標題: | 張量積的數值域 Numerical Ranges of Tensor Products |
作者: | 吳培元 WU PEI YUAN 國立交通大學應用數學系(所) |
關鍵字: | 數值域;數值半徑;張量積;Numerical range;numerical radius;tensor product |
公開日期: | 2012 |
摘要: | 在此一研究計畫中, 我們將探討, 對一個在複希伯特空間上的線性
有界算子A, 何時A 與A 的張量積的數值半徑會和A 的範數和A 的數
值半徑的乘積相等. 已知的是前者一定小於或等於後者. 我們希望
將二者的相等和A 的結構性質拉上關係, 並已獲致一些部分結果. 例
如, 現在已知, 設一個有限矩陣A 的範數為1, 則由此相等可推論出
A 有酉部分或A 的數值域是一個中心點為原點的圓盤. 設A 是一個非
負矩陣, 且其實數部分是不可約的, 則我們可以得到一個完整的刻
劃. In this project, we want to study, for a bounded linear operator A on a complex Hilbert space, when the equality of the numerical radius of the tensor product of A with A and the product of the norm of A and the numerical radius of A occurs. It is known that the former is always less than or equal to the latter. We try to relate the equality to the structure properties of the operator A and have already obtained some partial results. For example, it is now known that, under the assumption of the norm of the finite matrix A equal to 1, the equality implies that either A has a unitary part or the numerical range of A is a circular disc centered at the origin. When A is an (entry-wise) nonnegative matrix with its real part (permutationally) irreducible, we do have a complete characterization. |
官方說明文件#: | NSC101-2115-M009-004 |
URI: | http://hdl.handle.net/11536/97103 https://www.grb.gov.tw/search/planDetail?id=2593847&docId=392350 |
Appears in Collections: | Research Plans |
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