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A new class of spectrally arbitrary complex sign pattern

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摘要 Assume that S is an nth-order complex sign pattern.If for every nth degree complex coefficient polynomial f(λ)with a leading coefficient of 1,there exists a complex matrix C∈Q(S)such that the characteristic polynomial of C is f(λ),then S is called a spectrally arbitrary complex sign pattern.That is,if the spectrum of nth-order complex sign pattern S is a set comprised of all spectra of nth-order complex matrices,then S is called a spectrally arbitrary complex sign pattern.This paper presents a class of spectrally arbitrary complex sign pattern with only 3n nonzero elements by adopting the method of Schur complement and row reduction.
机构地区 School of Mathematics
出处 《Frontiers of Mathematics in China》 CSCD 2024年第1期13-24,共12页 中国高等学校学术文摘·数学(英文)
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