New Subexponential Fewnomial Hypersurface Bounds
Abstract
Suppose c1,…,cn+k are real numbers, \a1,…,an+k\\!⊂\!Rn is a set of points not all lying in the same affine hyperplane, y\!∈\!Rn, aj· y denotes the standard real inner product of aj and y, and we set g(y)\!:=\!Σn+kj=1 cj eaj· y. We prove that, for generic cj, the number of connected components of the real zero set of g is O\!(n2+2k2(n+2)k-2). The best previous upper bounds, when restricted to the special case k\!=\!3 and counting just the non-compact components, were already exponential in n.
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