Peter J. Olver, Changzheng Qu, Yun Yang, “Feature Matching and Heat Flow in Centro-Affine Geometry”, SIGMA, 2020, Volume 16,093, 22 pp.

This article is cited in 4 papers

Feature Matching and Heat Flow in Centro-Affine Geometry

Peter J. Olver^a, Changzheng Qu^b, Yun Yang^c

^a School of Mathematics, University of Minnesota, Minneapolis, MN 55455, USA
^b School of Mathematics and Statistics, Ningbo University, Ningbo 315211, P.R. China
^c Department of Mathematics, Northeastern University, Shenyang, 110819, P.R. China

Abstract: In this paper, we study the differential invariants and the invariant heat flow in centro-affine geometry, proving that the latter is equivalent to the inviscid Burgers' equation. Furthermore, we apply the centro-affine invariants to develop an invariant algorithm to match features of objects appearing in images. We show that the resulting algorithm compares favorably with the widely applied scale-invariant feature transform (SIFT), speeded up robust features (SURF), and affine-SIFT (ASIFT) methods.

Keywords: centro-affine geometry, equivariant moving frames, heat flow, inviscid Burgers' equation, differential invariant, edge matching.

MSC: 53A15, 53A55

Received: April 2, 2020; in final form September 14, 2020; Published online September 29, 2020

Language: English

DOI: 10.3842/SIGMA.2020.093