ON THE CONVERGENCE OF THE WAVELET-GALERKIN METHOD FOR NONLINEAR FILTERING

被引:2
作者
Nowak, Lukasz D. [1 ]
Paslawska-Poludniak, Monika [2 ]
Twardowska, Krystyna [3 ]
机构
[1] Warsaw Univ Technol, Fac Math & Informat Sci, PL-00661 Warsaw, Poland
[2] Rzeszow Univ Technol, Dept Math, PL-35959 Rzeszow, Poland
[3] Warsaw Univ Life Sci SGGW, Fac Appl Informat & Math, PL-02776 Warsaw, Poland
来源
INTERNATIONAL JOURNAL OF APPLIED MATHEMATICS AND COMPUTER SCIENCE | 2010年 / 20卷 / 01期
关键词
Zakai equation; Galerkin method; wavelet basis; Euler scheme; REAL-TIME SOLUTION; ZAKAI EQUATION; APPROXIMATIONS; BASES;
D O I
10.2478/v10006-010-0007-5
中图分类号
TP [自动化技术、计算机技术];
学科分类号
0812 ;
摘要
The aim of the paper is to examine the wavelet-Galerkin method for the solution of filtering equations. We use a wavelet biorthogonal basis with compact support for approximations of the solution. Then we compute the Zakai equation for our filtering problem and consider the implicit Euler scheme in time and the Galerkin scheme in space for the solution of the Zakai equation. We give theorems on convergence and its rate. The method is numerically much more efficient than the classical Galerkin method.
引用
收藏
页码:93 / 108
页数:16
相关论文
共 50 条
[31]   Discontinuous Legendre wavelet Galerkin method for reaction-diffusion equation [J].
Zheng, Xiaoyang ;
Wei, Zhengyuan .
INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 2017, 94 (09) :1806-1832
[32]   ON THE CONVERGENCE OF THE STOCHASTIC GALERKIN METHOD FOR RANDOM ELLIPTIC PARTIAL DIFFERENTIAL EQUATIONS [J].
Mugler, Antje ;
Starkloff, Hans-Joerg .
ESAIM-MATHEMATICAL MODELLING AND NUMERICAL ANALYSIS-MODELISATION MATHEMATIQUE ET ANALYSE NUMERIQUE, 2013, 47 (05) :1237-1263
[33]   Solving Nonlinear Filtering Problems Using a Tensor Train Decomposition Method [J].
Li, Sijing ;
Wang, Zhongjian ;
Yau, Stephen S. -T. ;
Zhang, Zhiwen .
IEEE TRANSACTIONS ON AUTOMATIC CONTROL, 2023, 68 (07) :4405-4412
[34]   A Splitting Method for Nonlinear Filtering Problems with Diffusive and Point Process Observations [J].
Zhang, Fengshan ;
Zou, Yongkui ;
Chai, Shimin ;
Cao, Yanzhao .
COMMUNICATIONS IN COMPUTATIONAL PHYSICS, 2024, 36 (04) :996-1020
[35]   Negative norm estimates and superconvergence results in Galerkin method for strongly nonlinear parabolic problems [J].
Pany, Ambit Kumar ;
Khebchareon, Morrakot ;
Pani, Amiya K. .
COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2021, 99 :26-36
[36]   Coupled response of sandwich beams on the nonlinear foundation under Galerkin truncation convergence criterion [J].
Chen, Hong-Yan ;
Li, Wei ;
Shi, Hai-Tian .
INTERNATIONAL JOURNAL OF DYNAMICS AND CONTROL, 2024, 12 (07) :2144-2154
[37]   NUMERICAL SOLUTION OF BOUNDARY VALUE PROBLEMS BY GALERKIN METHOD USING BOUBAKER WAVELET [J].
Angad, L. M. .
TWMS JOURNAL OF APPLIED AND ENGINEERING MATHEMATICS, 2023, 13 :145-153
[38]   A modified nonlinear Galerkin method for the viscoelastic fluid motion equations [J].
Cannon, JR ;
Ewing, RE ;
He, YN ;
Lin, YP .
INTERNATIONAL JOURNAL OF ENGINEERING SCIENCE, 1999, 37 (13) :1643-1662
[39]   Galerkin finite element method for damped nonlinear Schrodinger equation [J].
Wang, Lingli ;
Li, Meng .
APPLIED NUMERICAL MATHEMATICS, 2022, 178 :216-247
[40]   Galerkin finite element method for nonlinear fractional differential equations [J].
Nedaiasl, Khadijeh ;
Dehbozorgi, Raziyeh .
NUMERICAL ALGORITHMS, 2021, 88 (01) :113-141
12345