Khaniyev, TahirGever, BasakHanalioglu, Zulfiye2024-09-292024-09-292016978-3-319-30322-2978-3-319-30320-82194-5357https://doi.org/10.1007/978-3-319-30322-2_22https://hdl.handle.net/20.500.14619/37823rd International Conference on Applied Mathematics and Approximation Theory (AMAT) -- MAY 18-21, 2015 -- TOBB Econ & Technol Univ, Ankara, TURKEYIn this study, a renewal-reward process (X(t)) with a generalized reflecting barrier is constructed mathematically and under some weak conditions, the ergodicity of the process is proved. The explicit form of the ergodic distribution is found and after standardization, it is shown that the ergodic distribution converges to the limit distribution R(x), when lambda -> infinity, i. e., QX (lambda x) [GRAPHICS] P{X(t) <= lambda x} -> R(x) 2/m(2) [GRAPHICS] [1 - F(u)]dudv. Here, F(x) is the distribution function of the initial random variables {eta(n)}, n = 1, 2,..., which express the amount of rewards and m(2) = E(eta(2)(1)). Finally, to evaluate asymptotic rate of the weak convergence, the following inequality is obtained: vertical bar QX (lambda x) - R(x)vertical bar <= 2/lambda vertical bar pi(0)(x) - R(x)vertical bar. Here, pi(0)(x) = (1/m(1)) [GRAPHICS] (1 - F(u))du is the limit distribution of residual waiting time generated by {eta(n)}, n = 1, 2,..., and m(1) = E(eta(1)).eninfo:eu-repo/semantics/closedAccessMarkovian Random-WalkModelS,SConference Object10.1007/978-3-319-30322-2_222-s2.0-84961711933331N/A313441WOS:000377864300022N/A