Real zeros of algebraic polynomials with nonidentical dependent random coefficients
Abstract
The expected number of real zeros of an algebraic polynomial a0+a1x+a2x2+a3x3+....+an-1xn-1 depends on the types of random coefficients, with large n. In this article, we show that when the random coefficients \ai\i=1n-1 are assumed to be negatively dependent with var(ai)=σ2i and correlation between any two coefficients for i≠ j, assumed to be ij=-|i-j|, where 0<<13, then the expected number of real zeros is asymptotically equal to 2π σlogn.
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