English

The Definition and Numerical Method of Final Value Problem and Arbitrary Value Problem

Numerical Analysis 2018-11-06 v3

Abstract

Many Engineering Problems could be mathematically described by Final Value Problem, which is the inverse problem of Initial Value Problem. Accordingly, the paper studies the final value problem in the field of ODE problems and analyses the differences and relations between initial and final value problems. The more general new concept of the endpoints-value problem which could describe both initial and final problems is proposed. Further, we extend the concept into inner-interval value problem and arbitrary value problem and point out that both endpoints-value problem and inner-interval value problem are special forms of arbitrary value problem. Particularly, the existence and uniqueness of the solutions of final value problem and inner-interval value problem of first order ordinary differential equation are proved for discrete problems. The numerical calculation formulas of the problems are derived, and for each algorithm, we propose the convergence and stability conditions of them. Furthermore, multivariate and high-order final value problems are further studied, and the condition of fixed delay is also discussed in this paper. At last, the effectiveness of the considered methods is validated by numerical experiment.

Keywords

Cite

@article{arxiv.1801.01608,
  title  = {The Definition and Numerical Method of Final Value Problem and Arbitrary Value Problem},
  author = {Shixiong Wang and Jianhua He and Chen Wang and Xitong Li},
  journal= {arXiv preprint arXiv:1801.01608},
  year   = {2018}
}

Comments

Scheduled for publication in the September 2018 edition of CSSE(Computer Systems Science and Engineering) journal, Volume 33 Number 5

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