On the Learnability of Recursive Data
Hammer B (1999)
Mathematics of Control, Signals, and Systems 12(1): 62-79.
Zeitschriftenaufsatz
| Veröffentlicht | Englisch
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Einrichtung
Abstract / Bemerkung
We establish some general results concerning PAC learning: We find a characterization of the property that any consistent algorithm is PAC. It is shown that the shrinking width property is equivalent to PUAC learnability. By counterexample, PAC and PUAC learning are shown to be different concepts. We find conditions ensuring that any nearly consistent algorithm is PAC or PUAC, respectively.¶The VC dimension of recurrent neural networks and folding networks is infinite. For restricted inputs, however, bounds exist. The bounds for restricted inputs are transferred to folding networks.¶We find conditions on the probability of the input space ensuring polynomial learnability: the probability of sequences or trees has to converge to zero sufficiently fast with increasing length or height.¶Finally, we find an example for a concept class that requires exponentially growing sample sizes for accurate generalization.
Erscheinungsjahr
1999
Zeitschriftentitel
Mathematics of Control, Signals, and Systems
Band
12
Ausgabe
1
Seite(n)
62-79
ISSN
0932-4194
Page URI
https://pub.uni-bielefeld.de/record/2982132
Zitieren
Hammer B. On the Learnability of Recursive Data. Mathematics of Control, Signals, and Systems. 1999;12(1):62-79.
Hammer, B. (1999). On the Learnability of Recursive Data. Mathematics of Control, Signals, and Systems, 12(1), 62-79. https://doi.org/10.1007/PL00009845
Hammer, Barbara. 1999. “On the Learnability of Recursive Data”. Mathematics of Control, Signals, and Systems 12 (1): 62-79.
Hammer, B. (1999). On the Learnability of Recursive Data. Mathematics of Control, Signals, and Systems 12, 62-79.
Hammer, B., 1999. On the Learnability of Recursive Data. Mathematics of Control, Signals, and Systems, 12(1), p 62-79.
B. Hammer, “On the Learnability of Recursive Data”, Mathematics of Control, Signals, and Systems, vol. 12, 1999, pp. 62-79.
Hammer, B.: On the Learnability of Recursive Data. Mathematics of Control, Signals, and Systems. 12, 62-79 (1999).
Hammer, Barbara. “On the Learnability of Recursive Data”. Mathematics of Control, Signals, and Systems 12.1 (1999): 62-79.