Exact relaxation of multy point iterative methods

Standard

Exact relaxation of multy point iterative methods. / Михеев, С.Е.

Exact relaxation of multy point iterative methods. 2014. p. 116 - 117.

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › Research

Harvard

Михеев, СЕ 2014, Exact relaxation of multy point iterative methods. in Exact relaxation of multy point iterative methods. pp. 116 - 117.

APA

Михеев, С. Е. (2014). Exact relaxation of multy point iterative methods. In Exact relaxation of multy point iterative methods (pp. 116 - 117)

Vancouver

Михеев СЕ. Exact relaxation of multy point iterative methods. In Exact relaxation of multy point iterative methods. 2014. p. 116 - 117

Author

Михеев, С.Е. / Exact relaxation of multy point iterative methods. Exact relaxation of multy point iterative methods. 2014. pp. 116 - 117

BibTeX

@inproceedings{90a4782d322a4eb39bb65b40bcc0dca8,

title = "Exact relaxation of multy point iterative methods",

abstract = "Simple effective algorithm to calculate n-points iterative method exact relaxation is proposed and justified. The algorithm allows to circumvent the problem to find roots of polynomial with degree n > 2. The algorithm calculation price is easy estimated before iteration beginning. This lets a priory to specify expediency of the exact relaxation application.",

author = "С.Е. Михеев",

year = "2014",

language = "English",

isbn = "978-1-4799-5315-8",

pages = "116 -- 117",

booktitle = "Exact relaxation of multy point iterative methods",

}

RIS

TY - GEN

T1 - Exact relaxation of multy point iterative methods

AU - Михеев, С.Е.

PY - 2014

Y1 - 2014

N2 - Simple effective algorithm to calculate n-points iterative method exact relaxation is proposed and justified. The algorithm allows to circumvent the problem to find roots of polynomial with degree n > 2. The algorithm calculation price is easy estimated before iteration beginning. This lets a priory to specify expediency of the exact relaxation application.

AB - Simple effective algorithm to calculate n-points iterative method exact relaxation is proposed and justified. The algorithm allows to circumvent the problem to find roots of polynomial with degree n > 2. The algorithm calculation price is easy estimated before iteration beginning. This lets a priory to specify expediency of the exact relaxation application.

M3 - Conference contribution

SN - 978-1-4799-5315-8

SP - 116

EP - 117

BT - Exact relaxation of multy point iterative methods

ER -

ID: 4711496