Optimal control of a large dam with compound Poisson input and costs depending on water levels

Abstract: This paper studies a discrete model of a large dam where the difference between lower and upper levels, L, is assumed to be large. Passage across the levels leads to damage, and the damage costs of crossing the lower or upper level are proportional to the large parameter L. Input stream of water is described by compound Poisson process, and the water cost depends upon current level of water in the dam. The aim of the paper is to choose the parameters of output stream (specifically defined in the paper) minimiz… Show more

“…Taking into account that t −n > 0, in cases (a 1 ) and (a 2 ) we easily arrive at the required statements, since the difference z − n τ −n (z) in point z = 0 is negative and in point z = 1 is zero. The derivative of this difference in point z = 1 is equal to 1 − (1/n)τ ′ −n (1). It is nonnegative in case (a 1 ) and strictly negative in case (a 2 ).…”

Fixed point theorem for an infinite Toeplitz matrix

“…Taking into account that t −n > 0, in cases (a 1 ) and (a 2 ) we easily arrive at the required statements, since the difference z − n τ −n (z) in point z = 0 is negative and in point z = 1 is zero. The derivative of this difference in point z = 1 is equal to 1 − (1/n)τ ′ −n (1). It is nonnegative in case (a 1 ) and strictly negative in case (a 2 ).…”

Fixed point theorem for an infinite Toeplitz matrix

“…The range t  can be determined by the operation purpose of the system. In addition, too large water volume may physically damage the dam (Abramov, 2019) and too small water volume may threaten aquatic species in the reservoir (Kawakami and Tachihara, 2006). In addition, ecologically friendly reservoir operations are preferred if keystone aquatic species are spawning in the reservoir (Li et al, 2020).…”

Regime-switching constrained viscosity solutions approach for controlling dam–reservoir systems

“…In particular, they describe the probability problems that appear as an extension of the classic ruin and ballot problems and problems on fluctuations of sums of random variables. Further applications of convolution-type recurrence relations are known in queueing theory [8], theory of dams [1] and other areas also considered in [7]. The techniques for the study of (1.2) come from the theory of convolution-type recurrence relations.…”

Fixed Point Theorem for an Infinite Toeplitz Matrix