Jin MM: Generalized nonlinear implicit quasi-variational inclusions with relaxed monotone mappings. Nonlinear Var. Indian J. Shanghai Sci. Sichuan Univ. Amann H: On the number of solutions of nonlinear equations in ordered Banach space. Du YH: Fixed points of increasing operators in ordered Banach spaces and applications. Nonlinear Anal.
TMA , — Ge DJ: Fixed points of mixed monotone operators with applications. Li HG: Approximation solution for generalized nonlinear ordered variational inequality and ordered equation in ordered Banach space. Forum , 13 2 — Li H-g: Approximation solution for a new class of general nonlinear ordered variational inequalities and ordered equations in ordered Banach space. Forum , 89— Nonlinear Funct. Li H-g: Sensitivity analysis for general nonlinear ordered parametric variational inequality with restricted-accretive mapping in ordered Banach space.
Springer, Berlin; Fixed Point Theory Appl.
Alimohammady M, Balooee J, Cho YJ, Roohi M: New perturbed finite step iterative algorithms for a system of extended generalized nonlinear mixed-quasi variational inclusions. Yao Y, Cho YJ, Liou Y: Iterative algorithms for variational inclusions, mixed equilibrium problems and fixed point problems approach to optimization problems. Download references. Correspondence to Hong Gang Li. Reprints and Permissions. Search all SpringerOpen articles Search.
MSC: 49J40, 47H References 1.
MathSciNet Google Scholar 6. MathSciNet Google Scholar 7. MathSciNet Google Scholar 8. Google Scholar MathSciNet Google Scholar Jayakumar, "The stationary solution of a first order integer-valued autoregressive process", Statistica 55 , — Jayakumar, K. Kalyanaraman, and R. Modelling 22 1 , — Jayakumar and A. Kuttykrishnan, "A time-series model using asymmetric Laplace distribution", Statist. Jayakumar and R. Pillai, "On class L.
Pillai, "The first-order autoregressive Mittag-Leffler process", J.
- Shop Characterization Of Distributions By The Method Of Intensively Monotone Operators;
- Melamed Joseph a - AbeBooks;
- The Choice?
- Ensemble de documents.
- Characterization Problems Associated With The Exponential Distribution Russian Edition.
Pillai, "Characterization of Mittag-Leffler distribution", J. Suresh, "Mittag-Leffler distributions", J. Indian Soc. Jurek and J. Kakosyan, L.
Klebanov, and J. Klebanov, T. Kozubowski, and S.
Klebanov, G. Maniya, and I. Melamed, "A problem of Zolotarev and analogs of infinitely divisible and stable distributions in a scheme for summing a random number of random variables", Theory Probab. Maniya, and J. Melamed, "Analogs of infinitely divisible and stable laws for sums of random number of random variables", Fourth Intern. Klebanov, J. Melamed, S. Mittnik, and S. Rachev, "Integral and asymptotic representations of geo-stable densities", Appl.
Melamed, and S. Rachev, "On the products of a random number of random variables in connection with a problem from mathematical economics", in: Lect. Notes Math.
Melamed Joseph a
Klebanov and S. Komunjer, "Asymmetric power distribution: theory and applications to risk measurement", J. Kotz, T. Kozubowski, and K. Kotz and I. Ostrovskii, "A mixture representation of the Linnik distribution", Statist. Kotz, I. Ostrovskii, and A. Kovalenko, "On the class of limit distributions for thinning streams of homogeneous events", Litovsk.
- Tokyo Cancelled.
- Entire solutions of semilinear elliptic equations.
- Werewolf Skin (Goosebumps, Book 60).
- E. coli in Motion (Biological and Medical Physics, Biomedical Engineering).
- Cool Knitting for Kids. A Fun and Creative Introduction to Fiber Art?
- Vepdeutsche Bank 2003?
Lithuanian, English summaries. Kozubowski, "The theory of geometric stable distributions and its use in modeling financial data", Ph. Dissertation, University of California, Santa Barbara, Kozubowski, "Estimation of the parameters of geometric stable laws", Technical Report No.
Modelling 29 , — Kozubowski, "Representation and properties of geometric stable laws", in: Approximation, Probability, and Related Fields, G. Anastassiou and S. Rachev eds. Kozubowski, "The inner characterization of geometric stable laws", Statist. Decisions 12 , — Kozubowski, "Characterization of multivariate geometric stable distributions", Statist. Decisions 15 , — Kozubowski, "Mixture representation of Linnik distribution revisited", Statist.
Kozubowski, "Exponential mixture representation of geometric stable distributions", Ann. Kozubowski, "Computer simulation of geometric stable random variables", J.
Modelling 34 , —, doi Kozubowski and M. Meerschaert, "A bivariate infinitely divisible distribution with exponential and Mittag-Leffler marginals", Statist. Kozubowski, M. Meerschaert, A.
Lev Klebanov (born September 21, ), Russian mathematics educator | Prabook
Panorska, and H. Scheffler, "Operator geometric stable laws", J. Multivariate Anal. Meerschaert, and H. Debrecen 63 4 , — Meerschaert, and K.