English

The Squared-Error of Generalized LASSO: A Precise Analysis

Information Theory 2013-11-07 v2 math.IT Optimization and Control Machine Learning

Abstract

We consider the problem of estimating an unknown signal x0x_0 from noisy linear observations y=Ax0+zRmy = Ax_0 + z\in R^m. In many practical instances, x0x_0 has a certain structure that can be captured by a structure inducing convex function f()f(\cdot). For example, 1\ell_1 norm can be used to encourage a sparse solution. To estimate x0x_0 with the aid of f()f(\cdot), we consider the well-known LASSO method and provide sharp characterization of its performance. We assume the entries of the measurement matrix AA and the noise vector zz have zero-mean normal distributions with variances 11 and σ2\sigma^2 respectively. For the LASSO estimator xx^*, we attempt to calculate the Normalized Square Error (NSE) defined as xx022σ2\frac{\|x^*-x_0\|_2^2}{\sigma^2} as a function of the noise level σ\sigma, the number of observations mm and the structure of the signal. We show that, the structure of the signal x0x_0 and choice of the function f()f(\cdot) enter the error formulae through the summary parameters D(cone)D(cone) and D(λ)D(\lambda), which are defined as the Gaussian squared-distances to the subdifferential cone and to the λ\lambda-scaled subdifferential, respectively. The first LASSO estimator assumes a-priori knowledge of f(x0)f(x_0) and is given by argminx{yAx2 subject to f(x)f(x0)}\arg\min_{x}\{{\|y-Ax\|_2}~\text{subject to}~f(x)\leq f(x_0)\}. We prove that its worst case NSE is achieved when σ0\sigma\rightarrow 0 and concentrates around D(cone)mD(cone)\frac{D(cone)}{m-D(cone)}. Secondly, we consider argminx{yAx2+λf(x)}\arg\min_{x}\{\|y-Ax\|_2+\lambda f(x)\}, for some λ0\lambda\geq 0. This time the NSE formula depends on the choice of λ\lambda and is given by D(λ)mD(λ)\frac{D(\lambda)}{m-D(\lambda)}. We then establish a mapping between this and the third estimator argminx{12yAx22+λf(x)}\arg\min_{x}\{\frac{1}{2}\|y-Ax\|_2^2+ \lambda f(x)\}. Finally, for a number of important structured signal classes, we translate our abstract formulae to closed-form upper bounds on the NSE.

Keywords

Cite

@article{arxiv.1311.0830,
  title  = {The Squared-Error of Generalized LASSO: A Precise Analysis},
  author = {Samet Oymak and Christos Thrampoulidis and Babak Hassibi},
  journal= {arXiv preprint arXiv:1311.0830},
  year   = {2013}
}
R2 v1 2026-06-22T02:00:48.440Z