-- Aug 31, 2021 (Alfred Eichhorn) --

# via Kurt Beschorner
n=42349: c42349(1111111111......) = 34068973227298816567389271 * c42323(3261357786......)
# ECM B1=5e4, sigma=3894331124445607
# 206758 of 300000 Phi_n(10) factorizations were cracked.
# 19792 of 25997 R_prime factorizations were cracked.

-- Aug 30, 2021 (Yousuke Koide) --

n=890: c255(2335609041......) = 630859966703635424146382843107732835487998079409968772589281 * c195(3702262252......)
# ECM B1=300000000, sigma=2:7216577815049336811

-- Aug 27, 2021 (Kurt Beschorner) --

n=60001: c57896(4182863896......) = 5065105765505227441465483 * c57871(8258196552......)
# ECM B1=25e4, sigma=0:1208954549013749
n=252013: x251998(1882792045......) = 18358839216615453533 * x251979(1025550702......)
n=252079: x252073(1101946224......) = 90712887425683031 * x252056(1214762593......)
n=252181: x252172(1197935410......) = 1392425437132051477 * x252153(8603228427......)
n=252233: x252233(1111111111......) = 1111886761656101329 * x252214(9993024014......)
n=252313: x252288(8181437848......) = 2817295116682243031 * x252270(2904004553......)
n=252533: x252503(3305722063......) = 120123691326229889 * x252486(2751931801......)
n=252541: x252534(1047553623......) = 85713936029669039 * x252517(1222150879......)
n=252727: x252714(1072901674......) = 262063627740335203 * x252696(4094050303......)
n=252727: x252696(4094050303......) = 1362909995272310893 * x252678(3003903645......)
n=252767: x252751(7439398423......) = 75928273063353239 * x252734(9797929180......)
n=252887: x252879(2816478087......) = 10892926902237539837 * x252860(2585602669......)
# gr-mfaktc

-- Aug 25, 2021 (Kurt Beschorner) --

n=249107: c249096(2206097866......) = 87054406307185003 * c249079(2534159912......)
n=249133: c249111(9580635887......) = 15055734325953684761 * c249092(6363446431......)
n=249233: c249227(2229056509......) = 952183344616210477 * c249209(2340995063......)
n=249497: c249483(1502485435......) = 136487899802507879 * c249466(1100819514......)
n=249533: c249500(3877932177......) = 11147015626643624677 * c249481(3478897228......)
n=249583: c249583(1111111111......) = 771905387595091523 * c249565(1439439507......)
n=249727: c249727(1111111111......) = 4707843178118370067 * c249708(2360127704......)
n=249857: c249857(1111111111......) = 381613159797916027 * c249839(2911616338......)
n=249989: c249966(9194824187......) = 146041027730531987 * c249949(6296055519......)
n=250031: x250022(4571906773......) = 1064302112414759123 * c250004(4295685143......)
n=250153: x250142(1074926698......) = 202047029602899401 * c250124(5320180654......)
n=250199: x250190(2913982591......) = 157290852985743403 * c250173(1852607787......)
n=250433: x250433(1111111111......) = 988359342121314043 * c250415(1124197509......)
n=250501: x250487(2052676489......) = 13780805198050651723 * c250468(1489518543......)
n=250619: x250603(1235977169......) = 7485114914614458227 * c250584(1651246752......)
n=250693: x250666(2011414529......) = 307519012975842893 * c250648(6540781040......)
n=250741: x250741(1111111111......) = 121841019765478757 * c250723(9119351703......)
n=250871: x250871(1111111111......) = 315008549200864039 * c250853(3527241130......)
n=250951: x250937(1542245433......) = 103064735947687721 * c250920(1496385178......)
n=250993: x250978(3768671382......) = 1920252971241238043 * c250960(1962591095......)
n=251443: x251426(3481529623......) = 8592645122685955963 * c251407(4051755394......)
n=251539: x251526(3434172556......) = 632711389633213361 * c251508(5427707818......)
n=251609: x251600(1436572191......) = 87626335953845597 * c251583(1639429716......)
n=251809: x251781(2755415659......) = 78692798083976191 * c251764(3501483905......)
n=251857: x251857(1111111111......) = 1197240147374305747 * c251838(9280603507......)
n=251903: x251891(1468603679......) = 2993653572847659037 * c251872(4905723538......)
# gr-mfaktc

-- Aug 23, 2021 (Bo Chen, Wenjie Fang, Alfred Eichhorn, Danilo Nitsche, Kurt Beschorner) --

n=1008: c249(8970718835......) = 11824792503914776383865492901019100670460517256833712771719617457 * p185(7586364693......)
# SNFS
# ----------------8<----------------8<----------------8<----------------
# msieve-logfile abstract:
# - SNFS-difficult = 288; setting target matrix density to 130 
# - begin with 729425851 relations and 611973089 unique ideals
# - found 31674616 cycles, need 31654077
# - commencing linear algebra      
# - matrix is 31654188 x 31654077 
# - commencing square root phase
# - read 15822694 cycles
# - cycles contain 56703378 unique relations
# - read 56703378 relations
# - multiplying 56703378 relations
# - multiply complete, coefficients have about 1565.85 million bits
# - initial square root is modulo 10567147
# - GCD is N, no factor found
# - reading relations for dependency 2
# - read 15828748 cycles
# - cycles contain 56713100 unique relations
# - read 56713100 relations
# - multiplying 56713100 relations
# - multiply complete, coefficients have about 1566.11 million bits
# - initial square root is modulo 10596463
# - p65 factor: 11824792503914776383865492901019100670460517256833712771719617457
# - p185 factor: 75863646933147015591828268401923986261986397730196168081539267851470929961346053360645853358874777126920177958883875403750336775844271700524766982560221150310256906229475838502330430737
# ----------------8<----------------8<----------------8<----------------
# 1194 of 300000 Phi_n(10) factorizations were finished.

-- Aug 23, 2021 (Alfred Eichhorn) --

# via Kurt Beschorner
n=96953: c96953(1111111111......) = 276214772174133244027973609 * c96926(4022634641......)
# ECM B1=5e4, sigma=2473481238973593
# 206749 of 300000 Phi_n(10) factorizations were cracked.
# 19783 of 25997 R_prime factorizations were cracked.

-- Aug 14, 2021 (Kurt Beschorner) --

n=25001: c23874(2288239301......) = 1423958178469946843 * c23856(1606956816......)
# ECM B1=25e4, sigma=6874769798876072
n=100038: c33338(9986206153......) = 2547665954419459 * x33323(3919747067......)
n=100038: x33323(3919747067......) = 1041261193881423851268048157 * c33296(3764422500......)
# ECM B1=25e4, sigma=0:871091201473749

-- Aug 13, 2021 (Kurt Beschorner) --

n=247193: c247177(7259575408......) = 4154738892974879201 * c247159(1747300033......)
n=247363: c247363(1111111111......) = 2363180191824179107 * c247344(4701762121......)
n=247547: c247537(3343627430......) = 319669233320680631 * c247520(1045964729......)
n=247553: c247553(1111111111......) = 114722508282800947 * c247535(9685205874......)
n=247633: c247622(3759028405......) = 168816021060981031 * x247605(2226701222......)
n=247633: x247605(2226701222......) = 894560715443116559 * c247587(2489156056......)
n=247889: c247889(1111111111......) = 563894376863364083 * c247871(1970424172......)
n=247993: c247974(5607341227......) = 478823649772305347 * c247957(1171066055......)
n=248033: c248021(1389245212......) = 178004179100256809 * x248003(7804565149......)
n=248033: x248003(7804565149......) = 516122012055527827 * x247986(1512155065......)
n=248033: x247986(1512155065......) = 13498457789904413791 * c247967(1120242837......)
n=248057: c248039(1869076332......) = 10375862582851803151 * c248020(1801369589......)
n=248063: c248063(1111111111......) = 131294320682809841 * x248045(8462750752......)
n=248063: x248045(8462750752......) = 2884638341526641159 * c248027(2933730246......)
n=248077: c248068(4201591084......) = 2451156130512969197 * c248050(1714126257......)
n=248257: c248257(1111111111......) = 6731288693298029213 * c248238(1650666256......)
n=248291: c248291(1111111111......) = 1668367724874117671 * c248272(6659869371......)
n=248371: c248371(1111111111......) = 89866090063452077 * c248354(1236407537......)
n=248389: c248389(1111111111......) = 155723715218622769 * c248371(7135143863......)
n=248401: c248380(4390439999......) = 4450745646516750613 * c248361(9864504396......)
n=248441: c248441(1111111111......) = 198861728373110533 * c248423(5587355194......)
n=248461: c248461(1111111111......) = 2410320006844857161 * c248442(4609807444......)
n=248477: c248477(1111111111......) = 3976672866528714479 * c248458(2794072201......)
n=248749: c248734(5395740407......) = 1430191949877367387 * c248716(3772738623......)
n=248753: c248738(4168158909......) = 261798984453920951 * c248721(1592121878......)
n=248903: c248879(4393141350......) = 124621874713810157 * c248862(3525176748......)
# gr-mfaktc
# 206748 of 300000 Phi_n(10) factorizations were cracked.
# 19782 of 25997 R_prime factorizations were cracked.

-- Aug 10, 2021 (Kurt Beschorner) --

n=12499: c11988(4283798346......) = 180873749120768304096743832397 * c11959(2368391415......)
# ECM B1=1e6, sigma=0:2360108797460259
n=246073: c246073(1111111111......) = 1284742555695237071 * c246054(8648511767......)
n=246167: c246167(1111111111......) = 440577764441424733 * c246149(2521940962......)
n=246203: c246203(1111111111......) = 6658799935701242363 * c246184(1668635672......)
n=246277: c246277(1111111111......) = 267947398785792769 * c246259(4146750877......)
n=246317: c246293(9710191539......) = 1723327757869164361 * c246275(5634558774......)
n=246439: c246419(8304261072......) = 689849409816874159 * c246402(1203778818......)
n=246641: c246622(4718556055......) = 4138171613265442969 * c246604(1140251419......)
n=246643: c246618(2007791891......) = 13398861746003854591 * c246599(1498479444......)
n=246707: c246707(1111111111......) = 9886542728000483681 * c246688(1123862144......)
n=246709: c246672(9168678331......) = 7121743485190998151 * c246654(1287420468......)
n=246769: c246769(1111111111......) = 5206464189926881867 * c246750(2134099209......)
n=246773: c246741(7317430626......) = 1428288763843931201 * c246723(5123215144......)
n=246889: c246866(3462673086......) = 100025213957347163 * c246849(3461800229......)
n=246937: c246937(1111111111......) = 276150306441544961 * c246919(4023573703......)
n=246979: c246979(1111111111......) = 9056964824036377187 * c246960(1226802944......)
# gr-mfaktc
# 206737 of 300000 Phi_n(10) factorizations were cracked.
# 19771 of 25997 R_prime factorizations were cracked.

-- Aug 6, 2021 (Makoto Kamada) --

n=63186: c21045(1275934148......) = 32339342353567 * c21031(3945454840......)

-- Aug 5, 2021 (Kurt Beschorner) --

n=10001: c9785(6665999572......) = 2379364506063441109347340961323 * c9755(2801588220......)
# ECM B1=1e6, sigma=0:5656409380718819