Open AccessConjugate Unscented Transformation: Applications to Estimation and Control
Author(s) -
Nagavenkat Adurthi,
Puneet Singla,
Tarunraj Singh
Publication year - 2017
Publication title -
journal of dynamic systems measurement and control
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.528
H-Index - 89
eISSN - 1528-9028
pISSN - 0022-0434
DOI - 10.1115/1.4037783
Subject(s) - hermite polynomials , gaussian quadrature , mathematics , nonlinear system , transformation (genetics) , benchmark (surveying) , mathematical optimization , gauss , legendre polynomials , quadrature (astronomy) , polynomial , algorithm , gaussian , computer science , mathematical analysis , integral equation , nyström method , biochemistry , chemistry , physics , geodesy , quantum mechanics , geography , electrical engineering , gene , engineering
This paper presents a computationally efficient approach to evaluate multidimensional expectation integrals. Specifically, certain nonproduct cubature points are constructed that exploit the symmetric structure of the Gaussian and uniform density functions. The proposed cubature points can be used as an efficient alternative to the Gauss–Hermite (GH) and Gauss–Legendre quadrature rules, but with significantly fewer number of points while maintaining the same order of accuracy when integrating polynomial functions in a multidimensional space. The advantage of the newly developed points is made evident through few benchmark problems in uncertainty propagation, nonlinear filtering, and control applications.
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