We extend the method of conformal prediction beyond the case relying on labeled calibration data. Replacing the calibration scores by suitable estimates, we identify conformity sets C for classification and regression models that rely on unlabeled calibration data. Given a classification model with accuracy 1-β, we prove that the conformity sets guarantee a coverage of P (Y C) 1-α-β for an arbitrary parameter α (0, 1). The same coverage guarantee also holds for regression models, if we replace the accuracy by a similar exactness measure. Finally, we describe how to use the theoretical results in practice.
Flechsig et al. (Fri,) studied this question.