posted on 2019-09-30, 11:44authored byEvgeny M. Mirkes, Andrei Zinovyev, Alexander N. Gorban
There are many methods developed to approximate a cloud of vectors embedded in high-dimensional space by simpler objects: starting from principal points and linear manifolds to self-organizing maps, neural gas, elastic maps, various types of principal curves and principal trees, and so on. For each type of approximators the measure of the approximator complexity was developed too. These measures are necessary to find the balance between accuracy and complexity and to define the optimal approximations of a given type. We propose a measure of complexity (geometrical complexity) which is applicable to approximators of several types and which allows comparing data approximations of different types.
History
Citation
Advances in Computational Intelligence. IWANN 2013. Lecture Notes in Computer Science, 2013, vol 7902.
Author affiliation
/Organisation/COLLEGE OF SCIENCE AND ENGINEERING/Department of Mathematics
Source
International Work-Conference on Artificial Neural Networks IWANN 2013, Tenerife, Spain
Version
AM (Accepted Manuscript)
Published in
Advances in Computational Intelligence. IWANN 2013. Lecture Notes in Computer Science