期刊名称:Lecture Notes in Engineering and Computer Science
印刷版ISSN:2078-0958
电子版ISSN:2078-0966
出版年度:2019
卷号:2240
页码:20-26
出版社:Newswood and International Association of Engineers
摘要:The idea of technological computing has immensely
assisted to enhance accuracy and maximize computed errors
involving computational math. Softcodes computer programme
is guided towards supplying comfortable computation,
proficiency and faster results at all times. The objective of this
study will be to devise softcodes of parallel processing Milne’s
device (SPPMD) via exponentially fitted method for valuating
special ordinary differential equations. This is established
through collocation and interpolation of the exponentially fitted
method. Dissecting (SPPMD) produces the principal local
truncation error (PLTE) after expressing the order of SPPMD
leading to the boundary of convergence. Some selected examples
of special ODEs were tested to show the efficiency and accuracy
of (SPPMD) at different boundary of convergence. The finished
results exist with the aid of (SPPMD). Computed results show
that the (SPPMD) is more proficient compare to subsisting
methods in terms of the work out max errors at all levels.
关键词:Softcodes; exponentially fitted method; boundary
of convergence; Principal local truncation errors
