AbstractWe consider a simple problem in the optimal control of Brownian Motion. There are two modes of control available, each with its own drift and diffusion coefficients, and switching costs are incurred whenever the control mode is changed. Finally, holding costs are incurred according to a quadratic function of the state of the system, and all costs are continuously discounted. It is shown that there exists an optimal policy involving just two critical numbers, and formulas are given for computation of the critical numbers
this paper, the optimal pathwise average cost coincides with the optimal expected average cost. So w...
AbstractThis paper is concerned with the optimal stopping problem for discrete time two-parameter st...
The subject of this work has its roots in the so-called Schrödginer bridge problem (SBP) which asks ...
AbstractWe consider a simple problem in the optimal control of Brownian Motion. There are two modes ...
Consider two Brownian motions B1s1 and B2s2, each taking values on an interval [0,ai], i = 1,2, with...
AbstractConsider a storage system (such as an inventory or bank account) whose content fluctuates as...
The problem of optimally controlling a standard Brownian motion until a fixed final time is consider...
: We develop a method for computing the optimal double band [b; B] policy for switching between two...
AbstractThis paper deals with a one-dimensional controlled diffusion process on a compact interval w...
tAract Consider a storage system, such as an inventory or cash fund, whose content fluctuates as a (...
Let Xi(ti), i = 1, 2, denote two Brownian motions on [0, 1] with absorbing end points. At any given ...
We present closed-form solutions to some discounted optimal stopping problems for the running maximu...
AbstractThis paper treats two-parameter optimal stopping and switching problems for continuous time ...
We present closed-form solutions to some discounted optimal stopping problems for the running maximu...
This paper is concerned with the optimal stopping problem for discrete time two-parameter stochastic...
this paper, the optimal pathwise average cost coincides with the optimal expected average cost. So w...
AbstractThis paper is concerned with the optimal stopping problem for discrete time two-parameter st...
The subject of this work has its roots in the so-called Schrödginer bridge problem (SBP) which asks ...
AbstractWe consider a simple problem in the optimal control of Brownian Motion. There are two modes ...
Consider two Brownian motions B1s1 and B2s2, each taking values on an interval [0,ai], i = 1,2, with...
AbstractConsider a storage system (such as an inventory or bank account) whose content fluctuates as...
The problem of optimally controlling a standard Brownian motion until a fixed final time is consider...
: We develop a method for computing the optimal double band [b; B] policy for switching between two...
AbstractThis paper deals with a one-dimensional controlled diffusion process on a compact interval w...
tAract Consider a storage system, such as an inventory or cash fund, whose content fluctuates as a (...
Let Xi(ti), i = 1, 2, denote two Brownian motions on [0, 1] with absorbing end points. At any given ...
We present closed-form solutions to some discounted optimal stopping problems for the running maximu...
AbstractThis paper treats two-parameter optimal stopping and switching problems for continuous time ...
We present closed-form solutions to some discounted optimal stopping problems for the running maximu...
This paper is concerned with the optimal stopping problem for discrete time two-parameter stochastic...
this paper, the optimal pathwise average cost coincides with the optimal expected average cost. So w...
AbstractThis paper is concerned with the optimal stopping problem for discrete time two-parameter st...
The subject of this work has its roots in the so-called Schrödginer bridge problem (SBP) which asks ...