Search

Your search keyword '"Kim In Hyoun"' showing total 1,403 results
Start Over Author "Kim In Hyoun"
1,403 results on '"Kim In Hyoun"'

1. Nilpotent perturbations of m-isometric and m-symmetric tensor products of commuting d-tuples of operators

Author

Duggal Bhagwati Prashad and Kim In Hyoun

Subjects
banach space, left/right multiplication operator, m-isometric and m-symmetric commuting d-tuples of operators, tensor product of operators, 47a05, 47a55, 47a11, 47b47, Mathematics, QA1-939
Abstract

If T1{{\mathbb{T}}}_{1} and T2{{\mathbb{T}}}_{2} are commuting dd-tuples of Hilbert space operators in B(ℋ)dB{\left({\mathcal{ {\mathcal H} }})}^{d} such that (T1*⊗I+I⊗T2*,T1⊗I+I⊗T2)\left({{\mathbb{T}}}_{1}^{* }\otimes I+I\otimes {{\mathbb{T}}}_{2}^{* },{{\mathbb{T}}}_{1}\otimes I+I\otimes {{\mathbb{T}}}_{2}) is strictly mm-isometric (resp., mm-symmetric) for some positive integer mm, then there exist a scalar dd-tuple λ\lambda and positive integers mi{m}_{i}, 1≤i≤21\le i\le 2, such that m=m1+2m2−2m={m}_{1}+2{m}_{2}-2, (T1*+λ¯,T1+λ)\left({{\mathbb{T}}}_{1}^{* }+\overline{\lambda },{{\mathbb{T}}}_{1}+\lambda ) is m1{m}_{1} isometric, and T2−λ{{\mathbb{T}}}_{2}-\lambda is m2{m}_{2}-nilpotent (resp., m=m1+m2−1m={m}_{1}+{m}_{2}-1, (T1*+λ¯,T1+λ)\left({{\mathbb{T}}}_{1}^{* }+\overline{\lambda },{{\mathbb{T}}}_{1}+\lambda ) is m1{m}_{1}-symmetric and (T2*−λ¯,T2−λ)\left({{\mathbb{T}}}_{2}^{* }-\overline{\lambda },{{\mathbb{T}}}_{2}-\lambda ) is m2{m}_{2} symmetric).

Published
2024
Full Text
View/download PDF

2. m-Isometric tensor products

Author

Duggal Bhagawati Prashad and Kim In Hyoun

Subjects
banach space, left/right multiplication operator, strict-m-isometric operator, tensor product, primary 47b47, 47a80, secondary 47a80, 47b10, Mathematics, QA1-939
Abstract

Given Banach space operators Si{S}_{i} and Ti{T}_{i}, i=1,2i=1,2, we use elementary properties of the left and right multiplication operators to prove, that if the tensor products pair (S1⊗S2,T1⊗T2)\left({S}_{1}\otimes {S}_{2},{T}_{1}\otimes {T}_{2}) is strictly mm-isometric, i.e., ΔS1⊗S2,T1⊗T2m(I⊗I)=∑j=0m(−1)jmj(S1⊗S2)m−j(T1⊗T2)m−j=0{\Delta }_{{S}_{1}\otimes {S}_{2},{T}_{1}\otimes {T}_{2}}^{m}\left(I\otimes I)={\sum }_{j=0}^{m}{\left(-1)}^{j}\left(\begin{array}{c}m\\ j\end{array}\right){\left({S}_{1}\otimes {S}_{2})}^{m-j}{\left({T}_{1}\otimes {T}_{2})}^{m-j}=0, then there exist a non-zero scalar cc and positive integers m1,m2≤m{m}_{1},{m}_{2}\le m such that m=m1+m2−1m={m}_{1}+{m}_{2}-1, (S1,cT1)\left({S}_{1},c{T}_{1}) is strict-m1{m}_{1}-isometric and S2,1cT2\left({S}_{2},\frac{1}{c}{T}_{2}\right) is strict m2{m}_{2}-isometric.

Published
2023
Full Text
View/download PDF

31. The Fuglede-Putnam theorem for -quasihyponormal operators

Author

Kim In Hyoun

Subjects
Mathematics, QA1-939
Abstract

We show that if is a -quasihyponormal operator and is a -hyponormal operator, and if , where is a quasiaffinity (i.e., a one-one map having dense range), then is a normal and moreover is unitarily equivalent to .

Published
2006

32. Essential spectra of quasisimilar -quasihyponormal operators

Author

Kim In Hyoun and Kim An-Hyun

Subjects
Mathematics, QA1-939
Abstract

It is shown that if is an upper-triangular operator matrix acting on the Hilbert space and if denotes the essential spectrum, then the passage from to is accomplished by removing certain open subsets of from the former. Using this result we establish that quasisimilar -quasihyponormal operators have equal spectra and essential spectra.

Published
2006

Catalog

Books, media, physical & digital resources
See catalog results