Analyzes convergence rates of Tseng's splitting method and two accelerated schemes for monotone inclusion problems with sum of Hölder continuous operators.
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math.OC 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
Authors propose and prove convergence for second-order continuous-time splitting dynamics solving stochastic monotone inclusions under closed-loop distributions, with strong and exponential rates under uniform and strong monotonicity.
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Convergence Rates of Tseng's Splitting Method and Its Acceleration Schemes for Monotone Inclusion Problem with a Sum of H\"older Continuous Operators
Analyzes convergence rates of Tseng's splitting method and two accelerated schemes for monotone inclusion problems with sum of Hölder continuous operators.
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Second order splitting dynamics for stochastic monotone inclusions with closed loop distribution
Authors propose and prove convergence for second-order continuous-time splitting dynamics solving stochastic monotone inclusions under closed-loop distributions, with strong and exponential rates under uniform and strong monotonicity.