Title :
Margin Perceptrons for Graphs
Author_Institution :
Tech. Univ., Berlin, Germany
Abstract :
This contribution extends linear classifiers to sub-linear classifiers for graphs and analyzes their properties. The results are (i) a geometric interpretation of sub linear classifiers, (ii) a generic learning rule based on the principle of empirical risk minimization, (iii) a convergence theorem for the margin perceptron in the separable case, and (iv) the VC-dimension of sub linear functions. Empirical results on graph data show that the perceptron and margin perceptron algorithm on graphs have similar properties as their vectorial counterparts.
Keywords :
graph theory; VC-dimension; empirical risk minimization; generic learning; geometric interpretation; graph theory; margin perceptron; margin perceptrons; sublinear classifiers; vectorial counterparts; Convergence; Hafnium; Kernel; Space vehicles; Support vector machines; Training; Vectors;
Conference_Titel :
Pattern Recognition (ICPR), 2014 22nd International Conference on
Conference_Location :
Stockholm
DOI :
10.1109/ICPR.2014.661
