Maximal intrinsic randomness of a quantum state

One of the most counterintuitive aspects of quantum theory is its claim that there is 'intrinsic' randomness in the physical world. Quantum information science has greatly progressed in the study of intrinsic, or secret, quantum randomness in the past decade. With much emphasis on device-independent and semi-device-independent bounds, one of the most basic questions has escaped attention: how much intrinsic randomness can be extracted from a given state $\rho$, and what measurements achieve this bound? We answer this question for two different randomness quantifiers: the conditional min-entropy and the conditional von Neumann entropy. For the former, we solve the min-max problem of finding the measurement that minimises the maximal guessing probability of an eavesdropper. The result is that one can guarantee an amount of conditional min-entropy $H^{*}_{\textrm{min}}=-\log_{2}P^{*}_{\textrm{guess}}(\rho)$ with $P^{*}_{\textrm{guess}}(\rho)=\frac{1}{d}\,(\textrm{tr} \sqrt{\rho})^2$ by performing suitable projective measurements. For the latter, we find that its maximal value is $H^{*}= \log_{2}d-S(\rho)$, with $S(\rho)$ the von Neumann entropy of $\rho$. Optimal values for $H^{*}_{\textrm{min}}$ and $H^{*}$ are achieved by measuring in any basis that is unbiased to the eigenbasis of $\rho$, as well as by other less intuitive measurements