Sample exclusion dimension
In computational learning theory, sample exclusion dimensions arise in the study of exact concept learning with queries.[1] In algorithmic learning theory, a concept over a domain X is a Boolean function over X. Here we only consider finite domains. A partial approximation S of a concept c is a Boolean function over [math]\displaystyle{ Y\subseteq X }[/math] such that c is an extension to S.
Let C be a class of concepts and c be a concept (not necessarily in C). Then a specifying set for c w.r.t. C, denoted by S is a partial approximation S of c such that C contains at most one extension to S. If we have observed a specifying set for some concept w.r.t. C, then we have enough information to verify a concept in C with at most one more mind change.
The exclusion dimension, denoted by XD(C), of a concept class is the maximum of the size of the minimum specifying set of c' with respect to C, where c' is a concept not in C.
References
- ↑ D. Angluin (2001). "Queries Revisited". in N. Abe. Algorithmic Learning Theory: 12th International Conference, ALT 2001, Washington, DC, USA, November 2001, Proceedings. Springer. pp. 26–28. ISBN 3-540-42875-5. https://archive.org/details/algorithmiclearn2001aben.
Original source: https://en.wikipedia.org/wiki/Sample exclusion dimension.
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