Real and Complex Rank for Real Symmetric Tensors with Low Ranks

EdoardoBallico; AlessandraBernardi

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Real and Complex Rank for Real Symmetric Tensors with Low Ranks

机译：低秩的实对称张量的实秩和复数秩

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We study the case of a real homogeneous polynomialPwhose minimal real and complex decompositions in terms of powers of linear forms are different. We prove that if the sum of the complex and the real ranks ofPis at most3deg(P)-1, then the difference of the two decompositions is completely determined either on a line or on a conic or two disjoint lines.

机译：我们研究的是实齐次多项式的情况，其最小形式的实数和复数分解在线性形式的幂方面是不同的。我们证明，如果Pis的复数和真实秩的总和最大为3deg（P）-1，那么这两个分解的差就可以完全由一条直线或圆锥或两条不相交的直线确定。

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《Algebra》 |2013年第11期|共5页
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EdoardoBallico; AlessandraBernardi;
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中图分类数学;
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专利

1. An upper bound for the real tensor rank and the real symmetric tensor rank in terms of the complex ranks [J] . E. Ballico Linear & Multilinear Algebra: An International Journal Publishing Articles, Reviews and Problems . 2014,第10a12期

机译：就复数秩而言，实张量秩和实对称张量秩的上限
2. Tensor ranks and symmetric tensor ranks are the same for points with low symmetric tensor rank [J] . Ballico E. Archiv der Mathematik . 2011,第6期

机译：低对称张量等级的点的张量等级和对称张量等级相同
3. Tensor ranks and symmetric tensor ranks are the same for points with low symmetric tensor rank [J] . E. Ballico Archiv der Mathematik . 2011,第6期

机译：低对称张量等级的点的张量等级和对称张量等级相同
4. Nonconvex Low-Rank Symmetric Tensor Completion from Noisy Data [C] . Changxiao Cai, Gen Li, H. Vincent Poor, Conference on Neural Information Processing Systems . 2020

机译：非谐波低秩对称的张力从嘈杂的数据完成完成
5. Real-variable theory and Fourier integral operators on semisimple Lie groups and symmetric spaces of real rank one. [D] . Ionescu, Alexandru Dan. 1999

机译：半实李群和实秩为1的对称空间上的实变量理论和傅里叶积分算子。
6. Real-time phase-contrast flow cardiovascular magnetic resonance with low-rank modeling and parallel imaging [O] . Aiqi Sun, Bo Zhao, Yunduo Li, 2017

机译：低秩建模和并行成像的实时相衬流动心血管磁共振
7. Real and complex rank for real symmetric tensors with low complex symmetric rank [O] . Ballico Edoardo, Bernardi Alessandra 2012

机译：低复对称等级的实对称张量的实和复等级
8. Tait-Bryan Angles Required for Diagonalisation of a Real Symmetric (3 x 3) Rank Two Tensor [R] . Leyland, Jane Anne 1996

机译：实对称（3 x 3）秩2张量的对角化所需的Tait-Bryan角度

Real and Complex Rank for Real Symmetric Tensors with Low Ranks

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