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Complex Variables and Elliptic Equations
An International Journal
Volume 59, 2014 - Issue 11: Microlocal Analysis and Related Topics
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Articles

Stationary hyperfunctional random process

Jaeyoung Chung Department of Mathematics, Kunsan National University, Kunsan, 573-701, Korea
,
Dohan Kim Department of Mathematics, Seoul National University, Seoul, 151-747, KoreaCorrespondence[email protected]
&
Eun Gu Lee Department of e-Business, Dongyang Mirae University, Seoul, 152-714, Korea
Pages 1547-1558 | Received 26 May 2012, Accepted 04 Dec 2012, Published online: 14 Mar 2013

References

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  • Chung , J , Chung , S-Y and Kim , D . 2003 . Bochner-Schwartz type theorem for conditionally positive definite Fourier hyperfunctions . Positivity. , 7 : 323 – 334 .
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  • Chung S-Y, Kim D. Distributions with exponential growth and Bochner-Schwartz theorem for Fourier hyperfunctions. Publ. RIMS, Kyoto Univ. 1995;31:829–845.
  • Chung , S-Y , Kim , D and Lee , EG . 1995 . Schwartz kernel theorem for the Fourier hyperfunctions . Tsukuba J. Math. , 19 : 377 – 385 .
  • Chung , J , Chung , S-Y and Kim , D . 1996 . Translation invariant and positive definite bilinear Fourier hyperfunctions . Bull. Korean Math. Soc. , 33 : 545 – 551 .
  • Lee EG, Kim D. Laplace hyperfunctions. Integral transforms and special functions. 2008;18: 399-407.
  • Chung J, Chung S-Y, Kim D. A characterization for Fourier hyperfunctions. Publ. RIMS, Kyoto Univ. 1994;30:203–208.
  • Chung J, Kim D. Conditionally positive definite hyperfunctions. Publ. RIMS, Kyoto Univ. 2005;41:385–396.

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