Generalization of distributional product of Dirac's delta in hypercone
Let G=G(m, x) be defined by [image omitted] The hypersurface G is due to Kanathai and Nonlaopon ([Kananthai, A. and Nonlaopon, K., 2003, On the residue of generalized function P. Thai Journal of Mathematics, 1, 49-57]). We observe that putting m=1 we obtain [image omitted] The quadratic form P is du...
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th-cmuir.6653943832-612242018-09-10T04:06:58Z Generalization of distributional product of Dirac's delta in hypercone Manuel A. Aguirre Kamsing Nonlaopan Mathematics Let G=G(m, x) be defined by [image omitted] The hypersurface G is due to Kanathai and Nonlaopon ([Kananthai, A. and Nonlaopon, K., 2003, On the residue of generalized function P. Thai Journal of Mathematics, 1, 49-57]). We observe that putting m=1 we obtain [image omitted] The quadratic form P is due to Gelfand and Shilov [Gelfand, I.M. and Shilov, G.E., 1964, Generalized Function, Vol. 1 (New York: Academic Press), p. 253]. The hypersurface P=0 is a hypercone with a singular point (the vertex) at the origin. We know that the kth derivative of Dirac's delta in G there exists under conditions depending on n and m, where n is the dimension of the space. In our study, the main purpose is to related distribution product of the Dirac delta with the coefficient corresponding to the double pole of the expansion in the Laurent series of G+, where G is defined by (3). From this we can arrive at a formula in terms of the operator Lm which is defined by (16). Our results are generalizations of formulae that appear in Aguirre [Aguirre, T.M.A., 2000, The distributional product of Dirac's delta in a hypercone. Journal of Computation and Applied Mathematics, 115, 13-21], pp. 20-21. 2018-09-10T04:06:58Z 2018-09-10T04:06:58Z 2007-01-01 Journal 14768291 10652469 2-s2.0-33947395657 10.1080/10652460601092154 https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=33947395657&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/61224 |
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Mathematics Manuel A. Aguirre Kamsing Nonlaopan Generalization of distributional product of Dirac's delta in hypercone |
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Let G=G(m, x) be defined by [image omitted] The hypersurface G is due to Kanathai and Nonlaopon ([Kananthai, A. and Nonlaopon, K., 2003, On the residue of generalized function P. Thai Journal of Mathematics, 1, 49-57]). We observe that putting m=1 we obtain [image omitted] The quadratic form P is due to Gelfand and Shilov [Gelfand, I.M. and Shilov, G.E., 1964, Generalized Function, Vol. 1 (New York: Academic Press), p. 253]. The hypersurface P=0 is a hypercone with a singular point (the vertex) at the origin. We know that the kth derivative of Dirac's delta in G there exists under conditions depending on n and m, where n is the dimension of the space. In our study, the main purpose is to related distribution product of the Dirac delta with the coefficient corresponding to the double pole of the expansion in the Laurent series of G+, where G is defined by (3). From this we can arrive at a formula in terms of the operator Lm which is defined by (16). Our results are generalizations of formulae that appear in Aguirre [Aguirre, T.M.A., 2000, The distributional product of Dirac's delta in a hypercone. Journal of Computation and Applied Mathematics, 115, 13-21], pp. 20-21. |
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Journal |
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Manuel A. Aguirre Kamsing Nonlaopan |
| author_facet |
Manuel A. Aguirre Kamsing Nonlaopan |
| author_sort |
Manuel A. Aguirre |
| title |
Generalization of distributional product of Dirac's delta in hypercone |
| title_short |
Generalization of distributional product of Dirac's delta in hypercone |
| title_full |
Generalization of distributional product of Dirac's delta in hypercone |
| title_fullStr |
Generalization of distributional product of Dirac's delta in hypercone |
| title_full_unstemmed |
Generalization of distributional product of Dirac's delta in hypercone |
| title_sort |
generalization of distributional product of dirac's delta in hypercone |
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2018 |
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https://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=33947395657&origin=inward http://cmuir.cmu.ac.th/jspui/handle/6653943832/61224 |
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