Classification with Trust: A Supervised Approach based on Sequential Ellipsoidal Partitioning
This addresses the need for reliable trust measures in classification for users in fields like healthcare or finance, though it appears incremental as it builds on existing partitioning and Bayesian approaches.
The paper tackles the problem of quantifying trust in classifier predictions by introducing a convex optimization-based method that partitions data into ellipsoids and uses Bayes' formula to compute trust scores, demonstrating performance on datasets like XOR and circle problems.
Standard metrics of performance of classifiers, such as accuracy and sensitivity, do not reveal the trust or confidence in the predicted labels of data. While other metrics such as the computed probability of a label or the signed distance from a hyperplane can act as a trust measure, these are subjected to heuristic thresholds. This paper presents a convex optimization-based supervised classifier that sequentially partitions a dataset into several ellipsoids, where each ellipsoid contains nearly all points of the same label. By stating classification rules based on this partitioning, Bayes' formula is then applied to calculate a trust score to a label assigned to a test datapoint determined from these rules. The proposed Sequential Ellipsoidal Partitioning Classifier (SEP-C) exposes dataset irregularities, such as degree of overlap, without requiring a separate exploratory data analysis. The rules of classification, which are free of hyperparameters, are also not affected by class-imbalance, the underlying data distribution, or number of features. SEP-C does not require the use of non-linear kernels when the dataset is not linearly separable. The performance, and comparison with other methods, of SEP-C is demonstrated on the XOR-problem, circle dataset, and other open-source datasets.