Abstract
For two disjoint sets of variables, X and Y , and a class of functions C , we define DT(X,Y,C) to be the class of all decision trees over X whose leaves are functions from C over Y . We study the learnability of DT(X,Y,C) using membership and equivalence queries. Boolean decision trees, \(DT(X,\emptyset,\{0,1\})\) , were shown to be exactly learnable by Bshouty but does this imply the learnability of decision trees that have nonboolean leaves? A simple encoding of all possible leaf values will work provided that the size of C is reasonable. Our investigation involves several cases where simple encoding is not feasible, i.e., when |C| is large.
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