Abstract
In the theory of belief functions, the approximation of a basic belief assignment (BBA) is for reducing the high computational cost especially when large number of focal elements are available. In traditional BBA approximation approaches, a focal element’s own characteristics such as the mass assignment and the cardinality, are usually used separately or jointly as criteria for the removal of focal elements. Besides the computational cost, the distance between the original BBA and the approximated one is also concerned, which represents the loss of information in BBA approximation. In this paper, an iterative approximation approach is proposed based on maximizing the closeness, i.e., minimizing the distance between the approximated BBA in current iteration and the BBA obtained in the previous iteration, where one focal element is removed in each iteration. The iteration stops when the desired number of focal elements is reached. The performance evaluation approaches for BBA approximations are also discussed and used to compare and evaluate traditional BBA approximations and the newly proposed one in this paper, which include traditional time-based way, closeness-based way and new proposed ones. Experimental results and related analyses are provided to show the rationality and efficiency of our proposed new BBA approximation.
Highlights
The theory of belief functions [1], called Dempster-Shafer theory (DST), has many advantages in uncertainty modeling and reasoning [2, 3]; it has been argued due to its limitations [4, 5]
The evaluation criteria are very crucial for evaluate different basic belief assignment (BBA) approximations, and for design new BBA approximations
3) Degree of ordering preservation between plausibilities of events In a BBA, each focal element corresponds to an event
Summary
The theory of belief functions [1], called Dempster-Shafer theory (DST), has many advantages in uncertainty modeling and reasoning [2, 3]; it has been argued due to its limitations [4, 5]. One of the limitation is the high computational cost encountered in the procedure such as the evidence combination, conditioning, marginalization, and belief and plausibility degrees evaluation [1, 6], especially when large amount of focal elements are available. This will confine the use of DST in practical applications. The BBA approximation aims to obtain a simpler BBA by removing some focal elements In existing works, such a removal of focal elements was implemented according to three different criteria related to the focal element’s own characteristics. The first criterion is the mass assignment of a focal element, where the focal elements with smaller mass
Sign-in/Register to view highlights & summary Sign-in/Register to access full text options 
Free) 
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call
