Coset decision trees and the Fourier algebra
Abstract
We show that if G is a finite group and f is a 0,1-valued function on G with Fourier algebra norm at most M then f may be computed by a coset decision tree (that is a decision tree in which at each vertex we query membership of a given coset) having at most (((O(M2)))) leaves. A short calculation shows that any 0,1-valued function which may be computed by a coset decision tree with m leaves has Fourier algebra norm at most (O(m)).
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