Browsing by Author "Tamon, Christino"
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- ItemOpen AccessORACLES AND QUERIES THAT ARE SUFFICIENT FOR EXACT LEARNING(1994-04-01) Bshouty, Nader H.; Cleve, Richard; Tamon, Christino; Kannan, SampathWe show that the class of all circuits is exactly learnable in (randomized) expected polynomial-time using subset and superset queries. Subset and superset queries are a generalization of equivalence queries, where an instance of a negative counterexample is requested (for subset queries) or a positive counterexample is requested (for superset queries). Our result is a consequence of the following result which we consider to be of independent interest: the class of all circuits is exactly learnable in (randomized) expected polynomial-time with equivalence queries and the aid of an NP-oracle. This improves the previous result of Gavald\o'a\(ga' [G93] where a $SIGMA~pile {p above 3 }$-oracle and equivalence queries are required in place of the NP-oracle and equvalence queries, and the learning algorithm is deterministic. The hypothesis class for both of the above learning algorithms is the class of circuits of slightly larger (polynomially related) size. Also, the algorithms can be adapted to learn the class of DNF formulas with hypothesis class consisting of depth-3 $andsign - orsign - andsign$ formulas (by the work of Angluin [A90], this is optimal in the sense that the hypothesis class cannot be reduced to depth-2 DNF formulas). We also found deterministic learning algorithms that use \fImembership\fR queries and the NP-oracle for learning monotone boolean functions and the class 0(log $n$)-DNF $cap$ 0(log $n$)-CNF. The running time of these algorithms are polynomial in $n$, DNF size and CNF size of the target formula. Finally with an NP-oracle and membership queries, there is a randomized polynomial-time algorithm that learns any class that is learnable from membership queries with unlimited computational power.
- ItemOpen AccessA SHORT PROOF OF A FOURIER THEOREM(1995-10-01) Tamon, ChristinoA theorem of Kahn, Kalai, and Linial [2] stated that the average sensitivity of a Boolean function is equal to the weighted sum of its Fourier power spectrum. The purpose of this note is to provide a short proof of this result that is based on a cross correlation Fourier identity. Furthermore we generalize this to product distributions and derive an alternative proof of a theorem in [1].