Stankov Dragan. "On Linear Combinations of the Chebyshev Polynomials" in Publications de lInstitut Mathématique 111 no. 97, Beograd:Matematički institut SANU (2015): 57-67. https://doi.org/DOI: 10.2298/PIM150220001S
Dragan Dolić. Aranđelovački i Kosmajsko-Mladenovački produktivni miocenski basen : Stratigrafsko-tektonske osobine i pojave mineralnih sirovina na osnovu površinskog promatranja i bušenja. I, II, Beograd:Rudarsko Geološki Fakultet, 1965
Dragan Đorđević. Određivanje parametara pomeranja potkopanog terena u rudnicima uglja sa podzemnom eksploatacijom , sa posebnim osvrtom na rudarske zakone i tehničke normative u Jugoslaviji, Beograd:Rudarsko Geološki Fakultet, 1989
Dragan Stankov. "The Reciprocal Algebraic Integers Having Small House" in Experimental Mathematics (2021). https://doi.org/ 10.1080/10586458.2021.1982425
We introduce a sequence P2n of monic reciprocal polynomials with integer coefficients having the central coefficients fixed. We prove that the ratio between number of nonunimodular roots of P2n and its degree d has a limit when d tends to infinity. We present an algorithm for calculation the limit and a numerical
method for its approximation. If P2n is the sum of a fixed number of monomials we determine the central coefficients such that the ratio has the minimal limit. ...
Dragan Stankov. "The number of unimodular roots of some reciprocal polynomials" in Cmptes rendus mathematique (2020). https://doi.org/10.5802/crmath.28
We present a necessary and sufficient condition for a root greater
than unity of a monic reciprocal polynomial of an even degree at least four,
with integer coefficients, to be a Salem number. This condition requires that
the minimal polynomial of some power of the algebraic integer has a linear
coefficient that is relatively large. We also determine the probability that an
arbitrary power of a Salem number, of certain small degrees, satisfies this
condition.
Dragan Stankov. "A necessary and sufficient condition for an algebraic integer to be a Salem number" in Journal de theorie des nombres de Bordeaux (2019). https://doi.org/10.5802/jtnb.1076