Linear isometries on Weighted Coordinates Poset Block Space
Abstract
Given [n]=\1,2,…,n\, a poset order on [n], a label map π : [n] → N defined by π(i)=ki with Σi=1nπ (i) = N, and a weight function w on Fq, let FqN be the vector space of N-tuples over the field Fq equipped with (P,w,π)-metric where FqN is the direct sum of spaces Fqk1, Fqk2, …, Fqkn . In this paper, we determine the groups of linear isometries of (P,w,π)-metric spaces in terms of a semi-direct product, which turns out to be similar to the case of poset (block) metric spaces. In particular, we re-obtain the group of linear isometries of the (P,w)-mertic spaces and (P,π)-mertic spaces.
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