Prof. Isaac Sonin
Optimal Stopping of Markov Chains, Gittins Index and Related Optimization Problems
Was 


Wann 
17.02.2012 von 11:15 bis 13:00 
Wo  Eckerstr. 1, Raum 404 
Name  Kristin Ohneberg 
Kontakttelefon  07612037701 
Termin übernehmen 
vCal iCal 
Isaac M. Sonin, Dept. of Mathematics,
UNC at Charlotte, USA
In this talk I will discuss the problem of Optimal Stopping (OS) of Markov Chains (MCs), the methods for its solution, the classical and the generalized Gittins indices and related problems: the KatehakisVeinott Restart Problem and the Whittle family of Retirement Problems. The celebrated Gittins index, its generalizations and related techniques play an important role in applied probability models, resource allocation problems, optimal portfolio management problems as well as other problems of financial mathematics. It is well known that a connection exists between the Ratio (cycle) maximization problem, the KatehakisVeinott (KV) Restart Problem and the Whittle family of Retirement Problems, and that their key characteristics, the classical Gittins index, the KV index, and the Whittle index are equal in a classical setting. These indices were generalized by the author (Statistics and Probability Letters, 2008) in such a way that it is possible to use the so called State Elimination algorithm, developed earlier to solve the OS of MCs problem to calculate this common index. One of the goals of this talk is to demonstrate also that the equality of these indices is a special case of a similar equality for three simple abstract optimization problems. A more general  continue, quit, restart problem will be also discussed.