416,32;nb_and:(0,31),448,32;nb_xor:(0,31),480,32;nb_or:(0,31),512,32;nb_coerce:(0,41)=(0,42)=*(0,43)=f(0,5),544,32;nb_int:(0,37),576,32;nb_long:(0,37),608,32;nb_float:(0,37),640,32;nb_oct:(0,37),672,32;nb_hex:(0,37),704,32;nb_inplace_add:(0,31),736,32;nb_inplace_subtract:(0,31),768,32;nb_inplace_multiply:(0,31),800,32;nb_inplace_divide:(0,31),832,32;nb_inplace_remainder:(0,31),864,32;nb_inplace_power:(0,34),896,32;nb_inplace_lshift:(0,31),928,32;nb_inplace_rshift:(0,31),960,32;nb_inplace_and:(0,31),992,32;nb_inplace_xor:(0,31),1024,32;nb_inplace_or:(0,31),1056,32;nb_floor_divide:(0,31),1088,32;nb_true_divide:(0,31),1120,32;nb_inplace_floor_divide:(0,31),1152,32;nb_inplace_true_divide:(0,31),1184,32;;,384,32;tp_as_sequence:(0,44)=*(0,45)=(0,46)=s40sq_length:(0,38),0,32;sq_concat:(0,31),32,32;sq_repeat:(0,47)=(0,48)=*(0,49)=f(0,2),64,32;sq_item:(0,47),96,32;sq_slice:(0,50)=(0,51)=*(0,52)=f(0,2),128,32;sq_ass_item:(0,53)=(0,54)=*(0,55)=f(0,5),160,32;sq_ass_slice:(0,56)=(0,57)=*(0,58)=f(0,5),192,32;sq_contains:(0,59)=(0,23),224,32;sq_inplace_concat:(0,31),256,32;sq_inplace_repeat:(0,47),288,32;;,416,32;tp_as_mapping:(0,60)=*(0,61)=(0,62)=s12mp_length:(0,38),0,32;mp_subscript:(0,31),32,32;mp_ass_subscript:(0,63)=(0,64)=*(0,65)=f(0,5),64,32;;,448,32;tp_hash:(0,66)=(0,67)=*(0,68)=f(0,69)=r(0,69);-2147483648;2147483647;,480,32;tp_call:(0,34),512,32;tp_str:(0,25),544,32;tp_getattro:(0,70)=(0,32),576,32;tp_setattro:(0,71)=(0,64),608,32;tp_as_buffer:(0,72)=*(0,73)=(0,74)=s16bf_getreadbuffer:(0,75)=(0,76)=*(0,77)=f(0,5),0,32;bf_getwritebuffer:(0,78)=(0,76),32,32;bf_getsegcount:(0,79)=(0,80)=*(0,81)=f(0,5),64,32;bf_getcharbuffer:(0,82)=(0,83)=*(0,84)=f(0,5),96,32;;,640,32;tp_flags:(0,69),672,32;tp_doc:(0,8),704,32;tp_traverse:(0,85)=(0,86)=*(0,87)=f(0,5),736,32;tp_clear:(0,38),768,32;tp_richcompare:(0,88)=(0,89)=*(0,90)=f(0,2),800,32;tp_weaklistoffset:(0,69),832,32;tp_iter:(0,91)=(0,26),864,32;tp_iternext:(0,92)=(0,26),896,32;tp_methods:(0,93)=*(0,94)=xsPyMethodDef:,928,32;tp_members:(0,95)=*(0,96)=xsPyMemberDef:,960,32;tp_getset:(0,97)=*(0,98)=xsPyGetSetDef:,992,32;tp_base:(0,6),1024,32;tp_dict:(0,2),1056,32;tp_descr_get:(0,99)=(0,35),1088,32;tp_descr_set:(0,100)=(0,64),1120,32;tp_dictoffset:(0,69),1152,32;tp_init:(0,101)=(0,64),1184,32;tp_alloc:(0,102)=(0,103)=*(0,104)=f(0,2),1216,32;tp_new:(0,105)=(0,106)=*(0,107)=f(0,2),1248,32;tp_free:(0,108)=(0,109)=*(0,110)=f(0,1),1280,32;tp_is_gc:(0,38),1312,32;tp_bases:(0,2),1344,32;tp_mro:(0,2),1376,32;tp_cache:(0,2),1408,32;tp_subclasses:(0,2),1440,32;tp_weaklist:(0,2),1472,32;tp_del:(0,10),1504,32;;char:t(0,9)destructor:t(0,10)printfunc:t(0,13)getattrfunc:t(0,16)setattrfunc:t(0,19)cmpfunc:t(0,22)reprfunc:t(0,25)PyNumberMethods:t(0,29)binaryfunc:t(0,31)ternaryfunc:t(0,34)unaryfunc:t(0,37)inquiry:t(0,38)coercion:t(0,41)PySequenceMethods:t(0,45)intargfunc:t(0,47)intintargfunc:t(0,50)intobjargproc:t(0,53)intintobjargproc:t(0,56)objobjproc:t(0,59)PyMappingMethods:t(0,61)objobjargproc:t(0,63)hashfunc:t(0,66)long int:t(0,69)getattrofunc:t(0,70)setattrofunc:t(0,71)PyBufferProcs:t(0,73)getreadbufferproc:t(0,75)getwritebufferproc:t(0,78)getsegcountproc:t(0,79)getcharbufferproc:t(0,82)traverseproc:t(0,85)richcmpfunc:t(0,88)getiterfunc:t(0,91)iternextfunc:t(0,92)PyMethodDef:T(0,94)=s16ml_name:(0,8),0,32;ml_meth:(0,111)=(0,32),32,32;ml_flags:(0,5),64,32;ml_doc:(0,8),96,32;;PyGetSetDef:T(0,98)=s20name:(0,8),0,32;get:(0,112)=(0,113)=*(0,114)=f(0,2),32,32;set:(0,115)=(0,116)=*(0,117)=f(0,5),64,32;doc:(0,8),96,32;closure:(0,118)=*(0,1),128,32;;descrgetfunc:t(0,99)descrsetfunc:t(0,100)initproc:t(0,101)allocfunc:t(0,102)newfunc:t(0,105)freefunc:t(0,108)PyCFunction:t(0,111)getter:t(0,112)setter:t(0,115)d:r(0,2)module:r(0,2)module_dict:r(0,2)c_api_object:r(0,2)module:r(0,2)module_dict:r(0,2)c_api_object:r(0,2)_lineshape_gauss:f(0,2)self:p(0,2)args:p(0,2)keywds:p(0,2)args:r(0,2)keywds:r(0,2)w:(0,119)=r(0,5);8;0;double:t(0,119)xc:(0,119)kwlist:V(0,120)=ar(0,121)=r(0,121);0000000000000;0037777777777;;0;4;(0,8)long unsigned int:t(0,122)=r(0,122);0000000000000;0037777777777;ox:(0,2)oy:(0,2)x:r(0,123)=*(0,124)=(0,125)=xss_PyArrayObject:PyArrayObject:t(0,124)s_PyArrayObject:T(0,125)=s404ob_refcnt:(0,5),0,32;ob_type:(0,6),32,32;data:(0,8),64,32;nd:(0,5),96,32;dimensions:(0,126)=*(0,127)=(0,5),128,32;strides:(0,126),160,32;base:(0,2),192,32;descr:(0,128)=*(0,129)=(0,130)=xss_Array_Descr:,224,32;flags:(0,5),256,32;_dimensions:(0,131)=ar(0,121);0;39;(0,127),288,1280;_strides:(0,131),1568,1280;_data:(0,2),2848,32;_shadows:(0,2),2880,32;nstrides:(0,5),2912,32;byteoffset:(0,69),2944,32;bytestride:(0,69),2976,32;itemsize:(0,69),3008,32;byteorder:(0,9),3040,8;_unused0:(0,9),3048,8;_unused1:(0,9),3056,8;temp:(0,132)=(0,133)=s16r:(0,134)=(0,119),0,64;i:(0,134),64,64;;,3072,128;wptr:(0,8),3200,32;;maybelong:t(0,127)PyArray_Descr:t(0,129)s_Array_Descr:T(0,130)=s20type_num:(0,5),0,32;elsize:(0,5),32,32;type:(0,9),64,8;_get:(0,135)=(0,136)=*(0,137)=f(0,2),96,32;_set:(0,138)=(0,139)=*(0,140)=f(0,5),128,32;;Complex64:t(0,132)Float64:t(0,134)_getfunc:t(0,135)_setfunc:t(0,138)y:(0,123)xa:(0,141)=ar(0,121);0;0;(0,119)ya:(0,141)_save:r(0,142)=*(0,143)=(0,144)=xs_ts:PyThreadState:t(0,143)_ts:T(0,144)=s84next:(0,145)=*(0,144),0,32;interp:(0,146)=*(0,147)=(0,148)=xs_is:,32,32;frame:(0,149)=*(0,150)=xs_frame:,64,32;recursion_depth:(0,5),96,32;tracing:(0,5),128,32;use_tracing:(0,5),160,32;c_profilefunc:(0,151)=(0,152)=*(0,153)=f(0,5),192,32;c_tracefunc:(0,151),224,32;c_profileobj:(0,2),256,32;c_traceobj:(0,2),288,32;curexc_type:(0,2),320,32;curexc_value:(0,2),352,32;curexc_traceback:(0,2),384,32;exc_type:(0,2),416,32;exc_value:(0,2),448,32;exc_traceback:(0,2),480,32;dict:(0,2),512,32;tick_counter:(0,5),544,32;gilstate_counter:(0,5),576,32;async_exc:(0,2),608,32;thread_id:(0,69),640,32;;PyInterpreterState:t(0,147)_is:T(0,148)=s36next:(0,154)=*(0,148),0,32;tstate_head:(0,145),32,32;modules:(0,2),64,32;sysdict:(0,2),96,32;builtins:(0,2),128,32;codec_search_path:(0,2),160,32;codec_search_cache:(0,2),192,32;codec_error_registry:(0,2),224,32;dlopenflags:(0,5),256,32;;Py_tracefunc:t(0,151)size_t:t(0,155)=(0,156)=(0,122)__darwin_size_t:t(0,156)x:r(0,157)=*(0,119)y:r(0,157)w:(0,119)xc:(0,119)i:r(0,5)x:r(0,157)y:r(0,157)w:(0,119)xc:(0,119)i:r(0,5)_save:r(0,142)x:r(0,157)y:r(0,157)w:(0,119)xc:(0,119)i:r(0,5)xa:(0,141)ya:(0,141)xa:(0,157)ya:(0,157)_save:(0,142)n:(0,155)w:(0,119)xc:(0,119)i:r(0,5)_save:(0,142)n:(0,155)w:(0,119)xc:(0,119)n:(0,155)w:(0,119)xc:(0,119)i:r(0,5)xa:(0,157)ya:(0,157)_save:(0,142)n:(0,155)w:(0,119)xc:(0,119)i:r(0,5)_lineshape_lorentz:f(0,2)self:p(0,2)args:p(0,2)keywds:p(0,2)args:r(0,2)keywds:r(0,2)w:(0,119)xc:(0,119)kwlist:V(0,158)=ar(0,121);0;4;(0,8)ox:(0,2)oy:(0,2)x:r(0,123)y:r(0,123)xa:(0,141)ya:(0,141)_save:r(0,142)w:r(0,119)w:r(0,119)xa:(0,141)ya:(0,141)xa:(0,157)ya:(0,157)_save:(0,142)n:r(0,155)w:r(0,119)xc:r(0,119)i:r(0,5)n:r(0,155)w:r(0,119)xc:r(0,119)i:r(0,5)_humlicek_v12_lineshape_voigt:f(0,2)self:p(0,2)args:p(0,2)keywds:p(0,2)args:r(0,2)keywds:r(0,2)w:(0,159)=ar(0,121);0;1;(0,119)xc:(0,119)kwlist:V(0,160)=ar(0,121);0;4;(0,8)wt:(0,2)ox:(0,2)oy:(0,2)x:r(0,123)y:(0,123)w:(0,159)xc:(0,119)kwlist:V(0,160)wt:(0,2)ox:(0,2)oy:(0,2)x:r(0,123)y:(0,123)xa:(0,141)ya:(0,141)_save:r(0,142)x:r(0,157)y:r(0,157)xc:(0,119)i:r(0,5)yh:(0,119)x:r(0,157)y:r(0,157)xc:(0,119)i:r(0,5)yh:(0,119)xh:r(0,119)_save:r(0,142)x:r(0,157)y:r(0,157)xc:(0,119)i:r(0,5)yh:(0,119)xh:r(0,119)xa:(0,141)ya:(0,141)xa:(0,157)ya:(0,157)_save:(0,142)n:(0,155)xc:(0,119)i:r(0,5)yh:(0,119)n:(0,155)xc:(0,119)i:r(0,5)yh:(0,119)i:r(0,5)yh:(0,119)i:r(0,5)yh:(0,119)xh:r(0,119)xa:(0,157)ya:(0,157)_save:(0,142)n:(0,155)xc:(0,119)i:r(0,5)yh:(0,119)xh:r(0,119)humlicek_v12:f(0,119)x:p(0,119)y:p(0,119)y:r(0,119)T_v12:V(0,161)=ar(0,121);0;5;(0,162)=k(0,119)alpha_v12:V(0,161)beta_v12:V(0,161)y0_v12:V(0,162)yp:r(0,119)xp:r(0,119)xm:r(0,119)sum:(0,119)yp2:(0,119)xp2:r(0,119)xm2:r(0,119)k:r(0,5)T_v12:V(0,161)alpha_v12:V(0,161)beta_v12:V(0,161)y0_v12:V(0,162)yp:r(0,119)xp:r(0,119)xm:r(0,119)sum:(0,119)yp2:(0,119)xp2:r(0,119)xm2:r(0,119)k:r(0,5)libnumarray_API:S(0,163)=*(0,118)_Error:S(0,2)_lineshape_Methods:S(0,164)=ar(0,121);0;3;(0,165)=(0,94)PyMethodDef:t(0,165)