Cyber-Physical-Systems and Secrecy Outage Probability: Revisited

Abstract

This paper technically explores the secrecy rate and a maximisation problem over the concave version of the secrecy outage probability (SOP) as Max \; Pr ( λ ) . We do this from a generic viewpoint even though we use a traditional Wyner's wiretap channel for our system model - something that can be extended to every kind of secrecy modeling and analysis. We consider a Riemannian mani-fold for it and we mathematically define a volume for it as Vol . Through achieving a new bound for the Riemannian mani-fold and its volume, we subsequently relate it to the number of eigen-values existing in the relative probabilistic closure. We prove in-between some novel lemmas with the aid of some useful inequalities such as the Finsler's lemma, the generalised Young's inequality, the generalised Brunn-Minkowski inequality, the Talagrand's concentration inequality. We additionally propose a novel Markov decision process based reinforcement learning algorithm in order to find the optimal policy in relation to the eigenvalue distributions - something that is extended to a possibilisitically semi-Markov decision process for the case of periodic attacks.