| 张志伟,马杰,夏克文,李昱乐.一种应用于高阶数据修复的非负稀疏Tucker分解算法[J].光电子激光,2017,28(7):773~779 |
| 一种应用于高阶数据修复的非负稀疏Tucker分解算法 |
| A sparse nonnegative Tucker decomposition for higher-order data inpainting |
| 投稿时间:2016-06-08 |
| DOI: |
| 中文关键词: 张量修复 稀疏非负Tucker(SN-Tucker)分解 低秩张量 交替近端梯度算法(APGM) |
| 英文关键词:tensor inpainting sparse nonnegative Tucker (SN-Tucker) decomposition low-ra nk tensor alternating proximal gradient method (APGM) |
| 基金项目:河北省自然科学基金(E2016202341)和河北省高等学科科学技术研究(BJ2014013)资助项目 (河北工业大学 电子信息工程学院,天津 300130) |
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| 中文摘要: |
| 针对传统的张量填充算法对于不满足低秩条件的张量填充效果难以保证,本文采用张量分 解的方法实现缺失张 量的修复,即对传统Tucker分解算法进行改造,在其目标函数中增加对核心张量和系数矩 阵的非负性以及 核心张量的稀疏性约束,再利用凸优化理论中的交替近端梯度算法(APGM)对目标函数进 行迭代寻优, 在分解的同时实现缺失数据点的填充。医学图像、彩色图像和视频图像的修复结果表明,本 文 算法能够对高阶非负张量的缺失实现较好地修复,修复的视觉效果和技术指标都优于当前主 流算法。 |
| 英文摘要: |
| In this paper,a novel method for the factorization of a tensor with missing dat a is proposed for higher-order data inpainting.The proposed method enforces nonnegativity on core tensor and factor matrices,while sparseness on core tensor in Tucker factorization,and alternating proximal gradient method (AP GM) can be used for minimizing the modified Tucker function.Numerical experiments are conducted in medical magnetic resonanc e imaging (MRI) images,color images and videos,and the simulation results demonstrate that the proposed inpainting method outperforms t he state-of-art tensor factorization and tensor completion based methods.It achieves higher performance in terms o f peak signal to noise ratio (PSNR),structural similarity index measurement (SSIM) and root mean square error (RMSE). |
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