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This study analyzes stochastic optimization for pairwise learning with adaptive sampling, offering new generalization guarantees for Pairwise SGD and Pairwise SGDA. The findings improve theoretical understanding for tasks like ranking and metric learning.

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Area of Science:

  • Machine Learning Theory
  • Optimization Algorithms
  • Statistical Learning Theory

Background:

  • Pairwise learning is crucial for ranking, metric learning, and AUC maximization.
  • Existing analyses struggle with statistical dependencies in adaptive sampling for pairwise methods.
  • Adaptive data sampling is common in modern machine learning but poses theoretical challenges.

Purpose of the Study:

  • To extend generalization analysis for stochastic optimization under adaptive sampling in pairwise learning.
  • To provide theoretical guarantees for Pairwise Stochastic Gradient Descent (Pairwise SGD) and Pairwise Stochastic Gradient Descent Ascent (Pairwise SGDA).
  • To address limitations in current analyses concerning adaptive sampling in pairwise learning settings.

Main Methods:

  • Integration of algorithmic stability and PAC-Bayes analysis within a generalized framework.
  • Analysis of Pairwise SGD and Pairwise SGDA, avoiding artificial randomization.
  • Leveraging inherent stochasticity of gradient updates for theoretical guarantees.

Main Results:

  • Achieved generalization guarantees of order n-1/2 under non-uniform adaptive sampling.
  • Results cover both smooth and non-smooth convex settings for pairwise learning.
  • Demonstrated the effectiveness of the extended framework for adaptive sampling scenarios.

Conclusions:

  • The study addresses a significant gap in the theoretical understanding of pairwise learning with adaptive sampling.
  • The derived generalization bounds offer improved insights into the performance of adaptive optimization methods.
  • Findings are applicable to a range of machine learning tasks including ranking and adversarial training.