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IMPACT OF PUBLICATIONS
The impact of the research work of
A.N. Philippou is indicated by the citations to it in research papers, Ph.D. theses and
books, published by researchers working in more than 40 countries.
LIST OF 340
PAPERS ΟR BOOKS - OUT OF MORE THAN 600 - CITING THE RESEARCH OF ANDREAS N.
PHILIPPOU 1.
ACOSTA-MEJIA, C.A. and
J.J. PIGNATIELLO, Jr. (2008). Modified
R-charts for improved performance. Quality
Engineering 20(3), 361-369. 2.
ADEGOKE, Kunle
(2015). On generalized harmonic numbers, Tornheim
double series and linear Euler sums. viXra:1511.0102 3.
AGARWAL, M., K. SEN
and P. MOHAN (2007). GERT analysis of m-consecutive-k-out-of-n systems. IEEE Transactions on Reliability 56 (1),
26-34. 4.
AGEEVA, H. and Y.
KHARIN (2015). ML estimation of multiple regression parameters under
classification of the dependent variable. Lithuanian
Mathematical Journal 55 (1), 48-60.
5.
AHDOUT, S., S. ROTHMAN and H. STRASSBERG
(2006). Streaks and Generalized Fibonacci Sequences. The College
Mathematics Journal 37, 221-223. 6.
*AKI, S.
(2018). Waiting time for consecutive repetitions
of a pattern and related distributions. Annals of the Institute of
Statistical Mathematics 7.
AKI, S.
and K. HIRANO (2016). On monotonicity of expected values
of some run-related distributions. Annals of the Institute of Statistical Mathematics 68 (5), 1055–1072 8.
AKI, S. and K. HIRANO
(2000). Numbers
of success-runs of specified length until certain stopping time rules and
generalized binomial distributions of order k. Annals of the Institute of Statistical Mathematics 52, No.4,
767-777. Zbl 0991.60007 (Reviewer: Andreas N. Philippou). 9.
AKI, S., N. BALAKRISHNAN and S.G. MOHANTY
(1996). Sooner and later waiting time problems for success and failure runs in
higher order Markov dependent trials. Annals
of the Institute of Statistical Mathematics 48, No.4, 773-787. 10.
AKI, S., H. KUBOKI
and K. HIRANO (1984). On discrete distributions of order k. Annals of the Institute of Statistical
Mathematics 36, 431-440. 11.
AKRITAS, M.G. (1991). An
alternative derivation of aligned rank tests for regression. Journal of Statistical Planning and
Inference 27, No.2, 171-186. 12.
ALBERT, Jim (2013). Looking at spacings to assess streakiness. Journal
of Quantitative Analysis in Sports 9(2), 151-163. 13.
ALETTI, G. and D.
SAADA (2009). How to Reduce Unnecessary Noise in Targeted Networks. In Ahmad K. Naimzada,
Silvana Stefani and Anna Torriero (eds.) Networks, Topology and Dynamics: Theory and Applications to
Economics and Social Systems 613, 177-193,
Springer.
14.
ALETTI, G and E. MERZBACH (2006). Stopping
Markov processes and first path on graphs. J.
Eur.Math Soc. 8 (1): 49-75. 15.
ALEVIZOS, P.D., S.G.
PAPASTAVRIDIS and P. SYPSAS (1993). Reliability of cyclic
m-consecutive-k-out-of-n:F system. Proceedings of the Second IASTED
International Conference on Reliability, Quality, Control, and Risk Assessment,
140-143, Cambridge. 16.
ANTZOULAKOS, D.L.
(2001). Waiting times for patterns in a sequence of multistate
trials. Journal of Applied Probability 38(2), 508-518. 17.
ANTZOULAKOS, D.L., M.V.
KOUTRAS and A.C. RAKITZIS (2009). Start-up demonstration tests based
on run and scan statistics. Journal
of Quality Technology 41(1), 48-59. 18.
ANTZOULAKOS, D.L. and
M.V. BOUTSIKAS (2007).
A
direct method to obtain the joint distribution of successes, failures and
patterns in enumeration problems. Statistics and Probability Letters 77 (1), 32-39. 19.
ANTZOULAKOS, D.L., BERSIMIS,
S. and M.V. KOUTRAS (2003). On the distribution
of the total number of run lengths. Annals of the Institute of Statistical Mathematics 55, 865-884. 20.
ANTZOULAKOS, D.L. and S. CHADJICONSTANTINIDIS
(2001). Distributions of
number of success runs in Markov dependent
trials. Annals of the Institute of
Statistical Mathematics 53, 599-619. 21.
*ARAPIS, A.N., FS.
MAKRI and Z. PSILLAKIS. (2017). Joint distribution of k-tuple
statistics in zero-one sequences of Markov-dependent trials. Journal
of Statistical distributions 22.
BALAKRISHNAN, N. and
M.V. KOUTRAS (2002). Runs and
scans with applications. Wiley Series in Probability and Statistics.
Chichester: Wiley. 23.
BALAKRISHNAN, N., M.V.
KOUTRAS and F.S. MILENOS (2014). Start-up demonstration tests:
Models, methods and applications, with some unification. In Applied
Stochastic Models in Business and Industry 30(4), 373-413. 24.
BALAKRISHNAN, N., S.G.
MOHANTY and S. AKI (1997). Start-up demonstration tests under Markov dependent
model with corrective actions. Annals of
the Institute of Statistical Mathematics 49, 155-169. 25.
BALASUBRAMANIAN, K., R. VIPEROS and N. BALAKRISHNAN (1995). Some discrete distributions related to
extended Pascal triangles. Fibonacci
Quarterly 33, No.5, 415-425. Zbl 0858.60014 (Reviewer: A.N. Philippou).
26.
BARBOUR, A.D., L.
HOLST and S. JANSON (1992). Poisson
Approximation, Oxford University Press, Oxford. 27.
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a binary pattern. Mathematical Proceedings of the Royal Irish
Academy 109A,
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moment generating function of the geometric distribution of order k. The
Fibonacci Quarterly 31 (2), 178-180. 29.
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Inferences for Stochastic Processes. Academic Press, New York. 30.
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approach. Chapman and Hall/CRC Monographs on Statistics & Applied
Probability 120. CRC Press, Boca
Raton, FL. 31.
BEAUJEAN, F. and A. CALDWELL (2011). A test
statistic for weighted runs. Journal of Statistical Planning and Inference
141(11), 3437-3446.. 32.
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Stochastic survival models with competing risks and covariates. Biometrics 35, 427-438. 33.
BEKKER, B.M., O. A. IVANOV and V. V. IVANOVA (2016). Application of Generating Functions to the Theory of Success
Runs. Applied Mathematical
Sciences 10 (50), 2491-2495. 34.
BELBACHIR, H., S. BOUROUBI and A. KHELLADI
(2008). Connection between ordinary
multinomials, Fibonacci numbers, Bell polynomials and discrete uniform
distribution. Annales Mathematicae et Informaticae 35, 21-30. 35.
BELYAEV, Yuri K. and
Leif NILSSON (1997). Parametric
Maximum Likelihood Estimators and Resampling. Statistical
Research Report 15, Department of Mathematical Statistics, Umea University,
Sweden. 36.
BELOV, A.G., V.Ya. GALKIN
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law generalized by negative binomial distribution.
Computational Mathematics and
Modeling 17 (1), 76-87. Translated from Prikladnaya Matematika i Informatika, No. 19, pp.
91-102. 37.
BENAZZOUZ, H., M. MOULINE and M. RACHIDI
(2008). Fibonacci Markov chains. Journal of Interdisciplinary Mathematics 11(1),
89-98. 38.
BENJAMIN, A.T., J.J.
QUINN and J.A. ROUSE (2004). Fibinomial Identities. In Applications of Fibonacci
Numbers 9, 19-24, Kluwer Academic Publishers,
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BENJAMIN, A. T., C.R.H. HANUSA and F.E. SU
(2003). Linear recurrences through tilings and Markov
chains. Util. Math. 64, 3-17. 40.
BENSON, G. and X. SU (1998). On the distribution of k-tuple
matches for sequence homology: a constant time exact
calculation of variance. Journal of Computation Biology 5, 87-100.. 41.
BEN TAHER, R. and M. RACHIDI (2000). Linear recurrence relations in the algebra of matrices
and applications. Linear Algebra and Its Applications 330, 15-24. 42.
BERGGREN, J.L. (1985). History of Mathematics
in the Islamic World: The Present State of the Art. Middle East Studies Association
Bulletin 19 (1), 9-33. 43.
BERNDT, B.C.
(1985). Ramanujan's Notebooks I, Springer-Verlag, New York. 44.
BERNSHTEIN, A.V. (1981).
Asymptotically similar criteria. Journal of
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17, pp. 3-56, 1979. 45.
BHATI, D, D.V.S. SASTRY, and P.Z.M. QADRI
(2015). A new generalized Poisson-Lindley distribution. Austrian Journal of
Statistics 44, 35-51. 46.
BHATTACHARYYA, G.K.
and Z. SOEJOETI (1981). Asymptotic normality and efficiency of modified least
squares estimators in some accelerated life test models. Sankhya B43, 18-39. 47.
BHATTACHARYA, S.
(2012). Joint distributions of
circular runs of various lengths based on multi-colour
Pólya urn model. Studia Scientiarum Mathematicarum Hungarica, 49
(3), 283-300. 48.
BIARD, R., C. LEFEVRE,
S. LOISEL and H.N. NAGARAJA (2011). Asymptotic finite-time ruin probabilities for a class of path dependent
heavy-tailed claim amounts using Poisson spacings. Applied
Stochastic Models in Business and Industry 27(5), 503-518 49.
BOLLINGER, R.C. (1984). Fibonacci
k-sequences, Pascal-T triangles, and k-in-a-row problems. Fibonacci Quarterly 22, 146-151 (1984). 50.
BONDARENKO, B.A.
(1993). Generalized Pascal
triangles and pyramids, their fractals, graphs, and applications. Transl.
from the Russian by Richard C. Bollinger. Santa Clara, CA: The Fibonacci
Association. 51.
BOROCZKY, JR., K. and U. SCHNELL (1999). Quisicrystals and the Wulf-Shape.
Discrete and Computational Geometry
21, 421-436. 52.
BORWEIN, J.M. and BRADLEY, D.M. (2006).
Thirty-two Goldbach variations. International Journal of Number Theory 2(1), 65-103. 53.
BOUTSIKAS, M.V., A.C. RAKINTZIS and D.L. ANTZOULAKOS (2011).
On the relation between the distributions of stopping time
and stopped sum with applications. arxiv.org. 54.
BRAMANTE, R. and D. ZAPPA (2016). Global versus local beta models. A partitioned distribution approach. International
Review of Financial Analysis 43, 41-47. 55.
CAPOCELLI, R.M.
(1990). A generalization of Fibonacci trees. In Applications of Fibonacci Numbers 3 (edited by G.E. Bergum, A.N.
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CEKANAVICIUS, V. and P.
VELLAISAMY (2015). A Compound Poisson
Convergence Theorem for Sums of m-Dependent Variables. Journal of
Theoretical Probability 28(3), 1145-1164. 57.
CHADJICONSTANTINIDIS, S., D.L. ANTZOULAKOS and M.V. KOUTRAS (2000). Joint distributions
of successes, failures and patterns in enumeration problems. Advances of Applied Probability 32(3),
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(1978). Rencontre as an odd-even game. Mathematics
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CHAKRABORTY,
Subrata, and Deepesh BHATI. Transmuted geometric
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CHAKRABORTY, Subrata
and R.D. GUPTA (2015). Exponentiated Geometric
Distribution: another generalization of geometric distribution. Communications
in Statistics-Theory and Methods, 44(6), 1143-1157. 61.
CHAN, P.S., H.K.T. NG
and N. BALAKRISHNAN (2008). Statistical inference for start-up demonstration
tests with rejection of units upon observing d failures. Journal of
Applied Statistics 35(8), 867-878. 62.
CHANG, G.J., L. CUI and
F.K. HWANG (2000). Reliabilities of Consecutive-K Systems. Kluwer,
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CHAO, M.T., J.C. FU
and M.V. KOUTRAS (1995). Survey of reliability studies of
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CHAOUI, F., M.
MOULINE and M. RACHIDI (2003). Application of Markov chains properties to
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CHARALAMBIDES, Ch. A.
(1991). Lucas
numbers and polynomials of order k and the length of the longest circular
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CHEN, H., D. DING, and X. LONG (2018). The Hausdorff dimension of level
sets described by Erdös–Rényi average. Journal of Mathematical Analysis and Applications 458 (1),
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