layoutlm-funsd / README.md

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	---
	base_model: microsoft/layoutlm-base-uncased
	tags:
	- generated_from_trainer
	datasets:
	- funsd
	model-index:
	- name: layoutlm-funsd
	results: []
	---

	<!-- This model card has been generated automatically according to the information the Trainer had access to. You
	should probably proofread and complete it, then remove this comment. -->

	# layoutlm-funsd

	This model is a fine-tuned version of [microsoft/layoutlm-base-uncased](https://huggingface.co/microsoft/layoutlm-base-uncased) on the funsd dataset.
	It achieves the following results on the evaluation set:
	- Loss: 0.7204
	- Answer: {'precision': 0.7103218645948945, 'recall': 0.7911001236093943, 'f1': 0.7485380116959064, 'number': 809}
	- Header: {'precision': 0.3697478991596639, 'recall': 0.3697478991596639, 'f1': 0.3697478991596639, 'number': 119}
	- Question: {'precision': 0.7799126637554585, 'recall': 0.8384976525821596, 'f1': 0.8081447963800905, 'number': 1065}
	- Overall Precision: 0.7284
	- Overall Recall: 0.7913
	- Overall F1: 0.7585
	- Overall Accuracy: 0.7930

	## 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: 3e-05
	- train_batch_size: 16
	- eval_batch_size: 8
	- seed: 42
	- optimizer: Adam with betas=(0.9,0.999) and epsilon=1e-08
	- lr_scheduler_type: linear
	- num_epochs: 15

	### Training results

	\| Training Loss \| Epoch \| Step \| Validation Loss \| Answer \| Header \| Question \| Overall Precision \| Overall Recall \| Overall F1 \| Overall Accuracy \|
	\|:-------------:\|:-----:\|:----:\|:---------------:\|:------------------------------------------------------------------------------------------------------------:\|:------------------------------------------------------------------------------------------------------------:\|:-----------------------------------------------------------------------------------------------------------:\|:-----------------:\|:--------------:\|:----------:\|:----------------:\|
	\| 1.8258 \| 1.0 \| 10 \| 1.6104 \| {'precision': 0.03933136676499508, 'recall': 0.049443757725587144, 'f1': 0.04381161007667032, 'number': 809} \| {'precision': 0.0, 'recall': 0.0, 'f1': 0.0, 'number': 119} \| {'precision': 0.2102076124567474, 'recall': 0.22816901408450704, 'f1': 0.21882035119315627, 'number': 1065} \| 0.1302 \| 0.1420 \| 0.1359 \| 0.3742 \|
	\| 1.4584 \| 2.0 \| 20 \| 1.2730 \| {'precision': 0.1923509561304837, 'recall': 0.21137206427688504, 'f1': 0.20141342756183747, 'number': 809} \| {'precision': 0.0, 'recall': 0.0, 'f1': 0.0, 'number': 119} \| {'precision': 0.4099290780141844, 'recall': 0.5427230046948357, 'f1': 0.467070707070707, 'number': 1065} \| 0.3258 \| 0.3758 \| 0.3490 \| 0.5734 \|
	\| 1.1076 \| 3.0 \| 30 \| 0.9718 \| {'precision': 0.501532175689479, 'recall': 0.6069221260815822, 'f1': 0.5492170022371365, 'number': 809} \| {'precision': 0.0, 'recall': 0.0, 'f1': 0.0, 'number': 119} \| {'precision': 0.5749211356466877, 'recall': 0.6845070422535211, 'f1': 0.6249464209172738, 'number': 1065} \| 0.5358 \| 0.6121 \| 0.5714 \| 0.6890 \|
	\| 0.8541 \| 4.0 \| 40 \| 0.8287 \| {'precision': 0.5573921028466483, 'recall': 0.7503090234857849, 'f1': 0.6396206533192834, 'number': 809} \| {'precision': 0.14893617021276595, 'recall': 0.058823529411764705, 'f1': 0.08433734939759036, 'number': 119} \| {'precision': 0.6451342281879194, 'recall': 0.7220657276995305, 'f1': 0.6814355338945502, 'number': 1065} \| 0.5941 \| 0.6939 \| 0.6401 \| 0.7420 \|
	\| 0.7105 \| 5.0 \| 50 \| 0.7483 \| {'precision': 0.6358695652173914, 'recall': 0.723114956736712, 'f1': 0.6766917293233082, 'number': 809} \| {'precision': 0.2465753424657534, 'recall': 0.15126050420168066, 'f1': 0.18749999999999997, 'number': 119} \| {'precision': 0.6898305084745763, 'recall': 0.7643192488262911, 'f1': 0.7251670378619154, 'number': 1065} \| 0.6521 \| 0.7110 \| 0.6803 \| 0.7618 \|
	\| 0.6079 \| 6.0 \| 60 \| 0.7023 \| {'precision': 0.6306209850107066, 'recall': 0.7280593325092707, 'f1': 0.6758462421113023, 'number': 809} \| {'precision': 0.2875, 'recall': 0.19327731092436976, 'f1': 0.23115577889447236, 'number': 119} \| {'precision': 0.6796267496111975, 'recall': 0.8206572769953052, 'f1': 0.7435133985538068, 'number': 1065} \| 0.6461 \| 0.7456 \| 0.6923 \| 0.7776 \|
	\| 0.5267 \| 7.0 \| 70 \| 0.6779 \| {'precision': 0.674892703862661, 'recall': 0.7775030902348579, 'f1': 0.7225732337736933, 'number': 809} \| {'precision': 0.3, 'recall': 0.226890756302521, 'f1': 0.25837320574162675, 'number': 119} \| {'precision': 0.717391304347826, 'recall': 0.8056338028169014, 'f1': 0.7589562140645733, 'number': 1065} \| 0.6826 \| 0.7597 \| 0.7191 \| 0.7853 \|
	\| 0.4735 \| 8.0 \| 80 \| 0.6688 \| {'precision': 0.6955093099671413, 'recall': 0.7849196538936959, 'f1': 0.7375145180023228, 'number': 809} \| {'precision': 0.32608695652173914, 'recall': 0.25210084033613445, 'f1': 0.2843601895734597, 'number': 119} \| {'precision': 0.7424892703862661, 'recall': 0.812206572769953, 'f1': 0.7757847533632287, 'number': 1065} \| 0.7051 \| 0.7677 \| 0.7350 \| 0.7950 \|
	\| 0.4196 \| 9.0 \| 90 \| 0.6791 \| {'precision': 0.6843243243243243, 'recall': 0.7824474660074165, 'f1': 0.7301038062283737, 'number': 809} \| {'precision': 0.3181818181818182, 'recall': 0.29411764705882354, 'f1': 0.3056768558951965, 'number': 119} \| {'precision': 0.7561807331628303, 'recall': 0.8328638497652582, 'f1': 0.7926720285969615, 'number': 1065} \| 0.7043 \| 0.7802 \| 0.7403 \| 0.7937 \|
	\| 0.3756 \| 10.0 \| 100 \| 0.6968 \| {'precision': 0.7089887640449438, 'recall': 0.7799752781211372, 'f1': 0.7427898763978811, 'number': 809} \| {'precision': 0.328, 'recall': 0.3445378151260504, 'f1': 0.33606557377049184, 'number': 119} \| {'precision': 0.7790393013100436, 'recall': 0.8375586854460094, 'f1': 0.807239819004525, 'number': 1065} \| 0.7241 \| 0.7847 \| 0.7532 \| 0.7947 \|
	\| 0.3402 \| 11.0 \| 110 \| 0.6959 \| {'precision': 0.7024070021881839, 'recall': 0.7935723114956736, 'f1': 0.7452118398142775, 'number': 809} \| {'precision': 0.3416666666666667, 'recall': 0.3445378151260504, 'f1': 0.34309623430962344, 'number': 119} \| {'precision': 0.7791411042944786, 'recall': 0.8347417840375587, 'f1': 0.8059836808703537, 'number': 1065} \| 0.7228 \| 0.7888 \| 0.7543 \| 0.7958 \|
	\| 0.3225 \| 12.0 \| 120 \| 0.6945 \| {'precision': 0.7106430155210643, 'recall': 0.792336217552534, 'f1': 0.7492694330800702, 'number': 809} \| {'precision': 0.3644067796610169, 'recall': 0.36134453781512604, 'f1': 0.3628691983122363, 'number': 119} \| {'precision': 0.7667238421955404, 'recall': 0.8394366197183099, 'f1': 0.8014343343792021, 'number': 1065} \| 0.7219 \| 0.7918 \| 0.7552 \| 0.7961 \|
	\| 0.3031 \| 13.0 \| 130 \| 0.7204 \| {'precision': 0.71, 'recall': 0.7898640296662547, 'f1': 0.7478057343475717, 'number': 809} \| {'precision': 0.35, 'recall': 0.35294117647058826, 'f1': 0.35146443514644354, 'number': 119} \| {'precision': 0.7895204262877442, 'recall': 0.8347417840375587, 'f1': 0.8115015974440895, 'number': 1065} \| 0.7316 \| 0.7878 \| 0.7586 \| 0.7916 \|
	\| 0.289 \| 14.0 \| 140 \| 0.7196 \| {'precision': 0.7095709570957096, 'recall': 0.7972805933250927, 'f1': 0.750873108265425, 'number': 809} \| {'precision': 0.3826086956521739, 'recall': 0.3697478991596639, 'f1': 0.37606837606837606, 'number': 119} \| {'precision': 0.7816593886462883, 'recall': 0.8403755868544601, 'f1': 0.8099547511312217, 'number': 1065} \| 0.7303 \| 0.7948 \| 0.7612 \| 0.7949 \|
	\| 0.2801 \| 15.0 \| 150 \| 0.7204 \| {'precision': 0.7103218645948945, 'recall': 0.7911001236093943, 'f1': 0.7485380116959064, 'number': 809} \| {'precision': 0.3697478991596639, 'recall': 0.3697478991596639, 'f1': 0.3697478991596639, 'number': 119} \| {'precision': 0.7799126637554585, 'recall': 0.8384976525821596, 'f1': 0.8081447963800905, 'number': 1065} \| 0.7284 \| 0.7913 \| 0.7585 \| 0.7930 \|


	### Framework versions

	- Transformers 4.34.0
	- Pytorch 2.0.1+cu118
	- Datasets 2.14.5
	- Tokenizers 0.14.1