Classifying real polynomial pencils
Abstract
Let n be the space of all homogeneous polynomials of degree n in two variables with real coefficients. The standard discriminant n+1⊂ n is Whitney stratified according to the number and the multiplicities of multiple real zeros. A real polynomial pencil, that is, a line L⊂ n is called generic if it intersects n+1 transversally. Nongeneric pencils form the Grassmann discriminant 2,n+1⊂ , where is the Grassmannian of lines in n. We enumerate the connected components of the set = 2,n+1 of all generic lines in n and relate this topic to the Hawaii conjecture and the classical theorems of Obreschkoff and Hermite-Biehler.
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