Some properties of row-adjusted meet and join matrices
Abstract
Let (P,) be a lattice, S a finite subset of P and f1,f2,...,fn complex-valued functions on P. We define row-adjusted meet and join matrices on S by (S)f1,...,fn=(fi(xi xj)) and [S]f1,...,fn=(fi(xi xj)). In this paper we determine the structure of the matrix (S)f1,...,fn in general case and in the case when the set S is meet closed we give bounds for rank (S)f1,...,fn and present expressions for (S)f1,...,fn and (S)f1,...,fn-1. The same is carried out dually for row-adjusted join matrix of a join closed set S.
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