Name
Abstract | ||
|---|---|---|
In this work we develop Curvature Propagation (CP), a general technique for efficiently computing unbiased approximations of the Hessian of any function that is computed using a computational graph. At the cost of roughly two gradient evaluations, CP can give a rank-1 approximation of the whole Hessian, and can be repeatedly applied to give increasingly precise unbiased estimates of any or all of the entries of the Hessian. Of particular interest is the diagonal of the Hessian, for which no general approach is known to exist that is both efficient and accurate. We show in experiments that CP turns out to work well in practice, giving very accurate estimates of the Hessian of neural networks, for example, with a relatively small amount of work. We also apply CP to Score Matching, where a diagonal of a Hessian plays an integral role in the Score Matching objective, and where it is usually computed exactly using inefficient algorithms which do not scale to larger and more complex models. |
Year | Venue | Field |
|---|---|---|
2012 | ICML | Diagonal,Davidon–Fletcher–Powell formula,Applied mathematics,Quasi-Newton method,Hessian matrix,Artificial intelligence,Artificial neural network,Hessian equation,Mathematical optimization,Curvature,Hessian automatic differentiation,Pattern recognition,Mathematics |
DocType | Citations | PageRank |
Conference | 9 | 1.25 |
References | Authors | |
9 | 3 | |
Name | Order | Citations | PageRank |
|---|---|---|---|
| James Martens | 1 | 1239 | 142.60 |
| Ilya Sutskever | 2 | 25814 | 1120.24 |
| Kevin Swersky | 3 | 1118 | 52.13 |