Litcius/Paper detail

A Proximal Quasi-Newton Trust-Region Method for Nonsmooth Regularized Optimization

Aleksandr Y. Aravkin, Robert Baraldi, Dominique Orban

2022SIAM Journal on Optimization22 citationsDOI

Abstract

We develop a trust-region method for minimizing the sum of a smooth term (f) and a nonsmooth term (h), both of which can be nonconvex. Each iteration of our method minimizes a possibly nonconvex model of (f + h) in a trust region. The model coincides with (f + h) in value and subdifferential at the center. We establish global convergence to a first-order stationary point when (f) satisfies a smoothness condition that holds, in particular, when it has a Lipschitz-continuous gradient, and (h) is proper and lower semicontinuous. The model of (h) is required to be proper, lower semi-continuous and prox-bounded. Under these weak assumptions, we establish a worst-case (O(1/\epsilon^2)) iteration complexity bound that matches the best known complexity bound of standard trust-region methods for smooth optimization. We detail a special instance, named TR-PG, in which we use a limited-memory quasi-Newton model of (f) and compute a step with the proximal gradient method, resulting in a practical proximal quasi-Newton method. We establish similar convergence properties and complexity bound for a quadratic regularization variant, named R2, and provide an interpretation as a proximal gradient method with adaptive step size for nonconvex problems. R2 may also be used to compute steps inside the trust-region method, resulting in an implementation named TR-R2. We describe our Julia implementations and report numerical results on inverse problems from sparse optimization and signal processing. Both TR-PG and TR-R2 exhibit promising performance and compare favorably with two linesearch proximal quasi-Newton methods based on convex models.

Topics & Concepts

MathematicsTrust regionLipschitz continuityRegularization (linguistics)Bounded functionSmoothnessUpper and lower boundsNewton's methodProximal Gradient MethodsApplied mathematicsInverseMathematical optimizationConvex optimizationMathematical analysisComputer scienceRegular polygonNonlinear systemComputer securityPhysicsRADIUSGeometryQuantum mechanicsArtificial intelligenceSparse and Compressive Sensing TechniquesNumerical methods in inverse problemsPhotoacoustic and Ultrasonic Imaging