Al-Manasir and Fraser [10] proposed a registration method using p

Al-Manasir and Fraser [10] proposed a registration method using photogrammetric orientation of images acquired by a scanner-mounted camera. Since images are registered to the TLS scans, the point clouds from each scanner position can be registered using the relative orientation between each pair of registered images. However, since coplanarity is not expected, panoramic reflectance images are not applied in the relative orientation model that they used, which is based on coplanarity. Barnea and Filin [11] presented a registration scheme that matches the extracted features with 2D optical images using the scale invariant feature transform (SIFT), followed by computing the actual transformation between the scans in 3D space using the RANSAC (RANdom SAmpling Consensus) algorithm developed by Fischler and Bolles [12].

Similar to this method, Barnea and Filin [13] developed a key-point based autonomous registration method using range images that also uses the 3D Euclidean distance between key-points as matched entities to identify correspondence.Our earlier work described an algorithm for automatically registering TLS point clouds using reflectance images [14,15]. The algorithm takes advantage of the pixel-to-point correspondence that is inherent to the reflectance images and thus circumvents camera calibration and camera to scanner registration in the case of point cloud registration using optical images. However, the Moravec normal corner detector [16], which is used in [14, 15], is not expected to be useful in the case of a panoramic stereo pair.

As it conforms only to focal plane array optical cameras, it is quite difficult to make any assumptions about the set of possible correspondences for a given feature point extracted from a panoramic image using the normal corner detector.Many applications require more than two scans of any one object or scene. The global registration of multiple scans is more difficult because of the large nonlinear search space and the huge number of raw TLS data involved. Several useful approaches to this problem have been proposed in recent years [17, 18, 19] by means of incrementally registering views against Anacetrapib a growing global union of viewpoints. Bergevin et al. [20] presented an algorithm that considers the network of views as a whole and minimises the registration errors of all views simultaneously.

Inspired by that work, Benjemaa and Schmitt [21] extended the pair-wise registration based on a multi-z-buffer technique to a global registration. They applied rigid transformations, such that it became possible to transform each moving surface immediately after its rigid transformation had been estimated. Similarly, Sharp et al. [22] proposed an analytical method to solve for global registration parameters that involves building a graph to describe the relationship between neighbouring views.

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