New bounds for the number of connected components of fewnomial hypersurfaces

Abstract

We prove that the number of connected components of a smooth hypersurface in the positive orthant of Rn defined by a real polynomial with d + k + 1 monomials, where d is the dimension of the affine span of the exponent vectors, is smaller than or equal to 8(d+1)k-1 2k-1 2, improving the previously known bounds. We refine this bound for k = 2 by showing that a smooth hypersurface defined by a real polynomial with d+3 monomials in n variables has at most (d-1)/2 + 3 connected components in the positive orthant of Rn. We present an explicit polynomial in 2 variables with 5 monomials which defines a curve with three connected components in the positive orthant, showing that our bound is sharp for d = 2 (and any n). Our results hold for polynomials with real exponent vectors.