Title :
Entropy bounds for constrained two-dimensional random fields
Author :
Forchhammer, Søren ; Justesen, Jørn
Author_Institution :
Dept. of Telecommun., Tech. Univ., Lyngby, Denmark
fDate :
1/1/1999 12:00:00 AM
Abstract :
The maximum entropy and thereby the capacity of two-dimensional (2-D) fields given by certain constraints on configurations is considered. Upper and lower bounds are derived. A new class of 2-D processes yielding good lower bounds is introduced. Asymptotically, the process achieves capacity for constraints with limited long-range effects. The processes are general and may also be applied to, e.g., data compression of digital images. Results are given for the binary hard square model, which is a 2-D run-length-limited model and some other 2-D models with simple constraints
Keywords :
data compression; image coding; maximum entropy methods; random processes; 2D fields; 2D processes; 2D run-length-limited model; binary hard square model; capacity; constrained two-dimensional random fields; data compression; digital images; entropy bounds; limited long-range effects; lower bounds; maximum entropy; upper bounds; Channel capacity; Data compression; Digital images; Digital magnetic recording; Entropy; Holography; Lattices; Magnetic analysis; Probability distribution; Two dimensional displays;
Journal_Title :
Information Theory, IEEE Transactions on
