Real zeros of mixed random fewnomial systems

Abstract

Consider a system f1(x)=0,…,fn(x)=0 of n random real polynomials in n variables, where each fi has a prescribed set of exponent vectors described by a set Ai ⊂eq Zn of cardinality ti, whose convex hull is denoted Pi. Assuming that the coefficients of the fi are independent standard Gaussian, we prove that the expected number of zeros of the random system in the positive orthant is at most (2π)-n2 V0 (t1-1)… (tn-1). Here V0 denotes the number of vertices of the Minkowski sum P1+… + Pn. However, this bound does not improve over the bound in B\"urgisser et al. (SIAM J. Appl. Algebra Geom. 3(4), 2019) for the unmixed case, where all supports Ai are equal. All arguments equally work for real exponent vectors.

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