 On the Convolution Equation Related to the Diamond Klein-Gordon OperatorAmphon Liangprom and Kamsing Nonlaopon Abstract and Applied Analysis, 2011, vol. 2011, 1-16 Abstract: We study the distribution 𠑒 𠛼 𠑥 ( ⋄ + 𠑚 2 ) 𠑘 𠛿 for 𠑚 ≥ 0 , where ( ⋄ + 𠑚 2 ) 𠑘 is the diamond Klein-Gordon operator iterated 𠑘 times, 𠛿 is the Dirac delta distribution, 𠑥 = ( 𠑥 1 , 𠑥 2 , … , 𠑥 𠑛 ) is a variable in ℠𠑛 , and 𠛼 = ( 𠛼 1 , 𠛼 2 , … , 𠛼 𠑛 ) is a constant. In particular, we study the application of 𠑒 𠛼 𠑥 ( ⋄ + 𠑚 2 ) 𠑘 𠛿 for solving the solution of some convolution equation. We find that the types of solution of such convolution equation, such as the ordinary function and the singular distribution, depend on the relationship between 𠑘 and 𠑀 . Date: 2011 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:hin:jnlaaa:908491 DOI: 10.1155/2011/908491 Access Statistics for this article More articles in Abstract and Applied Analysis from Hindawi |
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