Juan Yin scite author profile

Support vector machine is an important and fundamental technique in machine learning. In this paper, we apply a semismooth Newton method to solve two typical SVM models: the L2-loss SVC model and the ǫ-L2-loss SVR model. The semismooth Newton method is widely used in optimization community. A common belief on the semismooth Newton method is its fast convergence rate as well as high computational complexity. Our contribution in this paper is that by exploring the sparse structure of the models, we significantly reduce the computational complexity, meanwhile keeping the quadratic convergence rate. Extensive numerical experiments demonstrate the outstanding performance of the semismooth Newton method, especially for problems with huge size of sample data (for news20.binary problem with 19996 features and 1355191 samples, it only takes three seconds). In particular, for the ǫ-L2-loss SVR model, the semismooth Newton method significantly outperforms the leading solvers including DCD and TRON.

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Reliability and maintenance of systems subject to Gamma degradation and shocks in dynamic environments

Cui

Yin

2021

Applied Mathematical Modelling

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Reliability of consecutive-(k,l)-out-of-n: F systems with shared components under non-homogeneous Markov dependence

Yin

Cui

2022

Reliability Engineering & System Safety

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Reliability modelling for linear and circular k-out-of-n: F systems with shared components

Yin

Cui

Sun

2022

Reliability Engineering & System Safety

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Juan Yin

Reliability for consecutive-k-out-of-n: F systems with shared components between adjacent subsystems

A semismooth Newton method for support vector classification and regression

Reliability and maintenance of systems subject to Gamma degradation and shocks in dynamic environments

Reliability of consecutive-(k,l)-out-of-n: F systems with shared components under non-homogeneous Markov dependence

Reliability modelling for linear and circular k-out-of-n: F systems with shared components

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