Robustness and stability of image-reconstruction algorithms have recently come under scrutiny. Their importance to medical imaging cannot be overstated. We review the known results for the topical variational regularization strategies ($\ell_2$ and $\ell_1$ regularization) and present novel stability results for $\ell_p$-regularized linear inverse problems for $p\in(1,\infty)$. Our results guarantee Lipschitz continuity for small $p$ and H\"{o}lder continuity for larger $p$. They generalize well to the $L_p(\Omega)$ function spaces.
翻译:图像重建算法的坚固性和稳定性最近受到审查,对医学成像的重要性怎么强调都不过分。我们审查了当前变异正规化战略的已知结果($2美元和$1美元),为$p\in(1,\\infty)的正统线性反问题提出了新的稳定性结果。我们的结果保证了利普西茨对小额美元和H\\"{o}lder连续性对大额美元。这些结果概括地说,它们非常符合美元(\\\Omega)的功能空间。
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