Mercurial > hg > camir-aes2014
comparison toolboxes/FullBNT-1.0.7/netlab3.3/mlpbkp.m @ 0:e9a9cd732c1e tip
first hg version after svn
| author | wolffd |
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| date | Tue, 10 Feb 2015 15:05:51 +0000 |
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| -1:000000000000 | 0:e9a9cd732c1e |
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| 1 function g = mlpbkp(net, x, z, deltas) | |
| 2 %MLPBKP Backpropagate gradient of error function for 2-layer network. | |
| 3 % | |
| 4 % Description | |
| 5 % G = MLPBKP(NET, X, Z, DELTAS) takes a network data structure NET | |
| 6 % together with a matrix X of input vectors, a matrix Z of hidden unit | |
| 7 % activations, and a matrix DELTAS of the gradient of the error | |
| 8 % function with respect to the values of the output units (i.e. the | |
| 9 % summed inputs to the output units, before the activation function is | |
| 10 % applied). The return value is the gradient G of the error function | |
| 11 % with respect to the network weights. Each row of X corresponds to one | |
| 12 % input vector. | |
| 13 % | |
| 14 % This function is provided so that the common backpropagation | |
| 15 % algorithm can be used by multi-layer perceptron network models to | |
| 16 % compute gradients for mixture density networks as well as standard | |
| 17 % error functions. | |
| 18 % | |
| 19 % See also | |
| 20 % MLP, MLPGRAD, MLPDERIV, MDNGRAD | |
| 21 % | |
| 22 | |
| 23 % Copyright (c) Ian T Nabney (1996-2001) | |
| 24 | |
| 25 % Evaluate second-layer gradients. | |
| 26 gw2 = z'*deltas; | |
| 27 gb2 = sum(deltas, 1); | |
| 28 | |
| 29 % Now do the backpropagation. | |
| 30 delhid = deltas*net.w2'; | |
| 31 delhid = delhid.*(1.0 - z.*z); | |
| 32 | |
| 33 % Finally, evaluate the first-layer gradients. | |
| 34 gw1 = x'*delhid; | |
| 35 gb1 = sum(delhid, 1); | |
| 36 | |
| 37 g = [gw1(:)', gb1, gw2(:)', gb2]; |