Balanced Symmetric Functions over GF(p)

Abstract

Under mild conditions on n,p, we give a lower bound on the number of n-variable balanced symmetric polynomials over finite fields GF(p), where p is a prime number. The existence of nonlinear balanced symmetric polynomials is an immediate corollary of this bound. Furthermore, we conjecture that X(2t,2t+1l-1) are the only nonlinear balanced elementary symmetric polynomials over GF(2), where X(d,n)=Σi1<i2<...<idxi1 xi2... xid, and we prove various results in support of this conjecture.

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