Title :
Value of information and solution under VaR criterion for fuzzy random optimization problems
Author :
Wang, Shuming ; Watada, Junzo
Author_Institution :
Grad. Sch. of Inf., Production & Syst., Waseda Univ., Kitakyushu, Japan
Abstract :
Under the Value-at-Risk (VaR) criterion, this paper studies on the value of information and solution for two-stage fuzzy random optimization problems. First, the value of perfect information (VPI) in VaR criterion is discussed by studying the difference of the wait-and-see (WS) solution and the here-and-now (HN) solution to the two-stage fuzzy random programming with VaR criterion. Then, the value of fuzzy random solution (VFRS) in VaR is examined by investigating the difference of the HN solution and the random solution (RS), as well as the difference of HN solution and the expected value (EV) solution. Finally, a lower bound and an upper bound for the HN solution are derived.
Keywords :
decision theory; fuzzy set theory; investment; random processes; stochastic programming; VaR criterion; fuzzy random solution; here-and-now solution; two stage fuzzy random optimization problem; two-stage fuzzy random programming; value at risk criterion; value of perfect information; wait-and-see solution; Chromium; Decision making; Investments; Optimization; Programming; Random variables; Uncertainty;
Conference_Titel :
Fuzzy Systems (FUZZ), 2010 IEEE International Conference on
Conference_Location :
Barcelona
Print_ISBN :
978-1-4244-6919-2
DOI :
10.1109/FUZZY.2010.5584608
