Abstract / Description of output
We propose a new algorithm for minimizing regularized empirical loss: Stochastic Dual Newton Ascent (SDNA). Our method is dual in nature: in each iteration we update a random subset of the dual variables. However, unlike existing methods such as stochastic dual coordinate ascent, SDNA is capable of utilizing all curvature information contained in the examples, which leads to striking improvements in both theory and practice - sometimes by orders of magnitude. In the special case when an L2-regularizer is used in the primal, the dual problem is a concave quadratic maximization problem plus a separable term. In this regime, SDNA in each step solves a proximal subproblem involving a random principal submatrix of the Hessian of the quadratic function; whence the name of the method. If, in addition, the loss functions are quadratic, our method can be interpreted as a novel variant of the recently introduced Iterative Hessian Sketch.
Original language | English |
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Publication status | Published - 8 Feb 2015 |
Event | 33rd International Conference on Machine Learning: ICML 2016 - New York, United States Duration: 19 Jun 2016 → 24 Jun 2016 https://icml.cc/Conferences/2016/ |
Conference
Conference | 33rd International Conference on Machine Learning |
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Abbreviated title | ICML 2016 |
Country/Territory | United States |
City | New York |
Period | 19/06/16 → 24/06/16 |
Internet address |
Keywords / Materials (for Non-textual outputs)
- cs.LG