On frames from abelian group codes
- Creators
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Thill, Matthew
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Hassibi, Babak
Abstract
Designing low coherence matrices and low-correlation frames is a point of interest in many fields including compressed sensing, MIMO communications and quantum measurements. The challenge is that one must control the (^n_2) pairwise inner products between the frame elements. In this paper, we exploit the group code approach of David Slepian [1], which constructs frames using unitary group representations and which in general reduces the number of distinct inner products to n - 1. We demonstrate how to efficiently find optimal representations of cyclic groups, and we show how basic abelian groups can be used to construct tight frames that have the same dimensions and inner products as those arising from certain more complex nonabelian groups. We support our work with theoretical bounds and simulations.
Additional Information
© 2013 IEEE. This work was supported in part by the National Science Foun- dation under grants CCF-0729203, CNS-0932428 and CCF-1018927, by the Office of Naval Research under the MURI grant N00014-08-1-0747, and by Caltech's Lee Center for Advanced Networking. The first author was supported by the Department of Defense (DoD) through the National Defense Science & Engineering Graduate Fellowship (NDSEG) Program.Additional details
- Eprint ID
- 55128
- Resolver ID
- CaltechAUTHORS:20150224-072315309
- CCF-0729203
- NSF
- CNS-0932428
- NSF
- CCF-1018927
- NSF
- N00014-08-1-0747
- Office of Naval Research (ONR)
- Caltech Lee Center for Advanced Networking
- National Defense Science and Engineering Graduate (NDSEG) Fellowship
- Created
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2015-02-25Created from EPrint's datestamp field
- Updated
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2021-11-10Created from EPrint's last_modified field