Title :
Accurate Lower Bounds on 2-D Constraint Capacities From Corner Transfer Matrices
Author :
Yao-Ban Chan ; Rechnitzer, Andrew
Author_Institution :
Univ. of Vienna, Vienna, Austria
Abstract :
We analyse the capacity of several 2-D constraint families-the exclusion, coloring, parity, and charge model families. Using Baxter´s corner transfer matrix formalism combined with the corner transfer matrix renormalization group method of Nishino and Okunishi, we calculate very tight lower bounds and estimates on the growth rates of these models. Our results strongly improve previous known lower bounds and lead to the surprising conjecture that the capacity of the even and charge(3) constraints are identical.
Keywords :
channel capacity; matrix algebra; 2D constraint capacities; Baxter corner transfer matrix formalism; accurate lower bounds; channel capacity; charge model family; coloring family; corner transfer matrices; corner transfer matrix renormalization group method; exclusion family; growth rates; parity family; Analytical models; Educational institutions; Encoding; Face; Lattices; Materials; Numerical models; Channel capacity; corner transfer matrices; min-max principle; multi-dimensional constraints;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2014.2321554
