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Abstract
Let be a random polynomial where the coefficients A
0, A
1,… form a sequence of centered Gaussian random variables. Moreover, assume that the increments Δ
j
= A
j
− A
j−1, j = 0, 1, 2,… are independent, assuming A
−1 = 0. The coefficients can be considered as n consecutive observations of a Brownian motion. We study the number of times that such a random polynomial crosses a line which is not necessarily parallel to the x-axis. More precisely we obtain the asymptotic behavior of the expected number of real roots of the equation Q
n
(x) = Kx, for the cases that K is any non-zero real constant K = o(n
1/4), and K = o(n
1/2) separately.
Mathematics Subject Classification:
The authors would like to thank the referee for reading carefully the manuscript and providing valuable comments.
