Green function and Fourier transform for o-plus operators
In this article, we study the o-plus operator defined by $$ oplus^k =Big(Big(sum^{p}_{i=1}frac{partial^2}{partial x^2_i}Big)^{4}-Big(sum^{p+q}_{j=p+1}frac{partial^2}{partial x^2_j}Big)^{4}Big)^k , $$ where $x=(x_1,x_2,dots,x_n)in mathbb{R}^n$, $p+q=n$, and $k$ is a nonnegative integer. Firstl...
| Main Author: | |
|---|---|
| Format: | Article |
| Language: | English |
| Published: |
Texas State University
2010-04-01
|
| Series: | Electronic Journal of Differential Equations |
| Subjects: | |
| Online Access: | http://ejde.math.txstate.edu/Volumes/2010/48/abstr.html |
| id |
doaj-fe3e4d1801014bbf836b36b59350c507 |
|---|---|
| record_format |
Article |
| spelling |
doaj-fe3e4d1801014bbf836b36b59350c5072020-11-24T22:38:21ZengTexas State UniversityElectronic Journal of Differential Equations1072-66912010-04-01201048,114Green function and Fourier transform for o-plus operatorsWanchak SatsanitIn this article, we study the o-plus operator defined by $$ oplus^k =Big(Big(sum^{p}_{i=1}frac{partial^2}{partial x^2_i}Big)^{4}-Big(sum^{p+q}_{j=p+1}frac{partial^2}{partial x^2_j}Big)^{4}Big)^k , $$ where $x=(x_1,x_2,dots,x_n)in mathbb{R}^n$, $p+q=n$, and $k$ is a nonnegative integer. Firstly, we studied the elementary solution for the $oplus^k $ operator and then this solution is related to the solution of the wave and the Laplacian equations. Finally, we studied the Fourier transform of the elementary solution and also the Fourier transform of its convolution. http://ejde.math.txstate.edu/Volumes/2010/48/abstr.htmlFourier transformdiamond operatortempered distribution |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Wanchak Satsanit |
| spellingShingle |
Wanchak Satsanit Green function and Fourier transform for o-plus operators Electronic Journal of Differential Equations Fourier transform diamond operator tempered distribution |
| author_facet |
Wanchak Satsanit |
| author_sort |
Wanchak Satsanit |
| title |
Green function and Fourier transform for o-plus operators |
| title_short |
Green function and Fourier transform for o-plus operators |
| title_full |
Green function and Fourier transform for o-plus operators |
| title_fullStr |
Green function and Fourier transform for o-plus operators |
| title_full_unstemmed |
Green function and Fourier transform for o-plus operators |
| title_sort |
green function and fourier transform for o-plus operators |
| publisher |
Texas State University |
| series |
Electronic Journal of Differential Equations |
| issn |
1072-6691 |
| publishDate |
2010-04-01 |
| description |
In this article, we study the o-plus operator defined by $$ oplus^k =Big(Big(sum^{p}_{i=1}frac{partial^2}{partial x^2_i}Big)^{4}-Big(sum^{p+q}_{j=p+1}frac{partial^2}{partial x^2_j}Big)^{4}Big)^k , $$ where $x=(x_1,x_2,dots,x_n)in mathbb{R}^n$, $p+q=n$, and $k$ is a nonnegative integer. Firstly, we studied the elementary solution for the $oplus^k $ operator and then this solution is related to the solution of the wave and the Laplacian equations. Finally, we studied the Fourier transform of the elementary solution and also the Fourier transform of its convolution. |
| topic |
Fourier transform diamond operator tempered distribution |
| url |
http://ejde.math.txstate.edu/Volumes/2010/48/abstr.html |
| work_keys_str_mv |
AT wanchaksatsanit greenfunctionandfouriertransformforoplusoperators |
| _version_ |
1725713546628562944 |