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bert-base-uncased-test_64_200

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bert-base-uncased-test_64_200

This model is a fine-tuned version of bert-base-uncased on the None dataset. It achieves the following results on the evaluation set:

  • Loss: 1.2900
  • F1: {'f1': 0.8454581203303184}
  • Accuracy: {'accuracy': 0.8428}

Model description

More information needed

Intended uses & limitations

More information needed

Training and evaluation data

More information needed

Training procedure

Training hyperparameters

The following hyperparameters were used during training:

  • learning_rate: 0.0001
  • train_batch_size: 16
  • eval_batch_size: 16
  • seed: 42
  • optimizer: Adam with betas=(0.9,0.999) and epsilon=1e-08
  • lr_scheduler_type: linear
  • num_epochs: 500

Training results

Training Loss Epoch Step Validation Loss F1 Accuracy
No log 1.0 13 0.6838 {'f1': 0.4936336924583742} {'accuracy': 0.5864}
No log 2.0 26 0.6797 {'f1': 0.6062630480167014} {'accuracy': 0.6228}
No log 3.0 39 0.6750 {'f1': 0.6275320380322448} {'accuracy': 0.6396}
No log 4.0 52 0.6665 {'f1': 0.5731764705882353} {'accuracy': 0.6372}
No log 5.0 65 0.6516 {'f1': 0.6677165354330709} {'accuracy': 0.6624}
No log 6.0 78 0.6311 {'f1': 0.6467304625199363} {'accuracy': 0.6456}
No log 7.0 91 0.6141 {'f1': 0.6289969338589575} {'accuracy': 0.6612}
No log 8.0 104 0.6083 {'f1': 0.7377521613832855} {'accuracy': 0.6724}
No log 9.0 117 0.5541 {'f1': 0.7028571428571428} {'accuracy': 0.7088}
No log 10.0 130 0.5549 {'f1': 0.7053223712678496} {'accuracy': 0.7276}
No log 11.0 143 0.5078 {'f1': 0.7664205207928487} {'accuracy': 0.7596}
No log 12.0 156 0.5045 {'f1': 0.7668179942220389} {'accuracy': 0.774}
No log 13.0 169 0.6035 {'f1': 0.7178538390379279} {'accuracy': 0.756}
No log 14.0 182 0.4684 {'f1': 0.8066090874953061} {'accuracy': 0.794}
No log 15.0 195 0.5285 {'f1': 0.8026826685492411} {'accuracy': 0.7764}
No log 16.0 208 0.5310 {'f1': 0.7957166392092258} {'accuracy': 0.8016}
No log 17.0 221 0.5379 {'f1': 0.804374240583232} {'accuracy': 0.8068}
No log 18.0 234 0.5588 {'f1': 0.8113509192645884} {'accuracy': 0.8112}
No log 19.0 247 0.6324 {'f1': 0.8022118247554233} {'accuracy': 0.814}
No log 20.0 260 0.6471 {'f1': 0.8049090139652983} {'accuracy': 0.8156}
No log 21.0 273 0.6830 {'f1': 0.8250180766449747} {'accuracy': 0.8064}
No log 22.0 286 0.6541 {'f1': 0.8073541167066347} {'accuracy': 0.8072}
No log 23.0 299 0.7929 {'f1': 0.7772887323943662} {'accuracy': 0.7976}
No log 24.0 312 0.7272 {'f1': 0.8254558987718645} {'accuracy': 0.8124}
No log 25.0 325 0.7526 {'f1': 0.8225205070842654} {'accuracy': 0.8096}
No log 26.0 338 0.7777 {'f1': 0.8013245033112583} {'accuracy': 0.808}
No log 27.0 351 0.7733 {'f1': 0.8103025347506132} {'accuracy': 0.8144}
No log 28.0 364 0.7493 {'f1': 0.8281733746130031} {'accuracy': 0.8224}
No log 29.0 377 0.7909 {'f1': 0.8305524657026326} {'accuracy': 0.8172}
No log 30.0 390 0.8281 {'f1': 0.8091797705057374} {'accuracy': 0.8204}
No log 31.0 403 0.7747 {'f1': 0.8305214723926382} {'accuracy': 0.8232}
No log 32.0 416 0.7940 {'f1': 0.8261904761904763} {'accuracy': 0.8248}
No log 33.0 429 0.8295 {'f1': 0.8210101010101011} {'accuracy': 0.8228}
No log 34.0 442 0.8768 {'f1': 0.8304832713754647} {'accuracy': 0.8176}
No log 35.0 455 0.8526 {'f1': 0.8249902987970508} {'accuracy': 0.8196}
No log 36.0 468 0.8708 {'f1': 0.8272692454998085} {'accuracy': 0.8196}
No log 37.0 481 0.9140 {'f1': 0.8084929225645296} {'accuracy': 0.816}
No log 38.0 494 0.9014 {'f1': 0.8198903680501174} {'accuracy': 0.816}
0.2225 39.0 507 0.9189 {'f1': 0.8225806451612904} {'accuracy': 0.8152}
0.2225 40.0 520 0.9125 {'f1': 0.8178528347406514} {'accuracy': 0.8188}
0.2225 41.0 533 0.9240 {'f1': 0.8292867981790591} {'accuracy': 0.82}
0.2225 42.0 546 1.0189 {'f1': 0.8013757523645744} {'accuracy': 0.8152}
0.2225 43.0 559 0.9304 {'f1': 0.8307341194370484} {'accuracy': 0.822}
0.2225 44.0 572 0.9441 {'f1': 0.8154541718043566} {'accuracy': 0.8204}
0.2225 45.0 585 0.9274 {'f1': 0.8325652841781874} {'accuracy': 0.8256}
0.2225 46.0 598 0.9291 {'f1': 0.820859872611465} {'accuracy': 0.82}
0.2225 47.0 611 0.9480 {'f1': 0.8347826086956521} {'accuracy': 0.8252}
0.2225 48.0 624 0.9415 {'f1': 0.8215999999999999} {'accuracy': 0.8216}
0.2225 49.0 637 0.9453 {'f1': 0.8219395866454692} {'accuracy': 0.8208}
0.2225 50.0 650 0.9554 {'f1': 0.8202247191011236} {'accuracy': 0.8208}
0.2225 51.0 663 0.9543 {'f1': 0.8288499025341132} {'accuracy': 0.8244}
0.2225 52.0 676 0.9627 {'f1': 0.8257605689450809} {'accuracy': 0.8236}
0.2225 53.0 689 0.9995 {'f1': 0.8353955755530559} {'accuracy': 0.8244}
0.2225 54.0 702 1.0324 {'f1': 0.8162411050648808} {'accuracy': 0.8244}
0.2225 55.0 715 0.9892 {'f1': 0.8340360291299349} {'accuracy': 0.8268}
0.2225 56.0 728 1.0115 {'f1': 0.8368421052631578} {'accuracy': 0.8264}
0.2225 57.0 741 0.9859 {'f1': 0.8211284513805521} {'accuracy': 0.8212}
0.2225 58.0 754 0.9863 {'f1': 0.8229208117787505} {'accuracy': 0.822}
0.2225 59.0 767 0.9881 {'f1': 0.8242760809202697} {'accuracy': 0.8228}
0.2225 60.0 780 1.0011 {'f1': 0.8231017770597738} {'accuracy': 0.8248}
0.2225 61.0 793 1.0023 {'f1': 0.8230088495575221} {'accuracy': 0.824}
0.2225 62.0 806 1.0396 {'f1': 0.8376768428890543} {'accuracy': 0.8256}
0.2225 63.0 819 1.0426 {'f1': 0.8186314921681782} {'accuracy': 0.824}
0.2225 64.0 832 1.0070 {'f1': 0.8289368505195842} {'accuracy': 0.8288}
0.2225 65.0 845 1.0800 {'f1': 0.8133445945945947} {'accuracy': 0.8232}
0.2225 66.0 858 1.0260 {'f1': 0.8400000000000001} {'accuracy': 0.8304}
0.2225 67.0 871 0.9988 {'f1': 0.8431975403535741} {'accuracy': 0.8368}
0.2225 68.0 884 0.9941 {'f1': 0.8359157727453318} {'accuracy': 0.8348}
0.2225 69.0 897 0.9941 {'f1': 0.8361045130641329} {'accuracy': 0.8344}
0.2225 70.0 910 0.9947 {'f1': 0.8414872798434442} {'accuracy': 0.838}
0.2225 71.0 923 0.9967 {'f1': 0.8386336866902239} {'accuracy': 0.8356}
0.2225 72.0 936 0.9986 {'f1': 0.8368794326241136} {'accuracy': 0.8344}
0.2225 73.0 949 0.9997 {'f1': 0.8405797101449276} {'accuracy': 0.8372}
0.2225 74.0 962 1.0061 {'f1': 0.843484965304549} {'accuracy': 0.8376}
0.2225 75.0 975 1.0038 {'f1': 0.8365498227648681} {'accuracy': 0.834}
0.2225 76.0 988 1.0058 {'f1': 0.8421875} {'accuracy': 0.8384}
0.0026 77.0 1001 1.0094 {'f1': 0.8420644159875824} {'accuracy': 0.8372}
0.0026 78.0 1014 1.0182 {'f1': 0.8348660535785687} {'accuracy': 0.8348}
0.0026 79.0 1027 1.0331 {'f1': 0.8284789644012945} {'accuracy': 0.8304}
0.0026 80.0 1040 1.0148 {'f1': 0.8374851720047448} {'accuracy': 0.8356}
0.0026 81.0 1053 1.0145 {'f1': 0.8407843137254902} {'accuracy': 0.8376}
0.0026 82.0 1066 1.0158 {'f1': 0.8442014837953924} {'accuracy': 0.8404}
0.0026 83.0 1079 1.0175 {'f1': 0.8450155763239875} {'accuracy': 0.8408}
0.0026 84.0 1092 1.0210 {'f1': 0.8445475638051044} {'accuracy': 0.8392}
0.0026 85.0 1105 1.0216 {'f1': 0.8375394321766562} {'accuracy': 0.8352}
0.0026 86.0 1118 1.0259 {'f1': 0.8445998445998446} {'accuracy': 0.84}
0.0026 87.0 1131 1.0277 {'f1': 0.8435797665369649} {'accuracy': 0.8392}
0.0026 88.0 1144 1.0295 {'f1': 0.8370808678500985} {'accuracy': 0.8348}
0.0026 89.0 1157 1.0533 {'f1': 0.8439393939393939} {'accuracy': 0.8352}
0.0026 90.0 1170 1.0387 {'f1': 0.8324022346368716} {'accuracy': 0.832}
0.0026 91.0 1183 1.0292 {'f1': 0.8400469299960892} {'accuracy': 0.8364}
0.0026 92.0 1196 1.0678 {'f1': 0.8426966292134832} {'accuracy': 0.832}
0.0026 93.0 1209 1.1813 {'f1': 0.8108340498710231} {'accuracy': 0.824}
0.0026 94.0 1222 1.0600 {'f1': 0.8343848580441642} {'accuracy': 0.832}
0.0026 95.0 1235 1.0988 {'f1': 0.8407978923598042} {'accuracy': 0.8308}
0.0026 96.0 1248 1.0773 {'f1': 0.8406020841373987} {'accuracy': 0.8348}
0.0026 97.0 1261 1.0753 {'f1': 0.8380803745610613} {'accuracy': 0.834}
0.0026 98.0 1274 1.0759 {'f1': 0.8375} {'accuracy': 0.8336}
0.0026 99.0 1287 1.0779 {'f1': 0.8406359053896859} {'accuracy': 0.8356}
0.0026 100.0 1300 1.0779 {'f1': 0.8404669260700389} {'accuracy': 0.836}
0.0026 101.0 1313 1.0856 {'f1': 0.830488289003573} {'accuracy': 0.8292}
0.0026 102.0 1326 1.1032 {'f1': 0.8284789644012945} {'accuracy': 0.8304}
0.0026 103.0 1339 1.0956 {'f1': 0.8302788844621515} {'accuracy': 0.8296}
0.0026 104.0 1352 1.0922 {'f1': 0.8408385093167702} {'accuracy': 0.836}
0.0026 105.0 1365 1.1688 {'f1': 0.823185988323603} {'accuracy': 0.8304}
0.0026 106.0 1378 1.1361 {'f1': 0.8336579664978575} {'accuracy': 0.8292}
0.0026 107.0 1391 1.1736 {'f1': 0.8191489361702128} {'accuracy': 0.8232}
0.0026 108.0 1404 1.1447 {'f1': 0.8337273443656423} {'accuracy': 0.8312}
0.0026 109.0 1417 1.1207 {'f1': 0.8367906066536203} {'accuracy': 0.8332}
0.0026 110.0 1430 1.1612 {'f1': 0.8235782482357824} {'accuracy': 0.83}
0.0026 111.0 1443 1.1338 {'f1': 0.82429677945373} {'accuracy': 0.8276}
0.0026 112.0 1456 1.1216 {'f1': 0.8268921095008052} {'accuracy': 0.828}
0.0026 113.0 1469 1.1147 {'f1': 0.8370078740157479} {'accuracy': 0.8344}
0.0026 114.0 1482 1.1215 {'f1': 0.8283881315156376} {'accuracy': 0.8288}
0.0026 115.0 1495 1.1465 {'f1': 0.8249282492824928} {'accuracy': 0.8292}
0.0011 116.0 1508 1.1374 {'f1': 0.8260692464358452} {'accuracy': 0.8292}
0.0011 117.0 1521 1.1196 {'f1': 0.8351042896497441} {'accuracy': 0.8324}
0.0011 118.0 1534 1.1283 {'f1': 0.8363496341932999} {'accuracy': 0.83}
0.0011 119.0 1547 1.1356 {'f1': 0.8367658276125095} {'accuracy': 0.8288}
0.0011 120.0 1560 1.1272 {'f1': 0.8368684920940996} {'accuracy': 0.8308}
0.0011 121.0 1573 1.1234 {'f1': 0.8345834978286616} {'accuracy': 0.8324}
0.0011 122.0 1586 1.1260 {'f1': 0.8347826086956521} {'accuracy': 0.8328}
0.0011 123.0 1599 1.1276 {'f1': 0.8333333333333333} {'accuracy': 0.832}
0.0011 124.0 1612 1.1281 {'f1': 0.8341907400079145} {'accuracy': 0.8324}
0.0011 125.0 1625 1.1284 {'f1': 0.8352429869616753} {'accuracy': 0.8332}
0.0011 126.0 1638 1.1284 {'f1': 0.838407494145199} {'accuracy': 0.8344}
0.0011 127.0 1651 1.1387 {'f1': 0.8358208955223881} {'accuracy': 0.8284}
0.0011 128.0 1664 1.1407 {'f1': 0.8376003056935423} {'accuracy': 0.83}
0.0011 129.0 1677 1.1373 {'f1': 0.83531669865643} {'accuracy': 0.8284}
0.0011 130.0 1690 1.1350 {'f1': 0.837962962962963} {'accuracy': 0.832}
0.0011 131.0 1703 1.2047 {'f1': 0.8214585079631181} {'accuracy': 0.8296}
0.0011 132.0 1716 1.2042 {'f1': 0.8209205020920501} {'accuracy': 0.8288}
0.0011 133.0 1729 1.1449 {'f1': 0.8341232227488151} {'accuracy': 0.832}
0.0011 134.0 1742 1.1475 {'f1': 0.8383326840670042} {'accuracy': 0.834}
0.0011 135.0 1755 1.1501 {'f1': 0.8391608391608392} {'accuracy': 0.8344}
0.0011 136.0 1768 1.1523 {'f1': 0.8395348837209303} {'accuracy': 0.8344}
0.0011 137.0 1781 1.1525 {'f1': 0.8389600310438494} {'accuracy': 0.834}
0.0011 138.0 1794 1.1521 {'f1': 0.8387096774193549} {'accuracy': 0.834}
0.0011 139.0 1807 1.1515 {'f1': 0.8324066719618745} {'accuracy': 0.8312}
0.0011 140.0 1820 1.1557 {'f1': 0.8304609218436874} {'accuracy': 0.8308}
0.0011 141.0 1833 1.1555 {'f1': 0.8302642113690952} {'accuracy': 0.8304}
0.0011 142.0 1846 1.1542 {'f1': 0.8335310399367338} {'accuracy': 0.8316}
0.0011 143.0 1859 1.1551 {'f1': 0.8344527854602923} {'accuracy': 0.8324}
0.0011 144.0 1872 1.1559 {'f1': 0.8345834978286616} {'accuracy': 0.8324}
0.0011 145.0 1885 1.1564 {'f1': 0.8349743993698308} {'accuracy': 0.8324}
0.0011 146.0 1898 1.1570 {'f1': 0.8343171979535616} {'accuracy': 0.8316}
0.0011 147.0 1911 1.1580 {'f1': 0.8363351605324981} {'accuracy': 0.8328}
0.0011 148.0 1924 1.1590 {'f1': 0.836591086786552} {'accuracy': 0.8328}
0.0011 149.0 1937 1.1954 {'f1': 0.8246406570841888} {'accuracy': 0.8292}
0.0011 150.0 1950 1.1790 {'f1': 0.8298217179902755} {'accuracy': 0.832}
0.0011 151.0 1963 1.1656 {'f1': 0.8391337973704562} {'accuracy': 0.8336}
0.0011 152.0 1976 1.1879 {'f1': 0.8270248270248269} {'accuracy': 0.83}
0.0011 153.0 1989 1.2103 {'f1': 0.8394216133942161} {'accuracy': 0.8312}
0.0001 154.0 2002 1.2977 {'f1': 0.8091216216216216} {'accuracy': 0.8192}
0.0001 155.0 2015 1.3165 {'f1': 0.8057675996607293} {'accuracy': 0.8168}
0.0001 156.0 2028 1.2406 {'f1': 0.8365019011406845} {'accuracy': 0.828}
0.0001 157.0 2041 1.3378 {'f1': 0.7991360691144708} {'accuracy': 0.814}
0.0001 158.0 2054 1.2219 {'f1': 0.8351987649556156} {'accuracy': 0.8292}
0.0001 159.0 2067 1.2792 {'f1': 0.8146605581007913} {'accuracy': 0.822}
0.0001 160.0 2080 1.2839 {'f1': 0.8284765769088898} {'accuracy': 0.814}
0.0001 161.0 2093 1.1911 {'f1': 0.8387841477491342} {'accuracy': 0.8324}
0.0001 162.0 2106 1.1718 {'f1': 0.8349056603773586} {'accuracy': 0.832}
0.0001 163.0 2119 1.2825 {'f1': 0.8401323042998898} {'accuracy': 0.826}
0.0001 164.0 2132 1.1686 {'f1': 0.838785046728972} {'accuracy': 0.8344}
0.0001 165.0 2145 1.2342 {'f1': 0.8240200166805671} {'accuracy': 0.8312}
0.0001 166.0 2158 1.1921 {'f1': 0.8321108394458028} {'accuracy': 0.8352}
0.0001 167.0 2171 1.1739 {'f1': 0.838375796178344} {'accuracy': 0.8376}
0.0001 168.0 2184 1.1728 {'f1': 0.8421468034727704} {'accuracy': 0.84}
0.0001 169.0 2197 1.1747 {'f1': 0.8401253918495297} {'accuracy': 0.8368}
0.0001 170.0 2210 1.1757 {'f1': 0.8410777040218664} {'accuracy': 0.8372}
0.0001 171.0 2223 1.1773 {'f1': 0.8403426791277258} {'accuracy': 0.836}
0.0001 172.0 2236 1.1820 {'f1': 0.8403100775193799} {'accuracy': 0.8352}
0.0001 173.0 2249 1.1857 {'f1': 0.8406805877803558} {'accuracy': 0.8352}
0.0001 174.0 2262 1.1852 {'f1': 0.8405572755417957} {'accuracy': 0.8352}
0.0001 175.0 2275 1.2516 {'f1': 0.8230383973288814} {'accuracy': 0.8304}
0.0001 176.0 2288 1.2024 {'f1': 0.8402321083172147} {'accuracy': 0.8348}
0.0001 177.0 2301 1.2116 {'f1': 0.8333999200958849} {'accuracy': 0.8332}
0.0001 178.0 2314 1.4179 {'f1': 0.8014028934677773} {'accuracy': 0.8188}
0.0001 179.0 2327 2.1209 {'f1': 0.7948051948051948} {'accuracy': 0.7472}
0.0001 180.0 2340 1.2614 {'f1': 0.8272425249169434} {'accuracy': 0.8336}
0.0001 181.0 2353 1.4028 {'f1': 0.8334529791816224} {'accuracy': 0.8144}
0.0001 182.0 2366 1.2493 {'f1': 0.8324324324324325} {'accuracy': 0.8264}
0.0001 183.0 2379 1.2906 {'f1': 0.8196319018404908} {'accuracy': 0.8236}
0.0001 184.0 2392 1.4300 {'f1': 0.7944492627927148} {'accuracy': 0.8104}
0.0001 185.0 2405 1.3032 {'f1': 0.8229208117787505} {'accuracy': 0.822}
0.0001 186.0 2418 1.3187 {'f1': 0.829754601226994} {'accuracy': 0.8224}
0.0001 187.0 2431 1.3279 {'f1': 0.83015993907083} {'accuracy': 0.8216}
0.0001 188.0 2444 1.3209 {'f1': 0.8294365657339977} {'accuracy': 0.822}
0.0001 189.0 2457 1.3296 {'f1': 0.8148760330578513} {'accuracy': 0.8208}
0.0001 190.0 2470 1.3729 {'f1': 0.8358764421287683} {'accuracy': 0.8236}
0.0001 191.0 2483 1.3415 {'f1': 0.8309433962264152} {'accuracy': 0.8208}
0.0001 192.0 2496 1.3709 {'f1': 0.8090452261306532} {'accuracy': 0.8176}
0.0023 193.0 2509 1.3308 {'f1': 0.8313161875945537} {'accuracy': 0.8216}
0.0023 194.0 2522 1.3586 {'f1': 0.8300898203592814} {'accuracy': 0.8184}
0.0023 195.0 2535 1.3053 {'f1': 0.8317289179822872} {'accuracy': 0.8252}
0.0023 196.0 2548 1.2996 {'f1': 0.8333333333333333} {'accuracy': 0.828}
0.0023 197.0 2561 1.2937 {'f1': 0.8280204643841007} {'accuracy': 0.8252}
0.0023 198.0 2574 1.2966 {'f1': 0.8264} {'accuracy': 0.8264}
0.0023 199.0 2587 1.3215 {'f1': 0.8180698151950719} {'accuracy': 0.8228}
0.0023 200.0 2600 1.3029 {'f1': 0.8233387358184764} {'accuracy': 0.8256}
0.0023 201.0 2613 1.2937 {'f1': 0.8262085497403115} {'accuracy': 0.826}
0.0023 202.0 2626 1.2919 {'f1': 0.8265712012728721} {'accuracy': 0.8256}
0.0023 203.0 2639 1.2917 {'f1': 0.8267934998018234} {'accuracy': 0.8252}
0.0023 204.0 2652 1.4967 {'f1': 0.8278074866310161} {'accuracy': 0.8068}
0.0023 205.0 2665 1.3007 {'f1': 0.8278688524590164} {'accuracy': 0.832}
0.0023 206.0 2678 1.3728 {'f1': 0.8125530110262935} {'accuracy': 0.8232}
0.0023 207.0 2691 1.4707 {'f1': 0.8339906776622446} {'accuracy': 0.8148}
0.0023 208.0 2704 1.2701 {'f1': 0.8403883495145631} {'accuracy': 0.8356}
0.0023 209.0 2717 1.2717 {'f1': 0.8389129578574241} {'accuracy': 0.8364}
0.0023 210.0 2730 1.3918 {'f1': 0.8415660446395903} {'accuracy': 0.8268}
0.0023 211.0 2743 1.3395 {'f1': 0.8439821693907876} {'accuracy': 0.832}
0.0023 212.0 2756 1.2888 {'f1': 0.8312958435207823} {'accuracy': 0.8344}
0.0023 213.0 2769 1.3092 {'f1': 0.8277571251548947} {'accuracy': 0.8332}
0.0023 214.0 2782 1.2824 {'f1': 0.8316430020283976} {'accuracy': 0.834}
0.0023 215.0 2795 1.2763 {'f1': 0.8331990330378727} {'accuracy': 0.8344}
0.0023 216.0 2808 1.2747 {'f1': 0.8347406513872137} {'accuracy': 0.8356}
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0.0 436.0 5668 1.2882 {'f1': 0.8477588871715611} {'accuracy': 0.8424}
0.0 437.0 5681 1.2883 {'f1': 0.8477588871715611} {'accuracy': 0.8424}
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0.0 440.0 5720 1.2882 {'f1': 0.848414539829853} {'accuracy': 0.8432}
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0.0 447.0 5811 1.2890 {'f1': 0.8490712074303406} {'accuracy': 0.844}
0.0 448.0 5824 1.2891 {'f1': 0.8487427466150871} {'accuracy': 0.8436}
0.0 449.0 5837 1.2893 {'f1': 0.848414539829853} {'accuracy': 0.8432}
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0.0 452.0 5876 1.2895 {'f1': 0.8490712074303406} {'accuracy': 0.844}
0.0 453.0 5889 1.2895 {'f1': 0.8490712074303406} {'accuracy': 0.844}
0.0 454.0 5902 1.2896 {'f1': 0.8490712074303406} {'accuracy': 0.844}
0.0 455.0 5915 1.2897 {'f1': 0.8490712074303406} {'accuracy': 0.844}
0.0 456.0 5928 1.2898 {'f1': 0.8490712074303406} {'accuracy': 0.844}
0.0 457.0 5941 1.2897 {'f1': 0.8490712074303406} {'accuracy': 0.844}
0.0 458.0 5954 1.2894 {'f1': 0.849283223556761} {'accuracy': 0.8444}
0.0 459.0 5967 1.2893 {'f1': 0.8491663435440093} {'accuracy': 0.8444}
0.0 460.0 5980 1.2893 {'f1': 0.8491663435440093} {'accuracy': 0.8444}
0.0 461.0 5993 1.2894 {'f1': 0.8491663435440093} {'accuracy': 0.8444}
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0.0 463.0 6019 1.2896 {'f1': 0.8491663435440093} {'accuracy': 0.8444}
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0.0 465.0 6045 1.2898 {'f1': 0.8491663435440093} {'accuracy': 0.8444}
0.0 466.0 6058 1.2899 {'f1': 0.8487199379363848} {'accuracy': 0.844}
0.0 467.0 6071 1.2899 {'f1': 0.8487199379363848} {'accuracy': 0.844}
0.0 468.0 6084 1.2900 {'f1': 0.8487199379363848} {'accuracy': 0.844}
0.0 469.0 6097 1.2901 {'f1': 0.8487199379363848} {'accuracy': 0.844}
0.0 470.0 6110 1.2903 {'f1': 0.8491663435440093} {'accuracy': 0.8444}
0.0 471.0 6123 1.2905 {'f1': 0.8496124031007752} {'accuracy': 0.8448}
0.0 472.0 6136 1.2906 {'f1': 0.8496124031007752} {'accuracy': 0.8448}
0.0 473.0 6149 1.2908 {'f1': 0.8496124031007752} {'accuracy': 0.8448}
0.0 474.0 6162 1.2909 {'f1': 0.8493999225706542} {'accuracy': 0.8444}
0.0 475.0 6175 1.2910 {'f1': 0.8493999225706542} {'accuracy': 0.8444}
0.0 476.0 6188 1.2911 {'f1': 0.8493999225706542} {'accuracy': 0.8444}
0.0 477.0 6201 1.2912 {'f1': 0.8493999225706542} {'accuracy': 0.8444}
0.0 478.0 6214 1.2907 {'f1': 0.8496124031007752} {'accuracy': 0.8448}
0.0 479.0 6227 1.2906 {'f1': 0.8491663435440093} {'accuracy': 0.8444}
0.0 480.0 6240 1.2906 {'f1': 0.8491663435440093} {'accuracy': 0.8444}
0.0 481.0 6253 1.2906 {'f1': 0.8487199379363848} {'accuracy': 0.844}
0.0 482.0 6266 1.2906 {'f1': 0.8487199379363848} {'accuracy': 0.844}
0.0 483.0 6279 1.2907 {'f1': 0.8487199379363848} {'accuracy': 0.844}
0.0 484.0 6292 1.2907 {'f1': 0.8487199379363848} {'accuracy': 0.844}
0.0 485.0 6305 1.2908 {'f1': 0.8487199379363848} {'accuracy': 0.844}
0.0 486.0 6318 1.2908 {'f1': 0.8491663435440093} {'accuracy': 0.8444}
0.0 487.0 6331 1.2891 {'f1': 0.8472059398202424} {'accuracy': 0.8436}
0.0 488.0 6344 1.2894 {'f1': 0.8464860620337652} {'accuracy': 0.8436}
0.0 489.0 6357 1.2898 {'f1': 0.8459119496855346} {'accuracy': 0.8432}
0.0 490.0 6370 1.2899 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 491.0 6383 1.2899 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 492.0 6396 1.2900 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 493.0 6409 1.2900 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 494.0 6422 1.2900 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 495.0 6435 1.2900 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 496.0 6448 1.2900 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 497.0 6461 1.2900 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 498.0 6474 1.2900 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 499.0 6487 1.2900 {'f1': 0.8454581203303184} {'accuracy': 0.8428}
0.0 500.0 6500 1.2900 {'f1': 0.8454581203303184} {'accuracy': 0.8428}

Framework versions

  • Transformers 4.29.2
  • Pytorch 2.0.1+cu117
  • Datasets 2.12.0
  • Tokenizers 0.13.3
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