Abstract
In the frame theory, stability is one of the most important properties of frames. In this paper, we investigate the stability of the almost self‐located robust frames, which can reconstruct signals from its unordered partial frame coefficients. We give conditions on the stability of almost self‐located robustness of frames in erasure recovery. We prove that the property of almost self‐located robustness is preserved with respect to an invertible operator, and consequently, every almost self‐robust frame can be transformed into an almost self‐located robust Parseval frame by using a special invertible transformation. We also present some construction methods of almost self‐located robust frames. In particular, we show that every frame can be rescaled to an almost self‐located frame after adding a suitable vector.
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