This paper proposes a new two-step procedure for sparse-view tomographic image reconstruction. It is called RISING, since it combines an early-stopped Rapid Iterative Solver with a subsequent Iteration Network-based Gaining step. So far, regularized iterative methods have widely been used for X-ray computed tomography image reconstruction from low-sampled data, since they converge to a sparse solution in a suitable domain, as upheld by the Compressed Sensing theory. Unfortunately, their use is practically limited by their high computational cost which imposes to perform only a few iterations in the available time for clinical exams. Data-driven methods, using neural networks to post-process a coarse and noisy image obtained from geometrical algorithms, have been recently studied and appreciated for both their computational speed and accurate reconstructions. However, there is no evidence, neither theoretically nor numerically, that neural networks based algorithms solve the mathematical inverse problem modeling the tomographic reconstruction process. In our two-step approach, the first phase executes very few iterations of a regularized model-based algorithm whereas the second step completes the missing iterations by means of a neural network. The resulting hybrid deep-variational framework preserves the convergence properties of the iterative method and, at the same time, it exploits the computational speed and flexibility of a data-driven approach. Experiments performed on a simulated and a real data set confirm the numerical and visual accuracy of the reconstructed RISING images in short computational times.
翻译:本文建议了一个新的“ 低视透视图像重建” 两步程序。 它被称为“ RIING ”, 因为它将早期停止的快速迭代解答器与随后的“ 迭代网络” 增益步骤结合起来。 到目前为止, 常规化的迭代方法已被广泛用于从低抽样数据中进行X光计算断层图像重建, 因为它们在“ 压缩遥感理论” 所坚持的、 在一个合适的域中汇合到一个稀薄的解决方案。 不幸的是, 它们的使用实际上受到其高计算成本的限制, 这要求它们在临床检查的可用时间里只进行几次迭代。 数据驱动方法, 利用神经化网络处理从几部测算算算算算算算法中获得的粗和噪音图像。 然而, 没有任何证据, 无论是从理论上还是从数字上看, 神经网络的算法解决了数学反向短期的模拟重建过程。 在我们的两步法方法中, 第一阶段只执行很少执行定期的基于模型化的精度趋性直观性直观性直观的直观和精确度递化的直观性图像, 而后期进行一个基于深度测算算算方法, 的精确的精确的精确的计算, 的精确化的计算, 的精确化的计算方法是它所演的精确的精确化的计算方法, 。