Affiliation:
1. University of Sarajevo, Faculty of Sciences and Mathematics, Department of Mathematics, Sarajevo, BOSNIA AND HERZEGOVINA
Abstract
Our object of research are certain higher order counting functions of Chebyshev type, associated to the compact symmetric space SL4. In particular, we consider the functionψ1(x)resp.ψ3(x), of order1resp.3.As it is well known, any such function can be represented as a sum of some explicit part, and the corresponding error term. The explicit part is usually indexed over singularities of the attached Selberg zeta functions, while the error term depends on the dimension of the underlying symmetric space. Thus, these functions generalize the classical yes functionπ(x)counting prime geodesics of appropriate length. More precisely, the Chebyshev functions divided by adequate power of x, represent quite natural approximations for the functionπ(x). In this research, we are particularly interested in the error terms ofψ1(x)/xandψ3(x)/x3.
Publisher
World Scientific and Engineering Academy and Society (WSEAS)
Subject
Artificial Intelligence,General Mathematics,Control and Systems Engineering
Reference28 articles.
1. M. Avdispahic and Dz. Gusic, A weighted prime geodesic theorem, Math. Balk. 25, 2011,pp. 463–474.
2. M. Avdispahic and Dz. Gusic, On the error term in the prime geodesic theorem,Bull. Korean Math. Soc.49, 2012, pp. 367–372.
3. M. Avdispahic and Dz. Gusic, On the length spectrum for compact locally symmetric spaces of real rank one, WSEAS Trans. on Math.16, 2017, pp. 303–321.
4. M. Avdispahic and Dz. Gusic, Prime geodesic theorem for compact even- dimensional locally symmetric spaces of real rank one,Int. J. Pure Math.4, 2017, pp. 26–36.
5. P. Buser, Geometry and Spectra of Compact Riemann Surfaces, Birkhauser Boston Inc, Boston1992
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2 articles.
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