References
- Anderson , D. , Arnold , B. C. ( 1993 ). Linnik Distribution and processes . J. Appl. Probab. 30 : 330 – 340 .
- Damsleth , E. , El-Shaarawi , A. H. ( 1989 ). ARMA models with double-exponentially distributed noise . J. Roy. Statist. Soc. B 51 ( 1 ): 61 – 69 .
- Dewald , L. S. , Lewis , P. A. W. ( 1985 ). A new Laplace second-order autoregressive time-series model-NLAR(2) . IEEE Trans. Inform. Theor. IT 31 ( 5 ): 645 – 651 .
- Gaver , D. P. , Lewis , P. A. W. ( 1980 ). First order autoregressive gamma sequences and point processes . Adv. Appl. Probab. 12 : 727 – 745 .
- Gibson , J. D. ( 1986 ). Data compression of a first order intermittently excited AR process . In: Wegman , E. J. , Depriest , D. J. , eds. Statistical Image Processing and Graphics . New York : Marcel Deckrer Inc. , pp. 115 – 126 .
- Jayakumar , K. , Kalyanaraman , K. , Pillai , R. N. (1995). α-Laplace processes. Math. Comput. Model. 20:109–116.
- Jayakumar , K. ( 1997 ). First order autoregressive semi α-Laplace process . Statistica LVII 57 : 455 – 463 .
- Jayakumar , K. , Ajitha , B. K. ( 2003 ). Geometric semi-Linnik distributions and processes . Stochastic Model. Applic. 6 ( 2 ): 12 – 20 .
- Jayakumar , K. , Kuttykrishnan , A. P. ( 2007 ). A time series model using asymmetric Laplace distribution . Statist. Probab. Lett. 77 : 1636 – 1640 .
- Jose , K. K , Lishamol , T. , Sreekumar , J. ( 2008 ). Autoregressive processes with normal Laplace marginals . Statist. Probab. Lett. 78 : 2456 – 2462 .
- Klebanov , L. B. , Maniya , G. M. , Melamed , I. A. ( 1984 ). A problem of Zolotarev and analogs of infinitely divisible and stable distribution in a scheme for summing a random number of random variables . Theor. Probab. Appl. 29 : 791 – 794 .
- Kotz , S. , Kozubowski , T. J. , Podgorski , K. ( 2001 ). The Laplace Distribution and Generalizations-A Revisit with Applications to Communications, Economics, Engineering and Finance . Boston : Birkhäuser .
- Kozubowski , T. , Podgórski , K. ( 2008a ). Skew Laplace distributions I. Their origins and inter-relations . Math. Scientist 33 : 22 – 34 .
- Kozubowski , T. , Podgórski , K. ( 2008b ). Skew Laplace distributions II. divisibility properties and extensions to stochastic processes . Math. Scientist 33 : 35 – 48 .
- Kozubowski , T. , Nadarajah , S. ( 2010 ). Multitude of Laplace distributions . Statist. Pap. 51 : 127 – 148 .
- Küchler , U. , Tappe , S. ( 2008a ). On the shapes of bilateral Gamma densities . Statist. Probab. Lett. 78 : 2478 – 2484 .
- Küchler , U. , Tappe , S. ( 2008b ). Bilateral Gamma distributions and processes in financial Mathematics . Stochastic Process. Applic. 118 ( 2 ): 261 – 283 .
- Lawrance , A. J. ( 1978 ). Some autoregressive models for point processes. Proc. Bolyai Mathemat. Soc. Colloquiuon Point Process. Queuing Prob., Hungary, 24:257–275 .
- Lawrance , A. J. ( 1982 ). The innovation distribution of a gamma distributed autoregressive process . Scand. J. Statist. 9 : 234 – 236 .
- Lishamol , T. , Jose , K. K. ( 2009 ). Generalized normal-Laplace AR process . Statist. Probab. Lett. 79 : 1615 – 1620 .
- Mathai , A. M. , Saxena , R. K. , Haubold , H. J. ( 2006 ). A certain class of Laplace transforms with applications to reaction and reaction-diffusion equations . Astrophys. Space Sci. 305 : 283 – 288 .
- Mathai , A. M. ( 1993a ). On noncentral generalized Laplacian distribution . J. Statist. Res. 27 ( 1–2 ): 57 – 80 .
- Mathai , A. M. ( 1993b ). On noncentral generalized Laplacianness of quadratic forms in normal variables . J. Multivariate Anal. 45 ( 2 ): 239 – 246 .
- Mathai , A. M. ( 1993c ). The residual effect of a growth-decay mechanism and the distribution of covariance structures . Can. J. Statist. 21 ( 3 ): 277 – 283 .
- Pillai , R. N. ( 1985 ). Semi α-Laplace distribution . Commun. Statist. Theor. Meth. 14 : 991 – 1000 .
- Pillai , R. N. ( 1990 ). Harmonic mixtures and geometric infinite divisibility . J. Ind. Statist. Assoc. 28 : 87 – 98 .
- Pillai , R. N. , Sandhya , E. ( 1990 ). Distributions with complete monotone derivative and geometric infinite divisibility . Adv. Appl. Probab. 22 : 751 – 754 .
- Seethalekshmi , V. , Jose , K. K. (2004a). An autoregressive process with geometric α-Laplace marginals. Statist. Pap. 45:337–350.
- Seethalekshmi , V. , Jose , K. K. ( 2004b ). Geometric Mittag-Leffler distributions and processes . J. Appl. Statist. Sci. 13 ( 4 ): 335 – 342 .
- Seethalekshmi , V. , Jose , K. K. ( 2006 ). Autoregressive process with Pakes and geometric Pakes generalized Linnik marginals . Statist. Probab. Lett. 76 ( 2 ): 318 – 326 .
- Weiss , G. ( 1977 ). Shot noise models for the generation of synthetic stream flow data . Water Resour. Res. 13 : 101 – 108 .
- Wu , F. ( 2008 ). Applications of the normal Laplace and generalized normal Laplace Distributions, Unpublished M.Sc. Thesis, Department of Mathematics and Statistics, University of Victoria, Victoria, British Columbia .