Coles

Loading Inventory...
Limit Theorems and Applications of Set-Valued Fuzzy Random VariablesLimit Theorems and Applications of Set-Valued Fuzzy Random Variables

Limit Theorems and Applications of Set-Valued Fuzzy Random Variables in Grande Prairie, AB

Current price: $160.95
Get it at ColesVisit retailer's website
Limit Theorems and Applications of Set-Valued Fuzzy Random Variables

Coles

Limit Theorems and Applications of Set-Valued Fuzzy Random Variables in Grande Prairie, AB

Current price: $160.95
Loading Inventory...

Size: Hardcover

*Product information and pricing may vary - to confirm current pricing, availability, shipping, and return information please contact Coles. In the event of a pricing discrepancy, the retailer's price will apply.
After the pioneering works by Robbins {1944, 1945) and Choquet (1955), the notation of a set-valued random variable (called a random closed set in literatures) was systematically introduced by Kendall {1974) and Matheron {1975). It is well known that the theory of set-valued random variables is a natural extension of that of general real-valued random variables or random vectors. However, owing to the topological structure of the space of closed sets and special features of set-theoretic operations ( cf. Beer [27]), set-valued random variables have many special properties. This gives new meanings for the classical probability theory. As a result of the development in this area in the past more than 30 years, the theory of set-valued random variables with many applications has become one of new and active branches in probability theory. In practice also, we are often faced with random experiments whose outcomes are not numbers but are expressed in inexact linguistic terms.
After the pioneering works by Robbins {1944, 1945) and Choquet (1955), the notation of a set-valued random variable (called a random closed set in literatures) was systematically introduced by Kendall {1974) and Matheron {1975). It is well known that the theory of set-valued random variables is a natural extension of that of general real-valued random variables or random vectors. However, owing to the topological structure of the space of closed sets and special features of set-theoretic operations ( cf. Beer [27]), set-valued random variables have many special properties. This gives new meanings for the classical probability theory. As a result of the development in this area in the past more than 30 years, the theory of set-valued random variables with many applications has become one of new and active branches in probability theory. In practice also, we are often faced with random experiments whose outcomes are not numbers but are expressed in inexact linguistic terms.

Find at Prairie Mall in Grande Prairie, AB

Visit at Prairie Mall in Grande Prairie, AB
Powered by Adeptmind