Sciweavers

TIT
2011

Convex Programming Upper Bounds on the Capacity of 2-D Constraints

13 years 7 months ago
Convex Programming Upper Bounds on the Capacity of 2-D Constraints
—The capacity of 1-D constraints is given by the entropy of a corresponding stationary maxentropic Markov chain. Namely, the entropy is maximized over a set of probability distributions, which is defined by some linear equalities and inequalities. In this paper, certain aspects of this characterization are extended to 2-D constraints. The result is a method for calculating an upper bound on the capacity of 2-D constraints. The key steps are: The maxentropic stationary probability distribution on square configurations is considered. A set of linear equalities and inequalities is derived from this stationarity. The result is a convex program, which can be easily solved numerically. Our method improves upon previous upper bounds for the capacity of the 2-D “no independent bits” constraint, as well as certain 2-D RLL constraints.
Ido Tal, Ron M. Roth
Added 15 May 2011
Updated 15 May 2011
Type Journal
Year 2011
Where TIT
Authors Ido Tal, Ron M. Roth
Comments (0)