Next Article in Journal
The Use of the Evenness of Eigenvalues of Similarity Matrices to Test for Predictivity of Ecosystem Classifications
Previous Article in Journal
Evaluation Based on Distance from Average Solution Method for Multiple Criteria Group Decision Making under Picture 2-Tuple Linguistic Environment
Article Menu
Issue 3 (March) cover image

Export Article

Open AccessArticle

A Mathematical Model and Numerical Solution of a Boundary Value Problem for a Multi-Structure Plate

Department of Mathematics, Kocaeli University, 41380 Kocaeli, Turkey
*
Author to whom correspondence should be addressed.
Mathematics 2019, 7(3), 244; https://doi.org/10.3390/math7030244
Received: 7 February 2019 / Revised: 28 February 2019 / Accepted: 4 March 2019 / Published: 8 March 2019
  |  
PDF [3936 KB, uploaded 14 March 2019]
  |  

Abstract

This study examined the deformation problem of a plate system (formed side-by-side) composed of multi-structure plates. It obtained numerical approaches of the transmission conditions on the common border of plates that composed the system. Numerical examples were solved in different boundary and transmission conditions. View Full-Text
Keywords: biharmonic equation; deformation; elastic plate; transmission condition biharmonic equation; deformation; elastic plate; transmission condition
Figures

Figure 1

This is an open access article distributed under the Creative Commons Attribution License which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited (CC BY 4.0).
SciFeed

Share & Cite This Article

MDPI and ACS Style

Yazıcı, V.; Muradoğlu, Z. A Mathematical Model and Numerical Solution of a Boundary Value Problem for a Multi-Structure Plate. Mathematics 2019, 7, 244.

Show more citation formats Show less citations formats

Note that from the first issue of 2016, MDPI journals use article numbers instead of page numbers. See further details here.

Related Articles

Article Metrics

Article Access Statistics

1

Comments

[Return to top]
Mathematics EISSN 2227-7390 Published by MDPI AG, Basel, Switzerland RSS E-Mail Table of Contents Alert
Back to Top