Essays on Algorithmic Learning and Uncertainty Quantification

• dc.contributor.advisor: Chernozhukov, Victor
• dc.contributor.advisor: Mikusheva, Anna
• dc.contributor.author: Vijaykumar, Suhas
• dc.date.issued: 2023-06
• dc.date.submitted: 2023-06-01T16:03:39.420Z
• dc.identifier.uri: https://hdl.handle.net/1721.1/151512
• dc.description.abstract: The thesis consists of three essays. The first, titled “Localization, Convexity, and Star Aggregation,” develops new analytical tools based upon the offset Rademacher complexity for studying stochastic optimization in non-convex domains, including statistical prediction and model aggregation problems. Using these tools, I show that a simple procedure called the star algorithm can recover near-optimal convergence rates for non-parametric logistic regression in non-convex models. The second essay, titled “Kernel Ridge Regression Inference,” introduces a new technique for deriving sharp, non-asymptotic, uniform Gaussian approximation for partial sums in a reproducing kernel Hilbert space, which is then applied to construct uniform confidence bands for the widely-used kernel ridge regression algorithm. The third and final essay, titled “Frank-Wolfe Meets Metric Entropy,” uses ideas from asymptotic geometry to derive new dimension-dependent and domain-specific lower bounds for conditional gradient algorithms, a class of optimization procedures including the popular Frank-Wolfe algorithm and many of its variants. Such algorithms have found extensive use in machine learning and high-dimensional statistics, motivating a more thorough analysis of their limitations in high-dimensional problems.
• dc.publisher: Massachusetts Institute of Technology
• dc.type: Thesis
• dc.description.degree: Ph.D.
• dc.contributor.department: Massachusetts Institute of Technology. Department of Economics
• dc.identifier.orcid: https://orcid.org/0000-0001-8383-5617
• mit.thesis.degree: Doctoral
• thesis.degree.name: Doctor of Philosophy