3/(16*pi^2)*( + z^-30 * ( - 219415504878260668481458/40970475 + 4008968866605472*Lz ) + z^-29 * ( - 219127348108567619664898/155687805 + 1054991807001440*Lz ) + z^-28 * ( - 109409207572724213131409/295269975 + 278134203664016*Lz ) + z^-27 * ( - 4122384427600955488706/42181425 + 73469412288608*Lz ) + z^-26 * ( - 2057816348327442889553/79676025 + 19447785605808*Lz ) + z^-25 * ( - 293452507402197044879/42902475 + 5159616589296*Lz ) + z^-24 * ( - 6231645364099338289/3432198 + 1372238454600*Lz ) + z^-23 * ( - 12437125205535336518/25741485 + 365930254560*Lz ) + z^-22 * ( - 144285489968702713/1119195 + 97865068080*Lz ) + z^-21 * ( - 3510273150915593/101745 + 26256481680*Lz ) + z^-20 * ( - 3500487562166393/377910 + 7069052760*Lz ) + z^-19 * ( - 94315062045929/37791 + 1910554800*Lz ) + z^-18 * ( - 13427048535167/19890 + 518579160*Lz ) + z^-17 * ( - 13374954901367/72930 + 141430680*Lz ) + z^-16 * ( - 429556076057/8580 + 38779380*Lz ) + z^-15 * ( - 29476194716/2145 + 10697760*Lz ) + z^-14 * ( - 4884369866/1287 + 2971600*Lz ) + z^-13 * ( - 6792224422/6435 + 832048*Lz ) + z^-12 * ( - 146489197/495 + 235144*Lz ) + z^-11 * ( - 290207054/3465 + 67184*Lz ) + z^-10 * ( - 7549093/315 + 19448*Lz ) + z^-9 * ( - 437705/63 + 5720*Lz ) + z^-8 * ( - 429697/210 + 1716*Lz ) + z^-7 * ( - 64508/105 + 528*Lz ) + z^-6 * ( - 2834/15 + 168*Lz ) + z^-5 * ( - 898/15 + 56*Lz ) + z^-4 * ( - 59/3 + 20*Lz ) + z^-3 * ( - 20/3 + 8*Lz ) + z^-2 * ( - 2 + 4*Lz ) + z^-1 * ( + 4 + 4*Lz ) + asPi*z^-30*cf * ( - 10612505073428205963126461211612762655409/26859022870624594650000 + 3483065004975559274182199/13656825*Lq + 32953927702820823372425152841/383770439325*Lz - 186417052297154448*Lz*Lq + 12954623962483807016/87*Lz^2 ) + asPi*z^-29*cf * ( - 2861399916468221810572868829234020489507/28410877525371793452000 + 224602326732735547179538/3459729*Lq + 19883916573461623772681824898/895464358425*Lz - 47474631315064800*Lz*Lq + 7669244668059444348/203*Lz^2 ) + asPi*z^-28*cf * ( - 30704623479978485872320976795495198621/1195192928821659768000 + 3254991698971521093530461/196846650*Lq + 2181531221749317404814702233/379480971870*Lz - 12098837859384696*Lz*Lq + 1812569476226605630/189*Lz^2 ) + asPi*z^-27*cf * ( - 236302511807264284136357350706460181/36033181991376570000 + 59262904238536375195084/14060475*Lq + 2625436395150965720182068092/1761875940825*Lz - 3085715316121536*Lz*Lq + 854985685451662168/351*Lz^2 ) + asPi*z^-26*cf * ( - 136639996355431761149646141499792423/81556584754144500000 + 57110563656963956371131/53117350*Lq + 6096359929056665018216129/15761996250*Lz - 787635317035224*Lz*Lq + 201194404708579692/325*Lz^2 ) + asPi*z^-25*cf * ( - 126525108337352846739192374120631623/295341005145186000000 + 3925562757094490037227/14300825*Lq + 25232245609947811083236647/250979478750*Lz - 201225046982544*Lz*Lq + 11807512314104099/75*Lz^2 ) + asPi*z^-24*cf * ( - 16683960301218722081320802459729273/152159685850799827200 + 160500928181884668025/2288132*Lq + 1208675827945908803961841/46180224090*Lz - 51458942047500*Lz*Lq + 5529035927884067/138*Lz^2 ) + asPi*z^-23*cf * ( - 326530420880022177440340920527043/11623309335824986800 + 51318432181941749672/2860165*Lq + 192621063159103502039624/28221248055*Lz - 13173489164160*Lz*Lq + 2581670798575608/253*Lz^2 ) + asPi*z^-22*cf * ( - 289115542702475366383065946741/40123201455136800 + 3428096364149957999/746130*Lq + 10013924034261092129/5615610*Lz - 3376344848760*Lz*Lq + 600857651173820/231*Lz^2 ) + asPi*z^-21*cf * ( - 245448983422566216615582151/132638682496320 + 39948737524337323/33915*Lq + 11320606974187075093/24249225*Lz - 866463895440*Lz*Lq + 69684294687626/105*Lz^2 ) + asPi*z^-20*cf * ( - 571078594293469942592165567/1200064270204800 + 25393901511341951/83980*Lq + 13279286456799901913/108408300*Lz - 222675161940*Lz*Lq + 16102953162693/95*Lz^2 ) + asPi*z^-19*cf * ( - 12905900288131135363024070039/105305639710471200 + 979251508682690/12597*Lq + 80164141179823166486/2487970485*Lz - 57316644000*Lz*Lq + 7411666019276/171*Lz^2 ) + asPi*z^-18*cf * ( - 16503113240228332523227181/521999088811200 + 265428461660573/13260*Lq + 1991510020002231329/234324090*Lz - 14779506060*Lz*Lq + 1697895910342/153*Lz^2 ) + asPi*z^-17*cf * ( - 38294146237723553729023/4686860505600 + 125531863858503/24310*Lq + 2027711253247877/901680*Lz - 3818628360*Lz*Lq + 193492014375/68*Lz^2 ) + asPi*z^-16*cf * ( - 7327162052706497179511/3462915456000 + 7635180373369/5720*Lq + 141881549864833/237600*Lz - 988874190*Lz*Lq + 87698511143/120*Lz^2 ) + asPi*z^-15*cf * ( - 52004202348935249689/94689094500 + 247282905328/715*Lq + 107572402276688/675675*Lz - 256746240*Lz*Lq + 2820908152/15*Lz^2 ) + asPi*z^-14*cf * ( - 23458437978000040333/164127763800 + 12848332865/143*Lq + 756750920383/17745*Lz - 66861000*Lz*Lq + 630509052/13*Lz^2 ) + asPi*z^-13*cf * ( - 6747901992921098687/180875494800 + 50222685394/2145*Lq + 2241991038368/195195*Lz - 17473008*Lz*Lq + 489097486/39*Lz^2 ) + asPi*z^-12*cf * ( - 3539559605338387/362244960 + 2020755841/330*Lq + 26372640941/8470*Lz - 4585308*Lz*Lq + 107344007/33*Lz^2 ) + asPi*z^-11*cf * ( - 129268765288073/50311800 + 619212868/385*Lq + 54040553228/63525*Lz - 1209312*Lz*Lq + 46579644/55*Lz^2 ) + asPi*z^-10*cf * ( - 646538154377/952560 + 89166143/210*Lq + 475220461/2025*Lz - 320892*Lz*Lq + 9968702/45*Lz^2 ) + asPi*z^-9*cf * ( - 686862724073/3810240 + 2368705/21*Lq + 743149157/11340*Lz - 85800*Lz*Lq + 1049183/18*Lz^2 ) + asPi*z^-8*cf * ( - 31728392809/658560 + 4227633/140*Lq + 7288829/392*Lz - 23166*Lz*Lq + 432735/28*Lz^2 ) + asPi*z^-7*cf * ( - 6004793251/463050 + 285752/35*Lq + 11887544/2205*Lz - 6336*Lz*Lq + 86948/21*Lz^2 ) + asPi*z^-6*cf * ( - 47466133/13500 + 11179/5*Lq + 362794/225*Lz - 1764*Lz*Lq + 16882/15*Lz^2 ) + asPi*z^-5*cf * ( - 2872193/3000 + 3114/5*Lq + 12647/25*Lz - 504*Lz*Lq + 1563/5*Lz^2 ) + asPi*z^-4*cf * ( - 36985/144 + 355/2*Lq + 3101/18*Lz - 150*Lz*Lq + 539/6*Lz^2 ) + asPi*z^-3*cf * ( - 515/9 + 52*Lq + 628/9*Lz - 48*Lz*Lq + 82/3*Lz^2 ) + asPi*z^-2*cf * ( + 4 + 15*Lq + 27*Lz - 18*Lz*Lq + 6*Lz^2 ) + asPi*z^-1*cf * ( + 4 - 6*Lq + 10*Lz - 12*Lz*Lq + 6*Lz^2 + 12*z3 ) + asPi*cf * ( + 65/4 - 9*Lq + 1/2*Lz + 3*Lz*Lq - 3/2*Lz^2 - 6*z3 ) + asPi^2*z^-30*cf*tf*nl * ( + 300768144257772715427175898126905032811721286710112131/10634701871\ 94630047977027223340000000 - 16320989209169292324952278534410656420409/80577068611873783950000* Lq + 3483065004975559274182199/81940950*Lq^2 - 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142951389848695120*z5 + 25056055416284200*z4 + 226738044283283254018904274716151343996016492051/ 82411554927441285000*z3 - 27784158730009223696/145*z3*Lz ) + asPi^2*z^-30*cf^2 * ( - 289789272524870712797922214305824773135100426731952029547885923442\ 869480396844784649/61085493827172870752621105463398679379331520445440\ 000000 + 8017937733210944/3*c4 + 5641702606312175009732008774386693788355043/ 304402259200412072700000*Lq - 110520880214480423793955769/18209100*Lq^2 - 182019737474069129850579869418386793093964835638011677891189663268\ 1867037/131135991511070779747991890884013967424000000*Lz - 913243843364152708257544967171/255846959550*Lz*Lq + 4334196465908840916*Lz*Lq^2 + 14975871960915179321260735655071953488906910305732113238866927/ 1407588544527897660157681452000000*Lz^2 - 200796671418499008748/29*Lz^2*Lq - 2494118481697182415283483757271121387624844594247/ 1813054208403708270000*Lz^3 + 571805559394780480*z5 - 50112110832568400*z4 - 1425210564123651722161855007973154390443513050119/ 259007744057672610000*z3 + 52184536738242028736/145*z3*Lz ) + asPi^2*z^-29*cf*tf*nl * ( + 14314785757175221185479135029474049236907264533878007/198514434942\ 997608955711748356800000 - 4398405945147849779872128235238662109507/85232632576115380356000* Lq + 112301163366367773589769/10379187*Lq^2 - 2903611247446972612244095695185337963227/206372865982648184820000* Lz + 55310450133468219747099274898/2686393075275*Lz*Lq - 7912438552510800*Lz*Lq^2 - 255303279876311549408015638637/9092407331700*Lz^2 + 2556414889353148116/203*Lz^2*Lq - 1279460247447388268/609*Lz^3 + 628473502008324064/203*z3 ) + asPi^2*z^-29*cf*tf*nh * ( - 1088207321954539048628886389644511927768175417217108512665498813/ 2226394530784313461551906066640500000 - 4398405945147849779872128235238662109507/85232632576115380356000* Lq + 112301163366367773589769/10379187*Lq^2 - 2243768824078219553256945445088299181452107035392357/ 1619420018946192226764000*Lz + 55310450133468219747099274898/2686393075275*Lz*Lq - 7912438552510800*Lz*Lq^2 + 126598991929302232965758902439154289819087/118201295312100*Lz^2 + 2556414889353148116/203*Lz^2*Lq - 2916633206182782362424394840/21*Lz^3 - 112776483879594631855502040456/203*z3 ) + asPi^2*z^-29*cf*tf*nh*sing * ( - 4531182704470486176337952344913000208566450925354926061581189663/ 17819592408623704065677020174464000000 - 696876112444574573791244622963390600781894845989766590633/ 969596438889199257478742400000*Lz + 106548358635644507710509451039354881042034223/191629457883864000* Lz^2 - 516231733178101118033683617609809/7158060*Lz^3 - 21681732792508487155673267596471853/75159630*z3 - 3278010257468760*z3*Lz ) + asPi^2*z^-29*cf*ca * ( + 305020666724108102494761463878056259864332247661790499794629769363\ 48006677958884043/165502569482488073467692650270291988466169144064000\ 000000 - 1054991807001440/3*c4 + 5572119639775929320064289963460388437507/30993684573132865584000* Lq - 1235312797030045509487459/41516748*Lq^2 + 390259374947043616234324630641866344141625887862159526062963549520\ 2976163/7461185723905751261523676550297346422400000000*Lz - 452998916686102911701599301939/5372786150550*Lz*Lq + 21759206019404700*Lz*Lq^2 - 12756888165660510043880677815737357089304526320492634800767/ 31561353469964751340379472000000*Lz^2 - 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13187397587518000*z4 - 8361514192385065092066831707091908257064035681591/ 19943596292440790970000*z3 + 2654526540961667424/29*z3*Lz ) + asPi^2*z^-28*cf*tf*nl * ( + 15894367169580848596660018826060152766811889501607/ 863910427050276538413559478400000 - 47174055658038423259322903591883626221/3585578786464979304000*Lq + 3254991698971521093530461/1181079900*Lq^2 - 34213937022221659131070529039082162277/9235581722712825480000*Lz + 6007596846230029770051786833/1138442915610*Lz*Lq - 2016472976564116*Lz*Lq^2 - 161921340195676703313930519901/22768858312200*Lz^2 + 1812569476226605630/567*Lz^2*Lq - 907240824438397870/1701*Lz^3 + 16780628890555952/21*z3 ) + asPi^2*z^-28*cf*tf*nh * ( - 5171538497559938940996890180375435946378883839498240905111/ 134986004226605709127118668500000 - 47174055658038423259322903591883626221/3585578786464979304000*Lq + 3254991698971521093530461/1181079900*Lq^2 - 514026419307577592932216859703481802291038584157/ 4889425617906789960000*Lz + 6007596846230029770051786833/1138442915610*Lz*Lq - 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342817/300*Lz*Lq + 231*Lz*Lq^2 + 8184127/10800*Lz^2 - 5731/20*Lz^2*Lq + 18611/108*Lz^3 - 260*z5 + 350*z4 + 375757/900*z3 - 2562/5*z3*Lz ) + asPi^2*z^-5*cf^2 * ( - 62115621569/9720000 + 112/3*c4 + 9453249/1000*Lq - 15903/5*Lq^2 + 1473719929/810000*Lz - 91953/25*Lz*Lq + 2268*Lz*Lq^2 + 310145909/108000*Lz^2 - 14067/5*Lz^2*Lq + 335837/450*Lz^3 + 1040*z5 - 700*z4 - 802781/900*z3 + 3792/5*z3*Lz ) + asPi^2*z^-4*cf*tf*nl * ( + 573913/3888 - 58285/432*Lq + 355/12*Lq^2 - 13547/81*Lz + 5351/54*Lz*Lq - 25*Lz*Lq^2 - 1315/24*Lz^2 + 539/18*Lz^2*Lq - 287/54*Lz^3 - 4/3*z3 ) + asPi^2*z^-4*cf*tf*nh * ( + 3892289/7776 - 58285/432*Lq + 355/12*Lq^2 - 20533/72*Lz + 5351/54*Lz*Lq - 25*Lz*Lq^2 - 24871/216*Lz^2 + 539/18*Lz^2*Lq - 545/27*Lz^3 + 2333/9*z3 ) + asPi^2*z^-4*cf*tf*nh*sing * ( + 68146/243 + 7727/81*Lz - 86*Lz^2 - 44*Lz^3 + 1288/9*z3 - 80*z3*Lz ) + asPi^2*z^-4*cf*ca * ( - 3008885/3888 - 20/3*c4 + 820055/1728*Lq - 3905/48*Lq^2 + 1489679/2592*Lz - 77761/216*Lz*Lq + 275/4*Lz*Lq^2 + 74807/288*Lz^2 - 5929/72*Lz^2*Lq + 8941/216*Lz^3 - 70*z5 + 125*z4 + 823/24*z3 - 145*z3*Lz ) + asPi^2*z^-4*cf^2 * ( - 159609/128 + 40/3*c4 + 70621/32*Lq - 6225/8*Lq^2 + 751555/1296*Lz - 3124/3*Lz*Lq + 1125/2*Lz*Lq^2 + 534067/864*Lz^2 - 2695/4*Lz^2*Lq + 38753/216*Lz^3 + 280*z5 - 250*z4 - 50/3*z3 + 203*z3*Lz ) + asPi^2*z^-3*cf*tf*nl * ( + 12551/486 - 905/27*Lq + 26/3*Lq^2 - 4970/81*Lz + 988/27*Lz*Lq - 8*Lz*Lq^2 - 133/9*Lz^2 + 82/9*Lz^2*Lq - 46/27*Lz^3 - 16/3*z3 ) + asPi^2*z^-3*cf*tf*nh * ( + 43319/486 - 905/27*Lq + 26/3*Lq^2 - 3064/27*Lz + 988/27*Lz*Lq - 8*Lz*Lq^2 - 623/27*Lz^2 + 82/9*Lz^2*Lq - 92/27*Lz^3 + 596/9*z3 ) + asPi^2*z^-3*cf*tf*nh*sing * ( + 221/8 - 363/4*Lz - 63*Lz^2 - 12*Lz^3 + 114*z3 - 36*z3*Lz ) + asPi^2*z^-3*cf*ca * ( - 134501/972 - 8/3*c4 + 13231/108*Lq - 143/6*Lq^2 + 170609/648*Lz - 3473/27*Lz*Lq + 22*Lz*Lq^2 + 497/6*Lz^2 - 451/18*Lz^2*Lq + 505/54*Lz^3 - 20*z5 + 50*z4 - 63/2*z3 - 40*z3*Lz ) + asPi^2*z^-3*cf^2 * ( - 421657/1944 + 16/3*c4 + 909/2*Lq - 192*Lq^2 + 4481/27*Lz - 1028/3*Lz*Lq + 144*Lz*Lq^2 + 839/6*Lz^2 - 164*Lz^2*Lq + 1223/27*Lz^3 + 80*z5 - 100*z4 + 135*z3 + 52*z3*Lz ) + asPi^2*z^-2*cf*tf*nl * ( + 53/24 - 17/6*Lq + 5/2*Lq^2 - 257/12*Lz + 14*Lz*Lq - 3*Lz*Lq^2 - 10/3*Lz^2 + 2*Lz^2*Lq - 2/3*Lz^3 - 12*z3 ) + asPi^2*z^-2*cf*tf*nh * ( + 701/24 - 17/6*Lq + 5/2*Lq^2 - 293/12*Lz + 14*Lz*Lq - 3*Lz*Lq^2 - 11/6*Lz^2 + 2*Lz^2*Lq - 2/3*Lz^3 + 6*z3 ) + asPi^2*z^-2*cf*tf*nh*sing * ( - 44 - 12*Lz + 24*z3 - 72*z3*Lz ) + asPi^2*z^-2*cf*ca * ( - 1417/96 - 4/3*c4 + 397/24*Lq - 55/8*Lq^2 + 3925/48*Lz - 49*Lz*Lq + 33/4*Lz*Lq^2 + 38/3*Lz^2 - 11/2*Lz^2*Lq + 11/6*Lz^3 + 5/2*z5 + 25*z4 + 49/4*z3 + 15/2*z3*Lz ) + asPi^2*z^-2*cf^2 * ( - 885/32 + 8/3*c4 + 195/8*Lq - 189/4*Lq^2 + 1253/16*Lz - 423/4*Lz*Lq + 81/2*Lz*Lq^2 + 129/4*Lz^2 - 27*Lz^2*Lq + 6*Lz^3 + 15*z5 - 50*z4 + 104*z3 - 33*z3*Lz ) + asPi^2*z^-1*cf*tf*nl * ( - 301/36 + 3*Lq - Lq^2 - 15/2*Lz + 20/3*Lz*Lq - 2*Lz*Lq^2 - 10/3*Lz^2 + 2*Lz^2*Lq - 2/3*Lz^3 - 20/3*z3 + 4*z3*Lq ) + asPi^2*z^-1*cf*tf*nh * ( - 589/36 + 3*Lq - Lq^2 - 39/2*Lz + 20/3*Lz*Lq - 2*Lz*Lq^2 - 10/3*Lz^2 + 2*Lz^2*Lq - 2/3*Lz^3 + 52/3*z3 + 4*z3*Lq ) + asPi^2*z^-1*cf*tf*nh*sing * ( - 20*z5 - 16*z3 ) + asPi^2*z^-1*cf*ca * ( + 4469/144 - 27/2*ls2^2 - 47/4*Lq + 11/4*Lq^2 + 247/8*Lz - 76/3*Lz*Lq + 11/2*Lz*Lq^2 + 38/3*Lz^2 - 11/2*Lz^2*Lq + 11/6*Lz^3 + 5*z5 - 41/12*z4 - 5/3*z3 - 11*z3*Lq - 6*z3*Lz ) + asPi^2*z^-1*cf^2 * ( + 473/16 + 27*ls2^2 + 9/4*Lq - 5/8*Lz - 27/2*Lz*Lq + 18*Lz*Lq^2 + 27/4*Lz^2 - 18*Lz^2*Lq + 6*Lz^3 - 70*z5 + 41/6*z4 + 96*z3 - 36*z3*Lq + 12*z3*Lz ) + asPi^2*cf*tf*nl * ( - 1025/72 + 95/12*Lq - 3/2*Lq^2 + 5/24*Lz - 2/3*Lz*Lq + 1/2*Lz*Lq^2 + 1/3*Lz^2 - 1/2*Lz^2*Lq + 1/6*Lz^3 + 16/3*z3 - 2*z3*Lq ) + asPi^2*cf*tf*nh * ( - 1097/72 + 95/12*Lq - 3/2*Lq^2 + 5/24*Lz - 2/3*Lz*Lq + 1/2*Lz*Lq^2 + 1/3*Lz^2 - 1/2*Lz^2*Lq + 1/6*Lz^3 + 55/12*z3 - 2*z3*Lq ) + asPi^2*cf*tf*nh*sing * ( - 21/4*z3 ) + asPi^2*cf*ca * ( + 14635/288 + 81/16*ls2^2 - 1297/48*Lq + 33/8*Lq^2 - 85/96*Lz + 43/12*Lz*Lq - 11/8*Lz*Lq^2 - 43/24*Lz^2 + 11/8*Lz^2*Lq - 11/24*Lz^3 - 5/2*z5 + 41/32*z4 - 197/12*z3 + 11/2*z3*Lq + 9/4*z3*Lz ) + asPi^2*cf^2 * ( + 26 - 81/8*ls2^2 - 99/4*Lq + 9*Lq^2 + 101/32*Lz - 39/8*Lz*Lq - 9/4*Lz*Lq^2 + 39/16*Lz^2 + 9/4*Lz^2*Lq - 3/4*Lz^3 + 15*z5 - 41/16*z4 - 33*z3 + 9*z3*Lq - 9/2*z3*Lz ) + 4 - 2*Lz )