import numpy as np import sklearn.metrics as mt # ECE from https://towardsdatascience.com/expected-calibration-error-ece-a-step-by-step-visual-explanation-with-python-code-c3e9aa12937d def ECE(predicted_labels, confidences, true_labels, M=5): # Uniform M bins bin_boundaries = np.linspace(0, 1, M + 1) bin_lowers = bin_boundaries[:-1] bin_uppers = bin_boundaries[1:] # get correct/false accuracies = predicted_labels == true_labels ece = np.zeros(1) for bin_lower, bin_upper in zip(bin_lowers, bin_uppers): # bin sample in_bin = np.logical_and( confidences > bin_lower.item(), confidences <= bin_upper.item() ) prob_in_bin = in_bin.mean() if prob_in_bin > 0: accuracy_in_bin = accuracies[in_bin].mean() avg_confid = confidences[in_bin].mean() ece += np.abs(avg_confid - accuracy_in_bin) * prob_in_bin return ece[0] # Maximum Calibration error - maximum of error per bin def MCE(predicted_labels, confidences, true_labels, M=5): bin_boundaries = np.linspace(0, 1, M + 1) bin_lowers = bin_boundaries[:-1] bin_uppers = bin_boundaries[1:] # get correct/false accuracies = predicted_labels == true_labels mces = [] for bin_lower, bin_upper in zip(bin_lowers, bin_uppers): # bin sample in_bin = np.logical_and( confidences > bin_lower.item(), confidences < bin_upper.item() ) prob_in_bin = in_bin.mean() if prob_in_bin > 0: accuracy_in_bin = accuracies[in_bin].mean() avg_confid = confidences[in_bin].mean() mces.append(np.abs(avg_confid - accuracy_in_bin)) return max(mces) def F1(predicted_labels, true_labels): tp = np.sum(np.logical_and(predicted_labels == 1, true_labels == 1)) fp = np.sum(np.logical_and(predicted_labels == 1, true_labels == 0)) fn = np.sum(np.logical_and(predicted_labels == 0, true_labels == 1)) precision = tp / (tp + fp) recall = tp / (tp + fn) return 2 * (precision * recall) / (precision + recall) # Uses sklearn's AUC function # Requieres confidences to be the predicted probabilities for the positive class def AUC(confidences, true_labels): fpr, tpr, _ = mt.roc_curve(true_labels, confidences) return mt.auc(fpr, tpr) def entropy(confidences): return -np.sum(confidences * np.log(confidences))