Coding Theorem Based On -Norm Entropy For Partitions in Product MV-Algebras
DOI:
https://doi.org/10.30495/jme.v17i0.2319Keywords:
-norm entropy, Product MV-algebra, code word length, Kraft inequality.Abstract
n the present paper Shannon and \lambda-norm mean code wordlength is defined in Product MV-algebra. Two new measures Lf (P) andLf(P) called average code word lengths with respect to entropies of finite partitions in product MV-algebras are given and its relationshipwith the Shannon type information measure and \lamda-norm type infor-mation measures of finite partitions in product MV-algebras has beenexamined. Some coding theorems using Kraft inequality has been east-ablished in this structure.
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