Related papers: Invex Programs: First Order Algorithms and Their Convergence

Invex Programs: First Order Algorithms and Their Convergence

URL: http://arxiv.org/abs/2307.04456v1
Date: Mon, 10 Jul 2023 10:11:01 GMT
Title: Invex Programs: First Order Algorithms and Their Convergence
Authors: Adarsh Barik and Suvrit Sra and Jean Honorio
Abstract summary: Invex programs are a special kind of non-constrained problems which attain global minima at every stationary point. We propose new first-order algorithms to solve general convergence rates in beyondvex problems. Our proposed algorithm is the first algorithm to solve constrained invex programs.
Score: 66.40124280146863
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Invex programs are a special kind of non-convex problems which attain global minima at every stationary point. While classical first-order gradient descent methods can solve them, they converge very slowly. In this paper, we propose new first-order algorithms to solve the general class of invex problems. We identify sufficient conditions for convergence of our algorithms and provide rates of convergence. Furthermore, we go beyond unconstrained problems and provide a novel projected gradient method for constrained invex programs with convergence rate guarantees. We compare and contrast our results with existing first-order algorithms for a variety of unconstrained and constrained invex problems. To the best of our knowledge, our proposed algorithm is the first algorithm to solve constrained invex programs.

Related papers

Accelerating Cutting-Plane Algorithms via Reinforcement Learning Surrogates [49.84541884653309]
A current standard approach to solving convex discrete optimization problems is the use of cutting-plane algorithms. Despite the existence of a number of general-purpose cut-generating algorithms, large-scale discrete optimization problems continue to suffer from intractability. We propose a method for accelerating cutting-plane algorithms via reinforcement learning.
arXiv Detail & Related papers (2023-07-17T20:11:56Z)
Strictly Low Rank Constraint Optimization -- An Asymptotically $\mathcal{O}(\frac{1}{t^2})$ Method [5.770309971945476]
We propose a class of non-text and non-smooth problems with textitrank regularization to promote sparsity in optimal solution. We show that our algorithms are able to achieve a singular convergence of $Ofrac(t2)$, which is exactly same as Nesterov's optimal convergence for first-order methods on smooth convex problems.
arXiv Detail & Related papers (2023-07-04T16:55:41Z)
Accelerated First-Order Optimization under Nonlinear Constraints [73.2273449996098]
We exploit between first-order algorithms for constrained optimization and non-smooth systems to design a new class of accelerated first-order algorithms. An important property of these algorithms is that constraints are expressed in terms of velocities instead of sparse variables.
arXiv Detail & Related papers (2023-02-01T08:50:48Z)
A Single-Loop Gradient Descent and Perturbed Ascent Algorithm for Nonconvex Functional Constrained Optimization [27.07082875330508]
Non constrained inequality problems can be used to model a number machine learning problems, such as multi-class Neyman oracle. Under such a mild condition of regularity it is difficult to balance reduction alternating value loss and reduction constraint violation. In this paper, we propose a novel primal-dual inequality constrained problems algorithm.
arXiv Detail & Related papers (2022-07-12T16:30:34Z)
First-Order Algorithms for Nonlinear Generalized Nash Equilibrium Problems [88.58409977434269]
We consider the problem of computing an equilibrium in a class of nonlinear generalized Nash equilibrium problems (NGNEPs) Our contribution is to provide two simple first-order algorithmic frameworks based on the quadratic penalty method and the augmented Lagrangian method. We provide nonasymptotic theoretical guarantees for these algorithms.
arXiv Detail & Related papers (2022-04-07T00:11:05Z)
A Parameter-free Algorithm for Convex-concave Min-max Problems [33.39558541452866]
cave-free optimization algorithms refer to algorithms whose convergence rate is optimal with respect to the initial point without any learning rate to tune. As a by-product, we utilize the parameter-free algorithm to design a new algorithm, which obtains fast rates for min-max problems with a growth condition.
arXiv Detail & Related papers (2021-02-27T18:10:06Z)
Recent Theoretical Advances in Non-Convex Optimization [56.88981258425256]
Motivated by recent increased interest in analysis of optimization algorithms for non- optimization in deep networks and other problems in data, we give an overview of recent results of theoretical optimization algorithms for non- optimization.
arXiv Detail & Related papers (2020-12-11T08:28:51Z)
Optimal and Practical Algorithms for Smooth and Strongly Convex Decentralized Optimization [21.555331273873175]
We consider the task of decentralized minimization of the sum of smooth strongly convex functions stored across the nodes of a network. We propose two new algorithms for this decentralized optimization problem and equip them with complexity guarantees.
arXiv Detail & Related papers (2020-06-21T11:23:20Z)
Optimal Randomized First-Order Methods for Least-Squares Problems [56.05635751529922]
This class of algorithms encompasses several randomized methods among the fastest solvers for least-squares problems. We focus on two classical embeddings, namely, Gaussian projections and subsampled Hadamard transforms. Our resulting algorithm yields the best complexity known for solving least-squares problems with no condition number dependence.
arXiv Detail & Related papers (2020-02-21T17:45:32Z)

This list is automatically generated from the titles and abstracts of the papers in this site.