SuZex.cin

/ SuZex.cin is the C++ implementation of function SuZex // which is superfunction for the transfer function T(z)=zex(z)= z exp(z) // See SuZex approximation for the details. // Copyleft 2012 by Dmitrii Kouznetsov

z_type zex(z_type z) { return z*exp(z);} z_type suzexo(z_type z){ int n,m; z_type L=log(-z); z_type c[21]; z_type s; double a[21][21]= {{-1., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0.},  {0., 0.5, 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0.,  0., 0., 0., 0., 0., 0., 0., 0.},  {-0.16666666666666666, 0.25, -0.25, 0., 0., 0., 0.,  0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0.,  0.},  {-0.14583333333333334, 0.375, -0.3125, 0.125,  0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0.,  0., 0., 0., 0.},  {-0.16365740740740742,  0.4791666666666667, -0.53125, 0.2708333333333333,  -0.0625,  0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0.,  0., 0., 0., 0., 0.},  {-0.1894675925925926,  0.6487268518518519, -0.8645833333333334, 0.578125,  -0.20052083333333334, 0.03125, 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0.},  {-0.22663111772486771, 0.8927662037037037,  -1.4053819444444444, 1.1536458333333333,  -0.5338541666666666, 0.1359375, -0.015625, 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0., 0.},  {-0.2772791969797178, 1.239592013888889, -2.265031828703704, 2.216435185185185,  -1.2763671875, 0.44166666666666665, -0.087109375,  0.0078125, 0., 0., 0., 0., 0., 0., 0., 0., 0., 0.,  0., 0., 0.},  {-0.3462407775931875,  1.7289127948633156, -3.6116999421296296,  4.1282600308641975, -2.854618778935185,  1.2419270833333333, -0.3379991319444444,  0.05368303571428571, -0.00390625, 0., 0., 0., 0.,  0., 0., 0., 0., 0., 0., 0., 0.},  {-0.4416612459670082, 2.4225398966010014,  -5.695903759507275, 7.481679928626543,  -6.071601924189815, 3.1901204427083334, -1.1004448784722223, 0.24412667410714287, 0.032149832589285714, 0.001953125, 0., 0., 0., 0.,  0., 0., 0., 0., 0., 0., 0.},  {-0.5750503318438397,  3.4195761781355416, -8.904301621256142,  13.234012896825396, -12.387900872878086, 7.666662145543982, -3.2086561414930554,  0.9080953931051587,  -0.16865408761160713,  0.018837580605158732, -0.0009765625, 0., 0., 0., 0., 0., 0., 0., 0., 0., 0.},  {-0.7590483780036865,  4.872564914208889, -13.85598530050081,  22.941559420715624, -24.390718169573965,  17.460022032937886, -8.632101704161844,  2.9751346648685515, -0.7086426265656002,  0.11248517717633928, -0.010848950582837302,  0.00048828125, 0., 0., 0., 0., 0., 0., 0., 0., 0.},  {-1.004225435438346, 6.9905727251265635,  -21.545687392877074, 39.182750311359435,  -46.60769821586042, 37.9988728199577,  -21.77607288501881, 8.886511650287286,  -2.5856723119342138, 0.5286710062985698,  -0.07291558159722222, 0.006161750033820346,  -0.000244140625, 0., 0., 0., 0., 0., 0., 0., 0.},  {-1.324367258711613, 10.02275169291253,  -33.492205053099866, 66.27369784024671,  -86.97581836388929, 79.5894440905974,  -52.05348199746358, 24.66389493266111,  -8.513126871825525, 2.1317655062128837,  -0.38009394489268145, 0.04616735505163239,  -0.0034596849141526878, 0.0001220703125, 0., 0., 0.,  0., 0., 0., 0.},  {-1.765838606129714,  14.281946657437558, -51.825733451743794,  111.28532737735638, -159.46688040237638,  161.5608677547437, -118.88109243776208,  64.38542946379413, -25.83747150199123,  7.687203653415184, -1.6822828267953593,  0.2649616424575226, -0.028660799570528573,  0.0019239424177168317, -0.00006103515625, 0., 0.,  0., 0., 0., 0.},  {-2.4453295113397027,  20.384762874691635, -79.47016669126273,  185.20699731803768, -288.39342903373137,  319.9807544809364, -261.3916309123107,  159.56531377235643, -73.28007587330262,  25.374828078366953, -6.606544153459068,  1.2794918394983246, -0.1799314263212159,  0.017497047884163362, -0.0010612010161875885,  0.000030517578125, 0., 0., 0., 0., 0.},  {-3.472868025763881, 29.755017528063433,  -121.2741348443979, 304.5239431690528,  -514.610709152941, 621.4198636944384,  -557.3368214307372, 378.5159493573904,  -196.20535170900774, 77.82525925989691,  -23.603134539423095, 5.44450530408303,  -0.9429602728261576, 0.1194755555243684,  -0.010528913584758572, 0.0005812326643625472,  -0.0000152587890625, 0., 0., 0., 0.},  {-4.613171346702781, 44.39688698302471,  -187.09589191646856, 495.8720203103204,  -904.4187338107077, 1185.548137407219,  -1159.0132176158231, 866.0241149874477,  -500.2758720467312, 224.2176840217891,  -77.95303764062392, 20.961038432504814,  -4.328004726805225, 0.6762887253792872,  -0.07780318693217438, 0.006257000696877798,  -0.0003164092474738532, 7.62939453125e-6, 0., 0.,  0.}, {-5.273050484527783, 63.71698561183738, -293.3339373818455, 809.223685904566,  -1567.9214126035747, 2220.7277895628836,  -2357.82881491874, 1923.1719087140677,  -1224.4150653842441, 612.3847140576257,  -240.77243443992216, 74.2602772858538,  -17.884781187781225, 3.334455327400953,  -0.4736586312099147, 0.049810412507743526,  -0.003677767515730688, 0.00017132547534001787,  -3.814697265625e-6, 0., 0.}, {-7.083324624421979, 81.95247240893262, -449.3226503471503,  1333.5026446614604, -2705.8669603251315,  4089.414578728234, -4695.066740933935,  4161.496488889609, -2895.974174290078,  1598.6304816010704, -702.1516955747055,  245.06996838649602, -67.73177677852487,  14.736875454771372, -2.4994954306270327,  0.3248890060201511, -0.03141381618433806,  0.00214088576116657, -0.00009232912728448859,  1.9073486328125e-6, 0.}, {-18.214476068392667, 111.80948244868608, -634.4236872182383,  2164.4934901545644, -4686.6900918162155,  7456.441210014379, -9163.224335014025,  8787.986445778999, -6649.857698257051,  4017.0643233450655, -1949.7063293884232,  760.8547074429804, -238.0908620446758,  59.469804480097125, -11.776087325864497,  1.828774790094764, -0.21876253685476346, 0.019549158283135085, -0.0012355455420681165,  0.000049547951834558144, -9.5367431640625e-7}};

// #include "SuZexCoef20.cin" c[0]=-1.; c[1]=.5*L; for(n=2;n<21;n++){ s=a[n][n]; for(m=n-1; m>=0; m--){ s*=L; s+=a[n][m]; } c[n]=s; } s=c[20]/z; for(n=19;n>=0;n--){ s+=c[n]; s/=z;} return s; } z_type suzex2008t12(z_type z){ int n,m=80; z_type s; double c[112]={ 0.09263113502690032,0.008211206810042051, 0.000712647069880373,0.000061002792135026616,  5.168897004880931e-6,4.3445677647721587e-7, 3.627510329345628e-8,3.011749762480825e-9, 2.4882932760219414e-10,2.0469528670147353e-11, 1.6774049075221718e-12,1.3697934125298772e-13, 1.1150519031183394e-14,9.050499680673825e-16, 7.32631450169268e-17,5.915874252987347e-18, 4.765920796716144e-19,3.8311975285996394e-20, 3.0735487052404278e-21,2.4610209884198943e-22, 1.967011009647219e-23,1.5694830383038919e-24, 1.250267839550047e-25,9.944454380674088e-27, 7.898093109767335e-28,6.264065061257306e-29, 4.961466114678482e-30,3.9247189079708547e-31, 3.1008090414779705e-32,2.446983078569256e-33, 1.9288411564301896e-34,1.5187638797678427e-35, 1.1946203045539106e-36,9.387107747358053e-38, 7.369048831404122e-39,5.779407456250524e-40, 4.5285704598919127e-41,3.5453392367706237e-42, 2.773227658284088e-43,2.167483778760481e-44, 1.692699001606891e-45,1.320892724326662e-46, 1.0299808302576541e-47,8.025533074423089e-49, 6.249002602542793e-50,4.8623709172587175e-51, 3.780890726937988e-52,2.9380322310816133e-53, 2.2816170670960654e-54,1.7707603355215024e-55, 1.373454866536895e-56,1.0646651593426265e-57, 8.248252131650093e-59,6.386559879065092e-60, 4.9423548308245524e-61,3.8226822480200836e-62, 2.955119712176247e-63,2.2832823166625066e-64, 1.7633018554609683e-65,1.3610714134613786e-66, 1.0500908268140331e-67,8.097833892562851e-69, 6.241817958992842e-70,4.809031344505806e-71, 3.7034995072112494e-72,2.850879848329411e-73, 2.193618572531656e-74,1.6871838457734253e-75, 1.297138043467975e-76,9.968636715255186e-78, 7.657981460120605e-79,5.8806442027849044e-80, 4.514093360695293e-81,3.4638103401082574e-82, 2.6569196029061346e-83,2.0372587207723823e-84, 1.56156498861741e-85,1.196527295125126e-86, 9.165081177043452e-88,7.017842204645432e-89, 5.371886263590005e-90,4.1106285121843686e-91, 3.1444890288849017e-92,2.404664710358596e-93, 1.8383308299060688e-94,1.4049457397975093e-95, 1.0734063622275724e-96,8.19859532315087e-98, 6.260186874436073e-99,4.778697590779901e-100, 3.6467668355383486e-101,2.7821746766120975e-102, 2.1219758899253086e-103,1.6179973905647313e-104, 1.2333834974885623e-105,9.399461648725002e-107, 7.161333609088019e-108,5.454719486363905e-109, 4.153746652896943e-110,3.1622638017912685e-111, 2.4068449211041933e-112,1.8314346120767418e-113, 1.3932510247170333e-114,1.059652059254174e-115, 8.057391237803329e-117,6.125254358912119e-118, 4.655362973359923e-119,3.5373979441576056e-120, 2.6873016732269505e-121,2.0410432859962447e-122, 1.5498598577315127e-123,1.1766252828987956e-124}; // #include "SuZexTay2008co.cin" s=c[m]; for(n=m-1;n>=0;n--){ s*=z; s+=c[n];} return s;}

z_type SuZexTay0(z_type z){ int n,m=96; z_type s; // Coefficients of the Taylor expansion at zero of function SuZex. Furst ten values seem to be precize. double SuZexTay0co[97]={ 1.,0.7136859972397819,  0.44760159770758723,0.260172774210734,   0.14351435561731263,0.07612265909856022,   0.039149270539685414,0.01963286277085933,   0.009639736455495637,0.004648327410935626,   0.002206510699406525,0.0010330188519909768,   0.000477708623371847,0.00021848101908428043,   0.00009892678352844481,0.00004438614595334552,   0.000019748886668485166,8.719325500381778e-6, 3.822215192158781e-6,1.6643935234951081e-6, 7.202727821897625e-7,3.098905541329569e-7, 1.3259961066070563e-7,5.644630910362613e-8, 2.3911772971848777e-8,1.0082842042825059e-8, 4.233027550988762e-9,1.769739581178266e-9, 7.369587989119768e-10,3.0572517487417084e-10, 1.2637053312940668e-10,5.2053996884250256e-11, 2.1370670158299365e-11,8.745723776272641e-12, 3.568130503659941e-12,1.4514540270404245e-12, 5.887492850084059e-13,2.3815849132007153e-13, 9.608412431405376e-14,3.866570577462619e-14, 1.5521210050724034e-14,6.215628529414511e-15, 2.4833444698339505e-15,9.899474755844535e-16, 3.937674510545802e-16,1.5629592062539282e-16, 6.19101603512115e-17,2.4474152450402498e-17, 9.65625256611268e-18,3.802659539422078e-18, 1.4947402770926363e-18,5.864947187812793e-19, 2.297218140115094e-19,8.982535748615876e-20, 3.506487297990436e-20,1.3665937660186885e-20, 5.317616148368429e-21,2.065954622336573e-21, 8.014308213914461e-22,3.104326526535793e-22, 1.200712142614215e-22,4.637608493477486e-23, 1.7887347815479634e-23,6.88980682205225e-24, 2.650265866508781e-24,1.0181336565847141e-24, 3.906288694553889e-25,1.4968521982261763e-25, 5.728738794347915e-26,2.189852009234572e-26, 8.360956138353809e-27,3.188541158152261e-27, 1.2145969233506357e-27,4.621524566640595e-28, 1.7565474638078776e-28,6.669056170567843e-29, 2.5293375859074745e-29,9.582856551540693e-30, 3.626908015616651e-30,1.371320077917939e-30, 5.179752729604282e-31,1.954582817311684e-31, 7.368528020156649e-32,2.7752083037388775e-32, 1.0442512518764559e-32,3.925682914243774e-33, 1.4744573317046644e-33,5.533020374821927e-34, 2.0744771710938354e-34,7.771257125665694e-35, 2.9082833536311864e-35,1.0883331081199238e-35, 4.0535616084969196e-36,1.5357809956671497e-36, 5.370444540799253e-37,2.5415674051776864e-37, 1.8802501580541168e-38}; // #include "SuZexTay0co.cin" s=SuZexTay0co[m]; for(n=m-1;n>=0;n--){ s*=z; s+=SuZexTay0co[n];} return s;}

z_type suzex(z_type z){int m,n; z_type s; if( abs(z) < 1.6 )                  return SuZexTay0(z) ; // I made the Taylor expansion for this case if( Re(z)>0 && fabs(Im(z))<1.5){n=int(Re(z)+.5); s=SuZexTay0(z-(0.+n)); DO(m,n) s=zex(s); return s;} z+=-1.1259817765745026;    // WARNING! ARGUEMENT CHANGES ITS VALUE! if( abs(z+12.) < 8.1 )              return suzex2008t12(z+12.) ; // I made the Taylor expansion for this case if( Re(z)<-12. || fabs(Im(z)) > 8. ) return suzexo(z); // definitely, |z|>8 n= int(Re(z)+12.); s=suzex2008t12(z+12.-(0.+n)); DO(m,n) s=zex(s); return s; }

// // //