A note on the non-commutative neutrix product of distributions |
| |
| Authors: | Emin Özçag |
| |
| Institution: | (1) Department of Mathematics, University of Hacettepe, 06532-Beytepe, Ankara, Turkey |
| |
| Abstract: | The distributionF(x
+, −r) Inx+ andF(x
−, −s) corresponding to the functionsx
+
−r lnx+ andx
−
−s respectively are defined by the equations (1) and (2) whereH(x) denotes the Heaviside function. In this paper, using the concept of the neutrix limit due to J G van der Corput 1], we evaluate
the non-commutative neutrix product of distributionsF(x
+, −r) lnx+ andF(x
−, −s). The formulae for the neutrix productsF(x
+, −r) lnx
+ ox
−
−s, x+
−r lnx+ ox
−
−s andx
−
−s o F(x+, −r) lnx+ are also given forr, s = 1, 2, ... |
| |
| Keywords: | Distribution delta function neutrix neutrix limit neutrix product |
| 本文献已被 SpringerLink 等数据库收录! |
|
![$$\left\langle {F(x_ + , - r)\ln x_ + ,\phi (x)} \right\rangle = \int_0^\infty {x^{ - r} \ln x\left {\phi (x) - \sum\limits_{i = 0}^{r - 2} {\frac{{\phi ^{(i)} (0)}}{{i!}}x^i \frac{{\phi ^{(i)} (0)}}{{(r - 1)!}}H(1 - x)x^{r - 1} } } \right]dx} $$](/content/V233442833Q82T31/12044_2008_Article_BF02837770_TeX2GIFE1.gif)
![$$\left\langle {F(x_ + , - s),\phi (x)} \right\rangle = \int_0^\infty {x^{ - s} \left {\phi (x) - \sum\limits_{i = 0}^{s - 2} {\frac{{\phi ^{(i)} (0)}}{{i!}}( - x^i )\frac{{\phi ^{(s - 1)} (0)}}{{(s - 1)!}}H(1 - x)x^{s - 1} } } \right]dx} $$](/content/V233442833Q82T31/12044_2008_Article_BF02837770_TeX2GIFE2.gif)