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Please use this identifier to cite or link to this item:
http://hdl.handle.net/2451/14329
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| Title: | MULTILAYER FEEDFORWARD NETWORKS WITH A NON-POLYNOMIAL ACTIVATION FUNCTION CAN APPROXIMATE ANY FUNCTION |
| Authors: | Leshno, Moshe
Lin, Valdimir Ya.
Pinkus, Allan
Schocken, Shimon |
| Keywords: | Multilayer feedforward networks
Activation functions
role of threshold
Universal approximation capabilities
LP(μ) approximation |
| Issue Date: | Mar-1992 |
| Publisher: | Stern School of Business, New York University |
| Series/Report no.: | IS-92-13 |
| Abstract: | Several researchers characterized the activation function under which multilayer feedforward
networks can act as universal approximators. We show that most of all the characterizations
that were reported thus far in the literature are special cases of the following
general result: a standard multilayer feedforward network with a locally bounded piecewise
continuous activation function can approximate any continuous function to any degree of
accuracy if and only if the network's activation function is not a polynomial. We also
emphasize the important role of the threshold, asserting that without it the last theorem
does not hold. |
| URI: | http://hdl.handle.net/2451/14329 |
| Appears in Collections: | IOMS: Information Systems Working Papers
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