Machine Learning Calabi-Yau Three-Folds, Four-Folds, and Five-Folds

Abstract

In this manuscript, we demonstrate, using several regression techniques, that the remaining independent Hodge numbers of complete intersection Calabi-Yau four-folds and five-folds can be machine learned from h1,1 and h2,1. Consequently, we combine the Hodge numbers h1,1 and h2,1 from the complete intersection Calabi-Yau three-folds, four-folds, and five-folds into a single dataset. We then implement various classification algorithms on this dataset. For example, Gaussian process and naive Bayes classifiers both achieve 100\% accuracy in binary classification between three-folds and four-folds. Using the Support Vector Machine (SVM) algorithm, a special corner is identified in the Calabi-Yau four-fold landscape (characterized by 15 ≤ h1,1 ≤ 30 and 95 ≤ h2,1 ≤ 100) during multiclass classification. Furthermore, the highest accuracy 1.00000, in classifying Calabi-Yau three-folds, four-folds, and five-folds is obtained using the naive Bayes classifier.

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