On Certain Class of Weighted Hyperbolic Polynomials

AbstractA homogeneous real polynomial p is hyperbolic with respect to a given vector d if the univariate polynomial t ⟼ p(x − td) has all real roots for all vectors x. Motivated by partial differential equations, Gårding proved in 1951 that the largest such root is a convex function of x, and showed various ways of constructing new hyperbolic polynomials. We present a powerful new such construction, and use it to generalize Gårding’s result to arbitrary symmetric functions of the roots. Many classical and recent inequalities follow easily. We develop various convex-analytic tools for such symmetric functions, of interest in interior-point methods for optimization problems over related cones.

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Real Zeros of a Class of Hyperbolic Polynomials with Random Coefficients

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/2015/261370 ◽

2015 ◽

Vol 2015 ◽

pp. 1-7

Author(s):

Mina Ketan Mahanti ◽

Amandeep Singh ◽

Lokanath Sahoo

Keyword(s):

Random Variables ◽

Random Coefficients ◽

Expected Number ◽

Hyperbolic Polynomial ◽

Gaussian Random Variables ◽

Hyperbolic Polynomials ◽

Asymptotic Value ◽

Real Zeros ◽

Number Of Real Zeros

We have proved here that the expected number of real zeros of a random hyperbolic polynomial of the formy=Pnt=n1a1cosh⁡t+n2a2cosh⁡2t+⋯+nnancosh⁡nt, wherea1,…,anis a sequence of standard Gaussian random variables, isn/2+op(1). It is shown that the asymptotic value of expected number of times the polynomial crosses the levely=Kis alson/2as long asKdoes not exceed2neμ(n), whereμ(n)=o(n). The number of oscillations ofPn(t)abouty=Kwill be less thann/2asymptotically only ifK=2neμ(n), whereμ(n)=O(n)orn-1μ(n)→∞. In the former case the number of oscillations continues to be a fraction ofnand decreases with the increase in value ofμ(n). In the latter case, the number of oscillations reduces toop(n)and almost no trace of the curve is expected to be present above the levely=Kifμ(n)/(nlogn)→∞.

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Wandering Gaps for Weakly Hyperbolic Polynomials

Complex Dynamics ◽

10.1201/b10617-4 ◽

2009 ◽

pp. 139-168 ◽

Cited By ~ 1

Author(s):

Alexander Blokh ◽

Lex Oversteegen

Keyword(s):

Hyperbolic Polynomials

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Hyperbolic polynomials and linear-type generating functions

Journal of Mathematical Analysis and Applications ◽

10.1016/j.jmaa.2020.124085 ◽

2020 ◽

Vol 488 (2) ◽

pp. 124085

Author(s):

Tamás Forgács ◽

Khang Tran

Keyword(s):

Generating Functions ◽

Linear Type ◽

Hyperbolic Polynomials

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An Inequality for Hyperbolic Polynomials

Indiana University Mathematics Journal ◽

10.1512/iumj.1959.8.58061 ◽

1959 ◽

Vol 8 (6) ◽

pp. 957-965 ◽

Cited By ~ 4

Author(s):

Lars Gårding

Keyword(s):

Hyperbolic Polynomials

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Level crossings and turning points of random hyperbolic polynomials

International Journal of Mathematics and Mathematical Sciences ◽

10.1155/s0161171299225793 ◽

1999 ◽

Vol 22 (3) ◽

pp. 579-586

Author(s):

K. Farahmand ◽

P. Hannigan

Keyword(s):

Asymptotic Estimate ◽

Turning Points ◽

Random Variables ◽

Random Polynomial ◽

Expected Number ◽

Hyperbolic Polynomial ◽

Level Crossings ◽

Hyperbolic Polynomials ◽

Normally Distributed

In this paper, we show that the asymptotic estimate for the expected number ofK-level crossings of a random hyperbolic polynomiala1sinhx+a2sinh2x+⋯+ansinhnx, whereaj(j=1,2,…,n)are independent normally distributed random variables with mean zero and variance one, is(1/π)logn. This result is true for allKindependent ofx, providedK≡Kn=O(n). It is also shown that the asymptotic estimate of the expected number of turning points for the random polynomiala1coshx+a2cosh2x+⋯+ancoshnx, withaj(j=1,2,…,n)as before, is also(1/π)logn.

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