Computational Analysis of Distance Operators for the Iterative Closest Point Algorithm

Mora, Higinio; Mora-Pascual, Jerónimo; García-García, Alberto; Martínez-González, Pablo

doi:10.1371/journal.pone.0164694

Cited by 26 publications

(16 citation statements)

References 35 publications

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“…This feature also decreases the number of iterations needed for ICP; therefore, it accelerates the performance of the image registration process. In addition, we added Manhattan error metric, which was proposed by Mora et al to reduce the processing time. It helps to improve the processing time and has the same accuracy as a Euclidian distance metric.…”

Section: Proposed Solutionmentioning

confidence: 99%

“…Furthermore, Table shows the rotation invariant based (global reference point) ICP algorithm's steps. Moreover, the Manhattan metric is used for calculation of the error between two point sets, which requires lower computational cost than the Euclidian distance error metric. The Euclidian distance error metric is only possible with two straight points and lines, whereas the Manhattan error metric is capable of calculating any type of pixels and at any angle.…”

Section: Proposed Solutionmentioning

confidence: 99%

“…The Euclidian distance error metric is only possible with two straight points and lines, whereas the Manhattan error metric is capable of calculating any type of pixels and at any angle. The use of the Manhattan metric instead of the Euclidean one will improve the processing time of the system . Then the final refined 3D pose is obtained and overlaid onto the real‐time video to create AR view in the operation room.…”

Section: Proposed Solutionmentioning

confidence: 99%

“…To improve the processing time of the distance calculation between the two point sets, the Manhattan error metric is employed instead of Euclidian error metric, presented as Equation

d ((), x, y) = \sum_{i = 1}^{n} (||, x_{i} - y_{i}),

where…”

Section: Proposed Solutionmentioning

confidence: 99%

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A novel rotation invariant and Manhattan metric–based pose refinement: Augmented reality–based oral and maxillofacial surgery

Bayrak

Alsadoon

Prasad

et al. 2020

Robotics Computer Surgery

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Background: Augmented reality (AR) is gaining attention in medicine because of the convenience and innovation that it brings to operating rooms. Furthermore, oral and maxillofacial surgery (OMS), which is one of sensitive and narrow spatial surgery, requires high accuracy in image registration and low processing time of the system. However, the current systems are suffering from image registration problems while matching two different posture images. We thus aimed to increase that overlay accuracy and decrease the processing time.Methodology: The proposed system consists of an Iterative Closest Point (ICP) algorithm, which is the combination of a rotation invariant and Manhattan error metric, to provide the best initial parameters and to decrease the computational cost by sorting high and low processing pixel images, respectively. Result:The study on maxillary and mandibular jaw bone demonstrates that the proposed work overlay accuracy ranges from 0.22 to 0.30 mm, and processing time ranges from 10 to 14 frames per second as opposed to the 0.23-to 0.35-mm overlay accuracy and the current 8 to 12 frames per second processing time.Conclusion: This research aimed to improve the visualization and fast AR system for the OMS. Thus, the proposed system achieved an improvement in overlay accuracy and processing time by implementing the Rotation Invariant and Manhattan error metric ICP algorithm. K E Y W O R D S augmented reality, image registration, Iterative Closest Point, jaw surgery, rotation invariant, Tracking Learning Detection 1 | INTRODUCTION Oral and maxillofacial surgery (OMS) is related to the defects and diseases that occur in the teeth, face, jaw, and head. 1 Drilling, cutting, resection, fixing, adjusting and implantation are some of the actions that are performed during surgery. 2 Traditional OMS is guided by CT scans to identify the nerve channels and root canals preoperatively.However, the CT scan data-based preoperative plan is inadequate for the correct visualization of hidden structures owing to the fact that it requires surgeons to imagine the identified nerve channels and root canals during surgery. To solve this problem, 2D monitors were introduced and are now situated in operating rooms to visualize the surgical area. As a result, it increased the surgeon's accurate visualization and decreased their workload during surgery; however, the surgeons are still required to look at the monitor to acquire the information relating to the surgical area. These monitors are incapable of showing

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Section: Proposed Solutionmentioning

confidence: 99%

Section: Proposed Solutionmentioning

confidence: 99%

Section: Proposed Solutionmentioning

confidence: 99%

“…To improve the processing time of the distance calculation between the two point sets, the Manhattan error metric is employed instead of Euclidian error metric, presented as Equation

d ((), x, y) = \sum_{i = 1}^{n} (||, x_{i} - y_{i}),

where…”

Section: Proposed Solutionmentioning

confidence: 99%

See 2 more Smart Citations

A novel rotation invariant and Manhattan metric–based pose refinement: Augmented reality–based oral and maxillofacial surgery

Bayrak

Alsadoon

Prasad

et al. 2020

Robotics Computer Surgery

View full text Add to dashboard Cite

show abstract

“…In fact, many factors affect the matching length and it is difficult to theoretically analyse the influences of these factors. To deal with the contradictions between matching precision and real-time performance, a point-by-point iteration matching algorithm (Mora et al, 2016) and iterative evaluation matching algorithm (Huang et al, 2012) are proposed. Their main idea is to judge whether the matching results meet the given criteria when the matching length increases.…”

Section: Introductionmentioning

confidence: 99%

An Adaptive △M-ICCP Geomagnetic Matching Algorithm

Xiao

Duan

2017

J. Navigation

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In this paper, a novel method is proposed to generate the matching sequence of an ICCP algorithm for aircraft geomagnetic-aided navigation based on the M coding principle. The length of the matching sequence and the selection of the matching points directly affects the performance of the Iterated Closest Contour Point (ICCP) algorithm. This study proposes an adaptive geomagnetic matching method, ΔM-ICCP, to solve the problem of selecting suitable matching lengths, and matching points, when a vehicle is moving in a highly dynamic environment. First, the △M coding principle is adopted to select the matching points based on the information of the magnetic field, the resolution of the magnetic map, and the accuracy of the magnetic sensor. Then, the problem of selecting parameters for the △M-ICCP algorithm is turned into an optimisation problem, which can be solved by a Binary Particle Swarm Optimisation (BPSO) algorithm. Finally, the algorithm is verified through simulation experiments. The proposed algorithm can provide a basis to determine the matching length of the △M-ICCP algorithm and adaptively adjust the algorithm's parameters according to different trajectories. The algorithm is applicable even in the areas where the fluctuations of Earth's magnetic field are not significant.

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