Approximating the inverse of a balanced symmetric matrix with positive elements
Abstract
For an n× n balanced symmetric matrix T=(ti,j) with positive elements satisfying ti,i= Σj≠ i ti,j and certain bounding conditions, we propose to use the matrix S=(si,j) to approximate its inverse, where si,j=δi,j/ti,i-1/t.., δi,j is the Kronecker delta function, and t..=Σi,j=1 n(1-δi,j) ti,j. An explicit bound on the approximation error is obtained, showing that the inverse is well approximated to order 1/(n-1)2 uniformly.
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