Abstract
We show that, under certain conditions, restricted and biased exponential sums and Walsh transforms of symmetric and rotation symmetric Boolean functions are, as in the case of nonbiased domain, C-finite sequences. We also prove that under other conditions, these sequences are P-finite, which is a somewhat different behavior than their nonbiased counterparts. We further show that exponential sums and Walsh transforms of a family of rotation symmetric monomials over the restricted domain En,j={x∈𝔽2n:wt (x)=j} (wt (x) is the weight of the vector x) are given by polynomials of degree at most j, and so, they are also C-finite sequences. Finally, we also present a study of the behavior of symmetric Boolean functions under these biased transforms.
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