Duals and invariances of frame sequences | Zendy

Shan Bishop | Zendy; Christopher Heil | Zendy; Yoo Young Koo | Zendy; Jae Kun Lim | Zendy

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Duals and invariances of frame sequences

Author(s) -

Shan Bishop,

Christopher Heil,

Yoo Young Koo,

Jae Kun Lim

Publication year - 2009

Publication title -

proceedings of spie, the international society for optical engineering/proceedings of spie

Language(s) - English

Resource type - Conference proceedings

SCImago Journal Rank - 0.192

H-Index - 176

eISSN - 1996-756X

pISSN - 0277-786X

DOI - 10.1117/12.824220

Subject(s) - dual polyhedron , frame (networking) , invariant (physics) , computer science , group (periodic table) , perturbation (astronomy) , mathematics , pure mathematics , telecommunications , physics , quantum mechanics , mathematical physics

This paper surveys recent results on frame sequences. The first group of results characterizes the relationships that hold among various types of dual frame sequences. The second group of results characterizes the relationships that hold among the major Paley-Wiener perturbation theorems for frame sequences, and some of the properties that remain invariant under such perturbations.

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