# ALBERT for Math AR This model is further pre-trained on the Mathematics StackExchange questions and answers. It is based on Albert base v2 and uses the same tokenizer. In addition to pre-training the model was finetuned on Math Question Answer Retrieval. The sequence classification head is trained to output a relevance score if you input the question as the first segment and the answer as the second segment. You can use the relevance score to rank different answers for retrieval. ## Usage ``` from transformers import AutoTokenizer, AutoModelForSequenceClassification import torch tokenizer = AutoTokenizer.from_pretrained("albert-base-v2") model = AutoModelForSequenceClassification.from_pretrained("AnReu/albert-for-math-ar-base-ft") classes = ["non relevant", "relevant"] sequence_0 = "How can I calculate x in $3x = 5$" sequence_1 = "Just divide by 3: $x = \\frac{5}{3}$" sequence_2 = "The general rule for squaring a sum is $(a+b)^2=a^2+2ab+b^2$" # The tokenizer will automatically add any model specific separators (i.e. and ) and tokens to # the sequence, as well as compute the attention masks. irrelevant = tokenizer(sequence_0, sequence_2, return_tensors="pt") relevant = tokenizer(sequence_0, sequence_1, return_tensors="pt") irrelevant_classification_logits = model(**irrelevant).logits relevant_classification_logits = model(**relevant).logits irrelevant_results = torch.softmax(irrelevant_classification_logits, dim=1).tolist()[0] relevant_results = torch.softmax(relevant_classification_logits, dim=1).tolist()[0] # Should be irrelevant for i in range(len(classes)): print(f"{classes[i]}: {int(round(irrelevant_results[i] * 100))}%") # Should be relevant for i in range(len(classes)): print(f"{classes[i]}: {int(round(relevant_results[i] * 100))}%") ``` ## Reference If you use this model, please consider referencing our paper: ``` @inproceedings{reusch2021tu_dbs, title={TU\_DBS in the ARQMath Lab 2021, CLEF}, author={Reusch, Anja and Thiele, Maik and Lehner, Wolfgang}, year={2021}, organization={CLEF} } ```