Optimal Bounds for the Number of Pieces of Near-Circuit Hypersurfaces
Abstract
Suppose f is a polynomial in n variables with real coefficients, exactly n+k monomial terms, and Newton polytope of positive volume. Estimating the number of connected components of the positive zero set of f is a fundamental problem in real algebraic geometry, with applications in computational complexity and topology. We prove that the number of connected components is at most 3 when k\!=\!3, settling an open question from Fewnomial Theory. Our results also extend to exponential sums with real exponents. A key contribution here is a deeper analysis of the underlying A-discriminant curves, which should be of use for other quantitative geometric problems.
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