It is well known that the mutual information between two random variables can be expressed as the difference of two relative entropies that depend on an auxiliary distribution, a relation sometimes referred to as the golden formula.
Jun 19, 2017
To demonstrate the usefulness of this finite-blocklength ex- tension of the golden formula, the beta-beta achievability and converse bounds are used to obtain a ...
establishing a finite-blocklength analog of the golden formula by proving the following achievability counterpart of (4). Theorem 1 (ββ achievability bound): ...
It is well known that the mutual information between two random variables can be expressed as the difference of two relative entropies that depend on an ...
16-May-2018, Beta–Beta Bounds: Finite-Blocklength Analog of the Golden Formula, Yang, Wei; Collins, Austin; Durisi, Giuseppe; Polyanskiy, Yury; Poor, H Vincent.
Jan 22, 2016 · establishing a finite-blocklength analog of the golden formula by proving the following achievability counterpart of (4). Theorem 1 (ββ ...
Austin Daniel Collins's 6 research works with 101 citations, including: Beta-Beta Bounds: Finite-Blocklength Analog of the Golden Formula.
Poor, “Beta-beta bounds: Finite-blocklength analog of the golden formula,” IEEE Trans. Inf. Theory, vol. 64, no. 9, pp. 6236–6256, Sep. 2018. [5] A ...
Apr 25, 2024 · Beta-Beta Bounds: Finite-Blocklength Analog of the Golden Formula. IEEE Trans. Inf. Theory 64(9): 6236-6256 (2018); 2017. [i3]. view. electronic ...
Title: Beta-Beta Bounds: Finite-Blocklength Analog of the Golden Formula. Authors: Wei Yang, Austin Collins, Giuseppe Durisi, Yury Polyanskiy, H. Vincent ...