Title :
Object recognition using graph spectral invariants
Author :
Xiao, Bai ; Wilson, Richard ; Hancock, Edwin
Author_Institution :
Comput. Sci. Dept., Univ. of York, York, UK
Abstract :
Graph structures have been proved important in high level-vision since they can be used to represent structural and relational arrangements of objects in a scene. One of the problems that arises in the analysis of structural abstractions of object is graph clustering. In this paper, we explore how permutation invariants computed from the trace of the heat kernel can be used to characterize graphs for the purposes of measuring similarity and clustering. We explore three different approaches to characterize the heat kernel trace as a function of time. These are the heat kernel trace moments, heat content invariants and symmetric polynomials with Laplacian eigenvalues as inputs. Experiments on the COIL 100 and Caltech 256 databases reveal that the proposed invariants are effective and outperform the tradition methods.
Keywords :
Laplace transforms; computer vision; eigenvalues and eigenfunctions; graph theory; image representation; object recognition; pattern clustering; polynomials; spectral analysis; Laplacian eigenvalue; graph clustering; graph spectral invariant; heat content invariant; heat kernel trace moment; high level-vision; object recognition; object relational arrangement; object structural representation; permutation invariant; similarity measurement; symmetric polynomial; Databases; Eigenvalues and eigenfunctions; Image recognition; Kernel; Laplace equations; Layout; Object recognition; Polynomials; Shape measurement; Symmetric matrices;
Conference_Titel :
Pattern Recognition, 2008. ICPR 2008. 19th International Conference on
Conference_Location :
Tampa, FL
Print_ISBN :
978-1-4244-2174-9
Electronic_ISBN :
1051-4651
DOI :
10.1109/ICPR.2008.4761245
