Density of Complex Zeros of a System of Real Random Polynomials

There are many known asymptotic estimates for the expected number of real zeroe of polynomial &(z) = rn coeh CL + ~2 coeh 2(z + . . . +q,,ccehn<z, where qj, j = 1,2,3 ,..., n ie a sequence of independent random variables. This paper provides the asymptotic formula for the expected density of complex

In this paper, we obtain an exact formula for the average density of the distribution of complex zeros of a random trigonometric polynomial , where the coefficients η j = a j + ιb j , and a j n j=1 and b j n j=1 are sequences of independent normally distributed random variables with mean 0 and vari

In this paper we find the expected number of zero crossings for a general algebraic polynomial, \(\sum_{j=1}^{n} a_{j}\left(\alpha x^{j}+\beta x^{-j}\right)\), and a general hyperbolic polynomial, \(\sum_{j=1}^{n} a_{j}(\alpha \cosh j x+\beta \sinh j x)\), where \(\alpha\) and \(\beta\) are constant