Add to ORKGA general approach for estimating an unknown signal x_0 ∈ R^n from noisy, linear measurements y = Ax_0 + z ∈ R^m is via solving a so called regularized M-estimator: x := arg min_x L(y-Ax) + λf(x). Here, L is a convex loss function, f is a convex (typically, nonsmooth) regularizer, and, λ > 0 a regularizer parameter. We analyze the squared error performance ||x-x_0||^2_2 of such estimators in the high-dimensional proportional regime where m, n → ∞ and m/n → δ. We let the design matrix A have entries iid Gaussian, and, impose minimal and rather mild regularity conditions on the loss function, on the regularizer, and, on the distributions of the noise and of the unknown signal. Under such a generic setting, we show that the squared...
Analysis of non-asymptotic estimation error and structured statistical recovery based on norm regula...
We establish theoretical results concerning all local optima of various regularized M-estimators, wh...
High-dimensional statistical inference deals with models in which the number of parameters $p$ is co...
A general approach for estimating an unknown signal x_0 ∈ R^n from noisy, linear measurements y = ...
A popular approach for estimating an unknown signal x_0 ∈ ℝ^n from noisy, linear measurements y = Ax...
A popular approach for estimating an unknown signal x0 ∈ Rn from noisy, linear measurements y = Ax0 ...
A fundamental problem in modern high-dimensional data analysis involves efficiently inferring a set ...
We consider the problem of estimating an unknown but structured signal x0 from its noisy linear obse...
We establish risk bounds for Regularized Empirical Risk Minimizers (RERM) when the loss is Lipschitz...
Non-smooth regularized convex optimization procedures have emerged as a powerful tool to recover str...
Given an unknown signal x0 ϵ ℝn and linear noisy measurements y = Ax0 + σv ϵ ℝm, the generalized equ...
A classical problem that arises in numerous signal processing applications asks for the reconstructi...
Consider estimating a structured signal x_0 from linear, underdetermined and noisy measurements y = ...
We consider observations $(X,y)$ from single index models with unknown link function, Gaussian covar...
Consider the matrix problem Ax = y + ε = y ̃ in the case where A is known precisely, the problem is ...
Analysis of non-asymptotic estimation error and structured statistical recovery based on norm regula...
We establish theoretical results concerning all local optima of various regularized M-estimators, wh...
High-dimensional statistical inference deals with models in which the number of parameters $p$ is co...
A general approach for estimating an unknown signal x_0 ∈ R^n from noisy, linear measurements y = ...
A popular approach for estimating an unknown signal x_0 ∈ ℝ^n from noisy, linear measurements y = Ax...
A popular approach for estimating an unknown signal x0 ∈ Rn from noisy, linear measurements y = Ax0 ...
A fundamental problem in modern high-dimensional data analysis involves efficiently inferring a set ...
We consider the problem of estimating an unknown but structured signal x0 from its noisy linear obse...
We establish risk bounds for Regularized Empirical Risk Minimizers (RERM) when the loss is Lipschitz...
Non-smooth regularized convex optimization procedures have emerged as a powerful tool to recover str...
Given an unknown signal x0 ϵ ℝn and linear noisy measurements y = Ax0 + σv ϵ ℝm, the generalized equ...
A classical problem that arises in numerous signal processing applications asks for the reconstructi...
Consider estimating a structured signal x_0 from linear, underdetermined and noisy measurements y = ...
We consider observations $(X,y)$ from single index models with unknown link function, Gaussian covar...
Consider the matrix problem Ax = y + ε = y ̃ in the case where A is known precisely, the problem is ...
Analysis of non-asymptotic estimation error and structured statistical recovery based on norm regula...
We establish theoretical results concerning all local optima of various regularized M-estimators, wh...
High-dimensional statistical inference deals with models in which the number of parameters $p$ is co...