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首页> 外文期刊>Linear & Multilinear Algebra: An International Journal Publishing Articles, Reviews and Problems >Linear preservers of rank-sum-maximum, rank, rank-subtractivity, and rank-sum-minimum on symmetric matrices
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Linear preservers of rank-sum-maximum, rank, rank-subtractivity, and rank-sum-minimum on symmetric matrices

机译:对称矩阵上秩和最大值,秩,秩减性和秩和最小值的线性守恒

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摘要

Let S-n(F) be the set of all n x n symmetric matrices over a field F. For a matrix A is an element of S-n(F), rho(A) denotes the rank of A. A pair of n x n matrices (A, B) is said to be rank-sum-maximal if rho(A + B) = rho(A) + rho(B), rank-sum-minimal if rho(A + B) = ho(A) - rho(B), and rail k-subtractive if rho(A - B) = rho(A) - rho(B). We say that a linear operator phi from S-n(F) to itself is a linear preserver of rank-sum-maximum (respectively, rank-sum-minimum and rank-subtractivity) oil S-n(F) if it preserves the set of all rank-sum-maximal (respectively, rank-sum-minimal and rank-subtractive) pairs, and or rank on S-n(F) if rho(phi(X)) = rho(X) for every X is an element of S-n(F). We first characterize the linear preservers of rank-sum-maximum on S-n(F) when F is arbitrary, and thereby, linear preservers of rank (respectively, rank-subtractivity and rank-sum-minimum) oil S-n(F) are characterized.
机译:令Sn(F)为场F上所有nxn个对称矩阵的集合。对于矩阵A是Sn(F)的元素,rho(A)表示A的秩。一对nxn矩阵(A,B )如果rho(A + B)= rho(A)+ rho(B)被称为秩和最大值,如果rho(A + B)= rho(A)-rho(B ),如果rho(A-B)= rho(A)-rho(B),则将k减去。我们说从Sn(F)到其自身的线性算子phi是保留所有等级的集合的Sn(F)油的等级总和最大(分别是等级总和最小和等级相减)的线性保留者。 -sum-maximum(分别是等级和最小和等级减法)对,或如果每个X的rho(phi(X))= rho(X)是Sn(F )。首先,当F为任意值时,对S-n(F)上的最大秩和线性保持子进行刻画,从而表征了等级S-n(F)的线性(分别为秩减和最小和秩和最小)线性保持子。

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