Novel Parallelogram Set-Membership Estimation Dynamic Navigation Method for Osteotomy Surgical Robot

In this paper, a parallelogram set-membership estimation (PSME) algorithm is proposed to perform osteotomy trajectory estimation in two dimension plane with high accuracy to achieve high-precision osteotomy by an orthopedic surgery robot and meet the safety requirements of the osteotomy. First, to realize the tight envelope of the estimated set on the osteotomy trajectory, a parallelogram envelopment expression is proposed that describes the state set and the observation set. Second, a minimum-area parallelogram envelope method is applied to quickly converge the osteotomy trajectory estimation set to a reliable range. Moreover, the unknown but bounded noise model solves the robustness problem of the algorithm under non-Gaussian conditions, and realizes the accurate estimation of the osteotomy trajectory in any noise environment. Finally, the simulated and experimental results demonstrate that the estimation accuracy and anti-noise performance of the PSME algorithm are better than other estimation algorithms. In the osteotomy experiment, the average osteotomy error is less than 1 mm, which meets the safety requirements of the osteotomy. Furthermore, PSME holds great potential in other estimation problems.

[1]  Shen Yan-xia,et al.  A fault diagnosis method of set membership filter based on convex ploytope , 2017 .

[2]  M S Rathleff,et al.  Total knee replacement and non-surgical treatment of knee osteoarthritis: 2-year outcome from two parallel randomized controlled trials. , 2018, Osteoarthritis and cartilage.

[3]  Sauro Longhi,et al.  Development and experimental validation of an adaptive extended Kalman filter for the localization of mobile robots , 1999, IEEE Trans. Robotics Autom..

[4]  Jürgen Teich,et al.  Minimal enclosing parallelogram with application , 1995, SCG '95.

[5]  J. Norton,et al.  State bounding with ellipsoidal set description of the uncertainty , 1996 .

[6]  Stergios I. Roumeliotis,et al.  Bayesian estimation and Kalman filtering: a unified framework for mobile robot localization , 2000, Proceedings 2000 ICRA. Millennium Conference. IEEE International Conference on Robotics and Automation. Symposia Proceedings (Cat. No.00CH37065).

[7]  Yalou Huang,et al.  Multisensor Information Fusion for People Tracking With a Mobile Robot: A Particle Filtering Approach , 2015, IEEE Transactions on Instrumentation and Measurement.

[8]  Arnaud Doucet,et al.  Sequential Monte Carlo Methods , 2006, Handbook of Graphical Models.

[9]  T. Sakai,et al.  INTRODUCTION TO INTEGRAL GEOMETRY IN RIEMANNIAN HOMOGENEOUS SPACES , 2010 .

[10]  Jin Bae Park,et al.  Robust Least Squares Approach to Passive Target Localization Using Ultrasonic Receiver Array , 2014, IEEE Transactions on Industrial Electronics.

[11]  Christian Schwarz,et al.  On Nding a Minimal Enclosing Parallelogram , 1994 .

[12]  Fredrik Gustafsson,et al.  On Resampling Algorithms for Particle Filters , 2006, 2006 IEEE Nonlinear Statistical Signal Processing Workshop.

[13]  M. Mack,et al.  Minimally invasive and robotic surgery. , 2001, JAMA.

[14]  Ales Leonardis,et al.  Image-based Registration for a Neurosurgical Robot: Comparison Using Iterative Closest Point and Coherent Point Drift Algorithms , 2016, MIUA.

[15]  Miika T. Nieminen,et al.  Osteoarthritis year in review 2018: imaging. , 2019, Osteoarthritis and cartilage.

[16]  M. P. Spathopoulos,et al.  A state-set estimation algorithm for linear systems in the presence of bounded disturbances , 1996 .

[17]  Dong Zhen,et al.  A novel integrated patient specific instrumentation system and its application for total knee arthroplasty , 2016 .

[18]  Athanasios Ververidis,et al.  Minimally invasive versus conventional approaches in total knee replacement/arthroplasty: A review of the literature. , 2018, Journal of orthopaedics.

[19]  Jianda Han,et al.  Active Persistent Localization of a Three-Dimensional Moving Target Under Set-Membership Uncertainty Description Through Cooperation of Multiple Mobile Robots , 2015, IEEE Transactions on Industrial Electronics.

[20]  Wen Yu,et al.  Ellipsoid SLAM: a novel set membership method for simultaneous localization and mapping , 2015, Autonomous Robots.

[21]  Shengwei Mei,et al.  Power system set membership state estimation , 2012, PES 2012.

[22]  Johan Bellemans,et al.  Robot-assisted Total Knee Arthroplasty , 2003, Clinical orthopaedics and related research.

[23]  A. Caiti,et al.  Localization of autonomous underwater vehicles by floating acoustic buoys: a set-membership approach , 2005, IEEE Journal of Oceanic Engineering.