[
[1] T. Andreescu, D. Andrica, Number Theory. Structures, Examples, and Problems, Birkhauser Verlag, Boston-Berlin-Basel (2009)
]Search in Google Scholar
[
[2] D. Andrica, O. Bagdasar, Recurrent Sequences: Key Results, Applications and Problems, Springer (2020)10.1007/978-3-030-51502-7
]Search in Google Scholar
[
[3] D. Andrica, O. Bagdasar, On some arithmetic properties of the generalised Lucas sequences,Med.J.Math. 18, Article 47 (2021)10.1007/s00009-020-01653-w
]Search in Google Scholar
[
[4] D. Andrica, O. Bagdasar, Pseudoprimality related to the generalised Lucas sequences, Math. Comput. Simul., 201, 528–542 (2022)
]Search in Google Scholar
[
[5] D. Andrica, O., Bagdasar, On Generalised Lucas Pseudoprimality of Level k, Mathematics, 9(8), 838 (2021)10.3390/math9080838
]Search in Google Scholar
[
[6] D. Andrica, O. Bagdasar, M. Th. Rassias, Weak pseudoprimality associated to the generalized Lucas sequences, In: Approximation and Computation in Science and Engineering, 53–75. Eds. N. J., Daras, Th. M., Rassias, Springer, Cham (2022)10.1007/978-3-030-84122-5_4
]Search in Google Scholar
[
[7] D. Andrica, O. Bagdasar, G. C. T¸urcaş, On some new results for the generalized Lucas sequences, An. Ştiinţ. Univ. Ovidius Constanţa Ser. Mat., XXIX(1), 17–36 (2021)10.2478/auom-2021-0002
]Search in Google Scholar
[
[8] D. Andrica, V. Crişan, F. Al-Thukair, On Fibonacci and Lucas sequences modulo a prime and primality testing, Arab J. Math. Sci. 24(1), 9–15 (2018)10.1016/j.ajmsc.2017.06.002
]Search in Google Scholar
[
[9] P. S. Bruckman, On the infinitude of Lucas pseudoprimes, Fibonacci Quart. 32(2), 153–154 (1994)
]Search in Google Scholar
[
[10] K.-W. Chen, Y.-R. Pan, Greatest common divisors of shifted Horadam sequences, J. Integer Sequences, 23, Article 20.5.8 (2020)
]Search in Google Scholar
[
[11] G. Everest, A. van der Poorten, I. Shparlinski, T. Ward, Recurrence Sequences, Mathematical Surveys and Monographs 104, American Mathematical Society, Providence, U.S.A. (2003)10.1090/surv/104
]Search in Google Scholar
[
[12] J. Grantham, Frobenius pseudoprimes,Math. Comp., 70, 873–891 (2000)
]Search in Google Scholar
[
[13] J. Grantham, Proof of two conjectures of Andrica and Bagdasar,INTEGERS, 21, Article A111 (2021) Vol. 3, Addison Wesley, Second Edition (2003)
]Search in Google Scholar
[
[14] E. Lehmer, On the infinitude of Fibonacci pseudoprimes, Fibonacci Quart. 2(3), 229–230 (1964)
]Search in Google Scholar
[
[15] P. Mihăilescu, M. Th. Rassias, Public key cryptography, number theory and applications, EMS Newsletter 86, 25–30 (2012)
]Search in Google Scholar
[
[16] P. Mihăilescu, M. Th. Rassias, Computational number theory and cryptography, In: Applications of Mathematics and Informatics in Science and Engineering, 349–373. Ed. N. J. Daras, Springer (2014)10.1007/978-3-319-04720-1_22
]Search in Google Scholar
[
[17] The On-Line Encyclopedia of Integer Sequences, http://oeis.org, OEIS Foundation Inc. 2011.
]Search in Google Scholar
[
[18] A. Rotkiewicz, Lucas and Frobenius pseudoprimes, Ann. Math. Sil. 17, 17–39 (2003)
]Search in Google Scholar
[
[19] B. Tams,M.Th. Rassias,P.Mihăilescu, Current challenges for IT security with focus on Biometry, In: Computation, Cryptography, and Network Security, 461–491. Ed. N. J. Daras, M. T. Rassias, Springer (2015)10.1007/978-3-319-18275-9_21
]Search in Google Scholar
[
[20] H. C. Williams, Edouard Lucas and Primality Testing, Wiley-Blackwell (2011)
]Search in Google Scholar