COMPUTER SCIENCE
and ENGINEERING

For the estimation of constants in the standard restricted isometry condition for a complex-valued tight frame, a generalization of techniques related to Sparse Principal Component Analysis is developed and applied. We consider certain optimization reformulations of the problem and iterative algorithms for approximating sparse solutions. The eciency of methods is veried by numerical results obtained for several important test examples of tight frames.

Tight frames, Compressed sensing, Quiasirandom matrices, Restricted isometry constants, Discrete combinatorial problems, L1-penalty relaxation, Power method