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A Game Theoretic Approach to Quantum Information

Quantum Physics 2011-11-10 v2 Computer Science and Game Theory Information Theory math.IT

Abstract

This work is an application of game theory to quantum information. In a state estimate, we are given observations distributed according to an unknown distribution PθP_{\theta} (associated with award QQ), which Nature chooses at random from the set {Pθ:θΘ}\{P_{\theta}: \theta \in \Theta \} according to a known prior distribution μ\mu on Θ\Theta, we produce an estimate MM for the unknown distribution PθP_{\theta}, and in the end, we will suffer a relative entropy cost R(P;M)\mathcal{R}(P;M), measuring the quality of this estimate, therefore the whole utility is taken as PQR(P;M)P \cdot Q -\mathcal{R}(P; M). In an introduction to strategic game, a sufficient condition for minimax theorem is obtained; An estimate is explored in the frame of game theory, and in the view of convex conjugate, we reach one new approach to quantum relative entropy, correspondingly quantum mutual entropy, and quantum channel capacity, which are more general, in the sense, without Radon-Nikodym (RN) derivatives. Also the monotonicity of quantum relative entropy and the additivity of quantum channel capacity are investigated.

Keywords

Cite

@article{arxiv.0710.0556,
  title  = {A Game Theoretic Approach to Quantum Information},
  author = {Xianhua Dai and V. P. Belavkin},
  journal= {arXiv preprint arXiv:0710.0556},
  year   = {2011}
}

Comments

35 pages

R2 v1 2026-06-21T09:25:22.701Z