Compressive sensing (CS) has recently emerged as a powerful framework for
acquiring sparse signals. The bulk of the CS literature has focused on the case
where the acquired signal has a sparse or compressible representation in an
orthonormal basis. In practice, however, there are many signals that cannot be
sparsely represented or approximated using an orthonormal basis, but that do
have sparse representations in a redundant dictionary. Standard results in CS
can sometimes be extended to handle this case provided that the dictionary is
sufficiently incoherent or well-conditioned, but these approaches fail to
address the case of a truly redundant or overcomplete dictionary. In this paper
we describe a variant of the iterative recovery algorithm CoSaMP for this more
challenging setting. We utilize the D-RIP, a condition on the sensing matrix
analogous to the well-known restricted isometry property. In contrast to prior
work, the method and analysis are "signal-focused"; that is, they are oriented
around recovering the signal rather than its dictionary coefficients. Under the
assumption that we have a near-optimal scheme for projecting vectors in signal
space onto the model family of candidate sparse signals, we provide provable
recovery guarantees. Developing a practical algorithm that can provably compute
the required near-optimal projections remains a significant open problem, but
we include simulation results using various heuristics that empirically exhibit
superior performance to traditional recovery algorithms