Geometric simplicity of spectral radius of nonnegative irreducible tensors 被引量：4

Geometric simplicity of spectral radius of nonnegative irreducible tensors

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摘要 We study irreducible tensors. the real and complex geometric simplicity of nonnegative First, we prove some basic conclusions. Based on the conclusions, the real geometric simplicity of the spectral radius of an even- order nonnegative irreducible tensor is proved. For an odd-order nonnegative irreducible tensor, sufficient conditions are investigated to ensure the spectral radius to be real geometrically simple. Furthermore, the complex geometric simplicity of nonnegative irreducible tensors is also studied. We study irreducible tensors. the real and complex geometric simplicity of nonnegative First, we prove some basic conclusions. Based on the conclusions, the real geometric simplicity of the spectral radius of an even- order nonnegative irreducible tensor is proved. For an odd-order nonnegative irreducible tensor, sufficient conditions are investigated to ensure the spectral radius to be real geometrically simple. Furthermore, the complex geometric simplicity of nonnegative irreducible tensors is also studied.

作者 Yuning YANG Qingzhi YANG

机构地区 School of Mathematical Sciences and LPMC

出处《Frontiers of Mathematics in China》 SCIE CSCD 2013年第1期129-140,共12页 中国高等学校学术文摘·数学（英文）

关键词 Nonnegative irreducible tensor Perron-Frobenius theorem geometrically simple Nonnegative irreducible tensor, Perron-Frobenius theorem,geometrically simple

分类号 O156.2 [理学—基础数学] TB301 [一般工业技术—材料科学与工程]

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参考文献1

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共引文献3

1HU ShengLong,HUANG ZhengHai,QI LiQun.Strictly nonnegative tensors and nonnegative tensor partition[J].Science China Mathematics,2014,57(1):181-195. 被引量：12
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同被引文献6

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引证文献4

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4赵娜,杨庆之.关于非负张量Z-谱半径的一些结果（英文）[J].高等学校计算数学学报,2016,38(2):150-171.

二级引证文献16

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