We propose a novel sparsity model for distributed compressed sensing in the multiple measurement vectors (MMV) setting. Our model extends the concept of row-sparsity to allow more general types of structured sparsity arising in a variety of applications like, e.g., seismic exploration and non-destructive testing. To reconstruct structured data from observed measurements, we derive a non-convex but well-conditioned LASSO-type functional. By exploiting the convex-concave geometry of the functional, we design a projected gradient descent algorithm and show its effectiveness in extensive numerical simulations, both on toy and real data.
翻译:我们提出了一种在多种测量矢量(MMV)设置中进行分布式压缩感测的新的聚度模型。我们的模型扩展了行分的概念,允许在地震勘探和非破坏性测试等各种应用中产生更一般的结构性聚度。为了从观测到的测量中重建结构化数据,我们得出一种非混凝土但有良好条件的LASSO型功能。我们通过利用功能的convex-concove几何测量,设计了预测梯度下行算法,并在玩具和真实数据的广泛数字模拟中显示出其有效性。
相关内容
微信扫码咨询专知VIP会员