论文信息 - A Spectral Lower Bound Techniqye for the Size of Decision Trees and Two Level AND/OR Circuits

A Spectral Lower Bound Techniqye for the Size of Decision Trees and Two Level AND/OR Circuits

A universal lower-bound technique for the size and other implementation characteristics of an arbitrary Boolean function as a decision tree and as a two-level AND/OR circuit is derived. The technique is based on the power spectrum coefficients of the n dimensional Fourier transform of the function. The bounds vary from constant to exponential and are tight in many cases. Several examples are presented. >

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