Finding the Projection of a Third-Kind Ill-Posed Boundary Value Problem in the Heat Scattering Equation
R. o’g’li. International Journal on Orange Technologies, 5 (5):
40-47(May 2023)
Abstract
This article proposes a projection method for finding the projection of a third-kind ill-posed boundary value problem in the heat scattering equation. Previous approaches have limitations in terms of accuracy and efficiency, and the proposed method overcomes these limitations by using a projection operator to obtain a well-posed problem. Numerical simulations demonstrate the effectiveness of the method, which has potential applications in various fields, such as heat transfer and material science. Further research can explore the applicability of the method to more complex problems and the extension of the method to other types of ill-posed problems.
%0 Journal Article
%1 noauthororeditor
%A o’g’li, Rustamov Maxammadali Jabborovich | Ubaydullayev Noyob Nodir
%D 2023
%J International Journal on Orange Technologies
%K Tikhonov boundary equation, heat ill-posed method, numerical problems, projection regularization, scattering simulations value
%N 5
%P 40-47
%T Finding the Projection of a Third-Kind Ill-Posed Boundary Value Problem in the Heat Scattering Equation
%U https://journals.researchparks.org/index.php/IJOT/article/view/4365/4089
%V 5
%X This article proposes a projection method for finding the projection of a third-kind ill-posed boundary value problem in the heat scattering equation. Previous approaches have limitations in terms of accuracy and efficiency, and the proposed method overcomes these limitations by using a projection operator to obtain a well-posed problem. Numerical simulations demonstrate the effectiveness of the method, which has potential applications in various fields, such as heat transfer and material science. Further research can explore the applicability of the method to more complex problems and the extension of the method to other types of ill-posed problems.
@article{noauthororeditor,
abstract = {This article proposes a projection method for finding the projection of a third-kind ill-posed boundary value problem in the heat scattering equation. Previous approaches have limitations in terms of accuracy and efficiency, and the proposed method overcomes these limitations by using a projection operator to obtain a well-posed problem. Numerical simulations demonstrate the effectiveness of the method, which has potential applications in various fields, such as heat transfer and material science. Further research can explore the applicability of the method to more complex problems and the extension of the method to other types of ill-posed problems.},
added-at = {2023-11-01T08:08:45.000+0100},
author = {o’g’li, Rustamov Maxammadali Jabborovich | Ubaydullayev Noyob Nodir},
biburl = {https://www.bibsonomy.org/bibtex/21cbac6523f3ee16bb07d86d2be66f23e/researchpark_20},
interhash = {5e0c7616667e985536901115de343f8d},
intrahash = {1cbac6523f3ee16bb07d86d2be66f23e},
issn = {2615-8140},
journal = {International Journal on Orange Technologies},
keywords = {Tikhonov boundary equation, heat ill-posed method, numerical problems, projection regularization, scattering simulations value},
language = {english},
month = may,
number = 5,
pages = {40-47},
timestamp = {2023-11-01T08:08:45.000+0100},
title = {Finding the Projection of a Third-Kind Ill-Posed Boundary Value Problem in the Heat Scattering Equation},
url = {https://journals.researchparks.org/index.php/IJOT/article/view/4365/4089},
volume = 5,
year = 2023
}