We consider the problem of estimating the missing mass, partition function or evidence and its probability distribution in the case that for each sample point in the discrete sample space its (unnormalized) probability mass is revealed. Estimating the missing mass or partition function (evidence) is a well-studied problem for which, in different contexts, the harmonic mean estimator and the Good-Turing (and related) estimators are available. For sampling on a discrete set with revealed probability masses these estimators can be Rao-Blackwellized, leading to self-consistent estimators not involving an auxiliary distribution with known total mass. For the case of sampling from a mixture distribution this offers the perspective of anchoring the estimator at both ends: at the diffuse end (high temperature in statistical physics) via an explicit expression for the total probability mass and at the peaked end (low temperature) via the feature of repeated entries in the sample.
Estimation is model-free, but to provide a probability distribution for the missing mass or partition function a model is needed for the distribution of mass. We present one such model, identify sufficient reduced statistics, and analyze the model in various ways -- Bayesian, profile likelihood, maximum likelihood and moment matching -- with the objective of eliminating the mathematical (nuisance) parameters for a final expression in terms of the observed data. The most satisfactory (explicit and transparent) result is obtained by a mixed method that combines Bayesian marginalization or profile likelihood optimization for all but one of the parameters with plain maximum likelihood optimization of the final parameter.