The expected number of real zeros of a random polynomial
of degree
if the coefficients are independent and distributed normally is given by
(1)
(2)
(Kac 1943, Edelman and Kostlan 1995). Another form of the equation is given by
(3)
(Kostlan 1993, Edelman and Kostlan 1995). The plots above show the integrand (left) and numerical values of
(red curve in right plot) for small
. The first few values are 1, 1.29702,
1.49276, 1.64049, 1.7596, 1.85955, ....
As ,
(4)
where
(5)
(6)
(OEIS A093601; top curve in right plot above).
The initial term was derived by Kac (1943).
Edelman, A. and Kostlan, E. "How Many Zeros of a Random Polynomial are Real?" Bull. Amer. Math. Soc.32, 1-37, 1995.Kac,
M. "On the Average Number of Real Roots of a Random Algebraic Equation."
Bull. Amer. Math. Soc.49, 314-320, 1943.Kac, M. "A
Correction to 'On the Average Number of Real Roots of a Random Algebraic Equation.'
" Bull. Amer. Math. Soc.49, 938, 1943.Kostan, E.
"On the Distribution of Roots in a Random Polynomial." Ch. 38 in From
Topology to Computation: Proceedings of the Smalefest (Ed. M. W. Hirsch,
J. E. Marsden, and M. Shub). New York: Springer-Verlag, pp. 419-431,
1993.Sloane, N. J. A. Sequence A093601
in "The On-Line Encyclopedia of Integer Sequences."
of a random polynomial
of degree 
if the coefficients are independent and distributed normally is given by
![E_n=1/piint_(-infty)^inftysqrt([(partial^2)/(partialxpartialy)ln(1-(xy)^(n+1))/(1-xy)]_(x=y=t))dt](/images/equations/KacFormula/NumberedEquation1.svg)
(left) and numerical values of
(red curve in right plot) for small
. The first few values are 1, 1.29702,
1.49276, 1.64049, 1.7596, 1.85955, ....
,
![2/pi{ln2+int_0^infty[sqrt(1/(x^2)-(4e^(-2x))/((1-e^(-2x))^2))-1/(x+1)]dx}](/images/equations/KacFormula/Inline15.svg)
