On existence and construction of orthoscalar collections of subspaces
Abstract
This paper is devoted to the studu of orthoscalar tuples of subspaces in a complex Hilbert space, i.e. such that their orthoprojections sums up to a scalar operator. Such objects also known as tight fusion frames. They have a particularly usefulness in signal processing [3, 7, 8] and were studied in a number of works. For example, in [1] the question about possible values of the corresponding scalar was resolved. In [2] authors gave a criterion for existence of equal-rank tight fusion frames and presented a method for their construction, the so-called ’Spectral Tetris’. In this paper we present an explicit and simpler version of that criterion and supply it with a different proof.
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Published
2017-11-26
How to Cite
Ostrovskyi, V. L., & Yakymenko, D. Y. (2017). On existence and construction of orthoscalar collections of subspaces. Transactions of Institute of Mathematics, the NAS of Ukraine, 12(1), 154–165. Retrieved from https://trim.imath.kiev.ua/index.php/trim/article/view/11
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Research papers