Title :
Using Choquet integrals for kNN approximation and classification
Author :
Beliakov, Gleb ; James, Simon
Author_Institution :
Sch. of Eng. & Inf. Technol., Deakin Univ., Burwood, VIC
Abstract :
k-nearest neighbors (kNN) is a popular method for function approximation and classification. One drawback of this method is that the nearest neighbors can be all located on one side of the point in question x. An alternative natural neighbors method is expensive for more than three variables. In this paper we propose the use of the discrete Choquet integral for combining the values of the nearest neighbors so that redundant information is canceled out. We design a fuzzy measure based on location of the nearest neighbors, which favors neighbors located all around x.
Keywords :
function approximation; fuzzy set theory; integral equations; learning (artificial intelligence); pattern classification; discrete Choquet integral; function approximation; fuzzy measure; k-nearest neighbor method; kNN; supervised classification; Arithmetic; Australia; Computational complexity; Data analysis; Function approximation; Information technology; Nearest neighbor searches; Power engineering and energy; Training data; Voting;
Conference_Titel :
Fuzzy Systems, 2008. FUZZ-IEEE 2008. (IEEE World Congress on Computational Intelligence). IEEE International Conference on
Conference_Location :
Hong Kong
Print_ISBN :
978-1-4244-1818-3
Electronic_ISBN :
1098-7584
DOI :
10.1109/FUZZY.2008.4630542
