This work is licensed under the Creative Commons Attribution 4.0 International License.
Keng H.L., Introduction to Number Theory, Springer-Verlag Berlin Heidelberg, Germany, 1982.KengH.L.Introduction to Number TheorySpringer-VerlagBerlin Heidelberg, Germany1982Search in Google Scholar
Andrews G.E., Number Theory, W.B. Saunders Co., Dover Publication Inc., New York, USA, 1971.AndrewsG.E.Number TheoryW.B. Saunders Co., Dover Publication Inc.New York, USA1971Search in Google Scholar
Halberstam H., Richert H.E., Sieve Methods, Dover Publications, USA, 2011.HalberstamH.RichertH.E.Sieve MethodsDover PublicationsUSA2011Search in Google Scholar
Caragiu M., Sequential Experiments with Primes, Springer, USA, 2017.CaragiuM.Sequential Experiments with PrimesSpringerUSA2017Search in Google Scholar
Stepney S., Euclid's proof that there are an infinite number of primes, https://www-users.cs.york.ac.uk/susan/cyc/p/primeprf.htm, Accessed: September 3, 2022.StepneyS.Euclid's proof that there are an infinite number of primeshttps://www-users.cs.york.ac.uk/susan/cyc/p/primeprf.htm, Accessed: September 3, 2022.Search in Google Scholar
Uselton S.C., A study of semiprime arithmetic sequences, Honors Theses, 67, https://repository.belmont.edu/cgi/viewcontent.cgi?article=1081&context=honors_theses, Accessed: September 7, 2022.UseltonS.C.A study of semiprime arithmetic sequencesHonors Theses67https://repository.belmont.edu/cgi/viewcontent.cgi?article=1081&context=honors_theses, Accessed: September 7, 2022.Search in Google Scholar
Faber X., Granville A., Prime factors of dynamic sequences, Journal Für Die Reine und Angewandte Mathematik, 661, 189–214, 2011.FaberX.GranvilleA.Prime factors of dynamic sequencesJournal Für Die Reine und Angewandte Mathematik6611892142011Search in Google Scholar
Numbers Aplenty, Semiprimes, https://www.numbersaplenty.com/set/semiprime/, Accessed: September 9, 2022.Numbers AplentySemiprimeshttps://www.numbersaplenty.com/set/semiprime/, Accessed: September 9, 2022.Search in Google Scholar
Borne K., Abdenim O.H., 20 Best prime numbers books of all time, https://bookauthority.org/books/best-prime-numbers-books.BorneK.AbdenimO.H.20 Best prime numbers books of all timehttps://bookauthority.org/books/best-prime-numbers-books.Search in Google Scholar
Niven I., Zuckerman H.S., Montgomery H.L., An Introduction to the Theory of Numbers, John Wiley & Sons, USA, 1991.NivenI.ZuckermanH.S.MontgomeryH.L.An Introduction to the Theory of NumbersJohn Wiley & SonsUSA1991Search in Google Scholar
Crandall R., Pomerance C., Prime Numbers A Computational Perspective (2nd Ed.), Springer, USA, 2005.CrandallR.PomeranceC.Prime Numbers A Computational Perspective2nd Ed.SpringerUSA2005Search in Google Scholar
Zhang Y., Bounded gaps between primes, Annals of Mathematics, 179(3), 1121–1174, 2014.ZhangY.Bounded gaps between primesAnnals of Mathematics1793112111742014Search in Google Scholar
Pietro G.D., Numerical analysis approach to twin primes conjecture, Notes on Number Theory and Discrete Mathematics, 27(3), 175–183, 2021.PietroG.D.Numerical analysis approach to twin primes conjectureNotes on Number Theory and Discrete Mathematics2731751832021Search in Google Scholar
Villegas F.R., Experimental Number Theory, Oxford University Press, UK, 2007.VillegasF.R.Experimental Number TheoryOxford University PressUK2007Search in Google Scholar
Hamiss K., A simple algorithm for prime factorization and primality testing, Journal of Mathematics, 2022(ID:7034529), 1–10, 2022.HamissK.A simple algorithm for prime factorization and primality testingJournal of Mathematics2022(ID:7034529),1102022Search in Google Scholar
Hang P., Sun Z., Wang S., A pattern of prime numbers and its application in primality testing, Journal of Physics: Conference Series, 2381, 2022 6th International Conference on Mechanics, Mathematics and Applied Physics (ICMMAP 2022), 19–21 August 2022, Qingdao, China.HangP.SunZ.WangS.A pattern of prime numbers and its application in primality testingJournal of Physics: Conference Series, 2381, 2022 6th International Conference on Mechanics, Mathematics and Applied Physics (ICMMAP 2022)19–21 August 2022Qingdao, ChinaSearch in Google Scholar
Riesel H., Prime Numbers and Computer Methods for Factorization (2nd Ed.), Boston, MA: Birkhäuser, Switzerland, 2012.RieselH.Prime Numbers and Computer Methods for Factorization2nd Ed.Boston, MABirkhäuser, Switzerland2012Search in Google Scholar
Goudsmit S.A., Unusual prime number sequences, Nature, 214, 1164, 1967.GoudsmitS.A.Unusual prime number sequencesNature21411641967Search in Google Scholar
Engelsma T.J., k-tuple permissible patterns, http://www.pi-e.de/ktuplets.htm, Accessed: September 12, 2023.EngelsmaT.J.k-tuple permissible patternshttp://www.pi-e.de/ktuplets.htm, Accessed: September 12, 2023.Search in Google Scholar
Ericksen L., Primality Testing and Prime Constellations, Siauliai Mathematical Seminar, 3(11), 61–77, 2008.EricksenL.Primality Testing and Prime ConstellationsSiauliai Mathematical Seminar31161772008Search in Google Scholar
McEvoy M., Experimental mathematics, computers and the a priori, Synthese, 190, 397–412, 2013.McEvoyM.Experimental mathematics, computers and the a prioriSynthese1903974122013Search in Google Scholar
Experimental mathematics, https://en.wikipedia.org/wiki/Experimental_mathematics, Accessed: October 5, 2022.Experimental mathematicshttps://en.wikipedia.org/wiki/Experimental_mathematics, Accessed: October 5, 2022.Search in Google Scholar
Weisstein E., Twin primes, https://mathworld.wolfram.com/TwinPrimes.html, Accessed: September 12, 2023.WeissteinE.Twin primeshttps://mathworld.wolfram.com/TwinPrimes.html, Accessed: September 12, 2023.Search in Google Scholar
Goldston D.A., Pintz J., Yildirim C.Y., Primes in tuples I, Annals of Mathematics, 170(2), 819–862, 2009.GoldstonD.A.PintzJ.YildirimC.Y.Primes in tuples IAnnals of Mathematics17028198622009Search in Google Scholar
Goldston D.A., Pintz J., Yildirim C.Y., Primes in tuples II, Acta Mathematica, 204(1), 1–47, 2010.GoldstonD.A.PintzJ.YildirimC.Y.Primes in tuples IIActa Mathematica20411472010Search in Google Scholar
Rokne J., Some observations on prime pairs, quadruples and octuples, IEEE Canadian Review, 92, 8–11, 2023.RokneJ.Some observations on prime pairs, quadruples and octuplesIEEE Canadian Review928112023Search in Google Scholar
Sato N., Number Theory, https://artofproblemsolving.com/articles/files/SatoNT.pdf, Accessed: September 10, 2023.SatoN.Number Theoryhttps://artofproblemsolving.com/articles/files/SatoNT.pdf, Accessed: September 10, 2023.Search in Google Scholar