Abstract
The Mojette transform and the finite Radon transform (FRT) are discrete data projection methods that are exactly invertible and are computed using simple addition operations. Incorporation of a known level of redundancy into data and projection spaces enables the use of the FRT to recover the exact, original data when network packets are lost during data transmission. The FRT can also be shown to be Maximum Distance Separable (MDS). By writing the FRT transform in Vandermonde form, explicit expressions for discrete projection and inversion as matrix operations have been obtained. A cyclic, prime-sized Vandermonde form for the FRT approach is shown here to yield explicit polynomial expressions for the recovery of image rows from projected data and vice-versa. These polynomial solutions are consistent with the heuristic algorithms for row-solving that have been published previously. This formalism also opens the way to link ghost projections in FRT space and anti-images in data space that may provide a key to an efficient method of encoding and decoding general data sets in a systematic form.
Original language | English |
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Title of host publication | Wireless Communications and Networking Conference Proceedings |
Editors | Mansoor Shafi, Y Jay Guo |
Place of Publication | USA |
Publisher | IEEE, Institute of Electrical and Electronics Engineers |
Pages | 1 - 6 |
Number of pages | 6 |
Volume | 1 |
ISBN (Print) | 9781424463961 |
DOIs | |
Publication status | Published - 2010 |
Event | IEEE Wireless Communications and Networking Conference 2010 - Sydney Convention and Exhibition Centre, Sydney, Australia Duration: 18 Apr 2010 → 21 Apr 2010 https://ieeexplore.ieee.org/xpl/conhome/5504893/proceeding (Proceedings) |
Conference
Conference | IEEE Wireless Communications and Networking Conference 2010 |
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Abbreviated title | WCNC 2010 |
Country/Territory | Australia |
City | Sydney |
Period | 18/04/10 → 21/04/10 |
Internet address |