We consider the problem of recovering an unknown signal ${\mathbf x}\in {\mathbb R}^n$ from general nonlinear measurements obtained through a generalized linear model (GLM), i.e., ${\mathbf y}= f\left({\mathbf A}{\mathbf x}+{\mathbf w}\right)$, where $f(\cdot)$ is a componentwise nonlinear function. Based on the unitary transform approximate message passing (UAMP) and expectation propagation, a unitary transform based generalized approximate message passing (GUAMP) algorithm is proposed for general measurement matrices $\bf{A}$, in particular highly correlated matrices. Experimental results on quantized compressed sensing demonstrate that the proposed GUAMP significantly outperforms state-of-the-art GAMP and GVAMP under correlated matrices $\bf{A}$.
翻译:我们考虑从通过一般线性模型(GLM)获得的一般非线性测量中回收一个未知信号$_mathbf x ⁇ in {mathbrb {nb}}n$的问题,即:$_mathbf y ⁇ f f\\left(#mathbf Aunmathbf x ⁇ mathbf w ⁇ right)$,其中$f(\cdot)是非线性功能的组成部分。根据统一转换电文传递(UAMP)和预期传播,建议为一般测量矩阵($\bf{A}),特别是高度关联的基质,采用基于通用信息传递(GUAMP)的单一转换算法。
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