Computer encryption are based mostly on primes, which are also vital for communications. The aim of this paper is to present a new explicit strategy for creating all primes and Poulet numbers in order up to a certain number by using the Fermats little theorem. For this purpose, we construct a set C of odd composite numbers and transform Fermats little theorem from primality test of a number to a generating set Q of odd primes and Poulet numbers. The set Q is sieved to separate the odd primes and the Poulet numbers. By this method, we can obtain all primes and Poulet numbers in order up to a certain number. Also, we obtain a closed form expression which precisely gives the number of primes up to a specific number. The pseudo-code of the proposed method is presented

Elhakeem Abd Elnaby, Abd

H. El-Baz, A.

English

Arab Journals Platform

Information Sciences Letters Volume 11 Issue 4 Jul. 2022 Article 30 2022 A Novel Algorithmic Approach using Little Theorem of Fermat For Generating Primes and Poulet Numbers in Order Abd Elhakeem Abd Elnaby Department of Mathematics, Faculty of Science, Damietta University, New Damietta, Egypt, hakeem97@hotmail.com A. H. El-Baz Department of Computer Science, Faculty of Computers and Artificial Intelligence, Damietta University, New Damietta, Egypt, elbaz@du.edu.eg Follow this and additional works at: https://digitalcommons.aaru.edu.jo/isl Recommended Citation Elhakeem Abd Elnaby, Abd and H. El-Baz, A. (2022) "A Novel Algorithmic Approach using Little Theorem of Fermat For Generating Primes and Poulet Numbers in Order," Information Sciences Letters: Vol. 11 : Iss. 4 , PP -. Available at: https://digitalcommons.aaru.edu.jo/isl/vol11/iss4/30 This Article is brought to you for free and open access by Arab Journals Platform. It has been accepted for inclusion in Information Sciences Letters by an authorized editor. The journal is hosted on Digital Commons, an Elsevier platform. For more information, please contact rakan@aaru.edu.jo, marah@aaru.edu.jo, u.murad@aaru.edu.jo. *Corresponding author e-mail: elbaz@du.edu.eg  © 2022 NSP Natural Sciences Publishing Cor.                                                                                                                                                           http://dx.doi.org/10.18576/isl/110430   A Novel Algorithmic Approach using Little Theorem of Fermat  For Generating Primes and Poulet Numbers in Order  Abd Elhakeem Abd Elnaby1 and A. H. El-Baz 2,*  1Department of Mathematics, Faculty of Science, Damietta University, New Damietta, Egypt 2Department of Computer Science, Faculty of Computers and Artificial Intelligence, Damietta University, New Damietta, Egypt  Received: 2 Feb. 2022, Revised: 22 Mar. 2022, Accepted: 26 May 2022 Published online:1 Jul. 2022. Abstract: Computer encryption are based mostly on primes, which are also vital for communications. The aim of this paper is to present a new explicit strategy for creating all primes and Poulet numbers in order up to a certain number by using the Fermat's little theorem. For this purpose, we construct a set C of odd composite numbers and transform Fermat's little theorem from primality test of a number to a generating set Q of odd primes and Poulet numbers. The set Q is sieved to separate the odd primes and the Poulet numbers.  By this method, we can obtain all primes and Poulet numbers in order up to a certain number. Also, we obtain a closed form expression which precisely gives the number of primes up to a specific number. The pseudo-code of the proposed method is presented.  Keywords: Primes, Poulet numbers, Cryptography, Algorithms.   1 Introduction  In today's society, with the rapid progress of computers, number theory will make more prominent long strides in the future. As a principal direction, number theory spreads extraordinary impacts on other disciplines, and it is the basis of many directions. Primes are viewed as one of the primary intriguing subjects with regards to number theory and they have various applications in different disciplines e.g., cryptography [1]. Two integers c and d are congruent modulo n, written if n divides c-d, or equivalently, if. In a congruence , the number  is called the modulus,  [2]. Little theorem of Fermat states that if is a prime and  is any integer not divisible by then  is divisible by [2]. A Poulet number is a composite odd number  such that  A composite number n∈N satisfying the congruence is called pseudoprime number (to base 2). Also, Poulet numbers are specific kinds of Fermat pseudoprime numbers themselves, namely to the base 2. It is clear from little theorem of Fermat and definition of a Poulet number that if  is an odd integer greater than one and  is divisible by , then  is either an odd prime or a Poulet number.   In this article, we use Fermat's little theorem and definition of the Poulet number in order to construct a set which contains the odd primes and the Poulet numbers up to a certain number , where represents the largest number in the set  Generating primes by using sieving methods is a fundamental topic in number theory. Also, we use the intersection and difference operations defined on the sets to sieve the primes and the Poulet numbers. Furthermore, we determine an explicit closed form mathematical expression which exactly gives the number of primes up to a certain number  For the best of our knowledge, that is the second exact formula given in literature where the first one was given in [3].   Algorithms sieves of Eratosthenes and Sundaram are algorithms that used to delete composite numbers from a set of numbers that exist, these processes are quite good as algorithms that could be applied to different processes of cryptographic algorithms [4, 5]. Jo and Park [6] used GCD primality test to generate primes for mobile smart devices. Konigsberg [7] generated primes and twin primes using the divisibility properties of binomial expressions. Little (mod )c d nºsomemultipleofd c n= + modnn 2n ³p d,p 1 1pd - -p n( )12 1 mod .n n- º( )12 1 modn n- ºiq12 1 --iq iq iqQmq mq QÎ.Q.mq QÎInf. Sci. Lett. 11, No. 4, 1325-1328 (2022)  Information Sciences Letters An International Journal 1326                                                                     A. E. Abd Elnaby, A. H. El-Baz.: A novel Algorithmic approach using …   © 2022 NSP Natural Sciences Publishing Cor.   theorem of Fermat is used for primality test of a number in Tarafder and Chakroborty [8]. Sah et al [9]  studied the different proofs for little theorem of  Fermat and applications implicated through the 17th -21th centuries.  The article is coordinated as follows: the suggested  new  technique for creating the primes and the Poulet numbers in order up to a certain number introduces in section 2. The Pseudocode for the suggested method is presented in  section 3.  Section 4 concludes the study.   2 A New Technique for Creating the Primes and the Poulet Numbers  Fermat's little theorem is used to generate the primes and the Poulet numbers in order up to a certain number. The suggested method is composed of the following steps: The first step: Let be the set of the odd primes and the Poulet numbers up to where  is the  largest number generated in   The second step: Create the set , where  And , where  is the Cardinality and  is the floor function.   If , we obtain   then stop generating the set Ci. The third step: Let  and whereis the set of Poulet numbers up to . The fourth step: Let  be the set of primes up to ,  then . Moreover, we can determine the number of primes up to a certain number  by using the following formula . The previous method can be transformed to the next theorem. Theorem Consider the set Let  and be sets of the primes, the odd primes and the Poulet numbers, respectively up to a certain  number where is the largest number generated in  If   Then and  where   denotes the cardinality and  is the floor function. Proof: According to Fermat's little theorem and definition of a Poulet number, then the set as stated can be written as follows                                                                   (1.1)  Assume that Ci and C are as stated and by using [3], C can be written as follows .            (1.2)   From definition of  a Poulet number and C, it is clear that                                       (1.3)                                                                                                     Also, from definition of a Poulet number and a prime, it is  clear that                                                (1.4)                                                                                                               This implies that equation (1.1) gives                                                            (1.5) Since  and  are sets of the primes and the odd primes, respectively, then Q,mq QÎ mq,Q12 1:  is a positive integer, j 1, 2, 3, ...,m .jjjqQ qq- -= =ì üï ïí ýï ïî þC i( )( )( )( )( )22 12 1 2 2 1 : 0,1,2,...,2 2 1mi i iq iC i i n niì üê ú- +ï ïê ú= + + + =í ýê ú+ï ïê úë ûî þ, 1,2,3,..., .i k=( )( )22 112 2 1miq iCi- += ++ê úê úê úë û..ê úë û1i k= + ( )( )22 102 2 1mq ii- +<+ê úê úê úë û1kiiC C== ! ( ) ,qmT Q C= !)( mqT mqP mq QÎ{ } ( )( )2 mqP Q T= -!mq( )1 qmP Q T= + -12 1:  is a positive integer, j 1, 2, 3, ...,m .jjjqQ qq- -= =ì üï ïí ýï ïî þ,P( )mqP ( )mqT,mq mq .Q,1kC Cii==!( )( )( )( )( )22 12 1 2 2 1 : 0,1,2,...,2 2 1mi i iq iC i i n niì üê ú- +ï ïê ú= + + + =í ýê ú+ï ïê úë ûî þ, 1,2,3,..., .i k={ } { } ( )( ) ( )2 2m mq qP P Q T= = -! ! P = 1 Q+ -( )mqT . .ê úë ûQ( ) ( )m mq qQ P T= !{ }9 : is an odd composite numberC c q cm= £ £,Q( ) .qmT Q C= !( ) ( ) .m mq qP T j=!( ) ( ) .m mq qP Q T= -P ( )mqPInf. Sci. Lett. 11, No. 4, 1325-1328 (2022) / http://www.naturalspublishing.com/Journals.asp  1327  © 2022 NSP Natural Sciences Publishing Cor.                              (1.6) Therefore, the first demand is proved. Since , then (1.6) gives                                                                                                       (1.7)                                                                             Since ,                                                            then  .    (1.8)  By substituting from (1.8) in (1.7), we obtain                                                        (1.9)                                                                                                  Therefore, the second demand is proved and hence the proof is completed.                                                                                              { } { } ( )( ) ( )2 2 .m mq qP P Q T= = -! !{ }( ) 2 .mqP j=!{ } ( ) ( )2 1q qm mP P Q T= + = + -( ) ( )( ) ( ) ( ) ( )andm m m mq q q qQ Q T T Q T T j= - - =! "( ) ( ) ( ) ( )m m m mq q q qQ Q T T Q T Q T= - + Þ - = -( )1 .mqP Q T= + -3 Pseudocode for the Suggested Method  The next algorithm gives our suggested strategy for producing primes and Poulet numbers in order.  Algorithm: The suggested strategy for producing primes and Poulet numbers in order 1: function Prime_Poulet(m)       2:     for n from 3 by 2 to m do 3:           4:               if q is integer then 5:                  i ← i+1  6:                  7:              end if  8:     end do 9:                                             ▷  is the limit up to which primes and Poulet                                                                                            numbers are generated 10:   k ← 1 11:   i ← 0 12:    while k > 0 do 13:          i ← i+1 14:          15:     end do  16:     k ←i 17:     for i from 1 to k do 18:            19:                for n from 0 to d do 20:                    x[n+1] ← (2i+1)(2i+2n+1) 21                 end do  22:          C ← x                                               ▷ save the generated elements x in vector C 23:          x ← [ ] 24:     end do 25:                                      ▷ Poulet is the set of Poulet numbers 26:                                         ▷ P is the set of primes 27: end function  12 1nqn- -¬[ ]Q i n¬max( )qm Q¬ qm( )( )22 12 2 1qm iki- +¬+ê úê úê úë û( )( )22 12 2 1qm idi- +¬+ê úê úê úë ûPoulet Q C¬ ÇPouletp Q¬ -1328                                                                     A. E. Abd Elnaby, A. H. El-Baz.: A novel Algorithmic approach using …   © 2022 NSP Natural Sciences Publishing Cor.   4 Conclusions An original precise procedure for creating the primes and poulet numbers is proposed which has numerous applications in many disciplines especially cryptography. This strategy relies upon the Fermat's little theorem. It tends to be utilized to produce all primes and poulet numbers up to a specific number. Additionally, a closed form expression which accurately decides the quantity of primes up to a specific number is given. Acknowledgment  This work was supported by the Academy of Scientific Research and Technology (ASRT), Egypt, under Grant 6499. Competing interests: The authors declare that they have no competing interests.  References   [1] D. R. Stinson. Cryptography: Theory and Practice. 4th Edition, CRC Press, (2019).  [2] A. Granville. Number theory revealed: A master class. American Mathematical Society, (2020). [3] A. E. H.  Abd Elnaby and A. H. El-Baz, A new explicit algorithmic method for generating the prime numbers in order, Egyptian informatics journal., 22, 101-104 (2021). [4] M. E. O’Neill, The Genuine Sieve of Eratosthenes, J. of Functional Programming, 19, 95-106 (2009). [5] M. Lambert, Calculating the Sieve of Eratosthenes, J. of Functional Programming, 14, 759-763 (2004). [6]  H. Jo and H. Park, Fast prime generation algorithms using proposed GCD test on mobile smart devices, IEEE International Conference on Big Data and Smart Computing (BigComp), 18-20 Jan., 374-377, Hong Kong, China,  (2016). [7] Z. R. Konigsberg, Primes and Twin Primes Generator Algorithms, IEEE Proceedings of the Multiconference on "Computational Engineering in Systems Applications", 4-6 Oct., 1-4, Beijing, China, (2006). [8] A. K. Tarafder and T. Chakroborty, A comparative analysis of general sieve-of Eratosthenes and Rabin-Miller approach for prime number generation, IEEE international conference on electrical, computer and communication engineering (ECCE), 1- 4, Cox'sBazar, Bangladesh, (2019). [9] R. P. Sah, U. N. Roy, A. K. Sah and S. K. Sourabh, Early proofs of Fermat's little theorem and applications, IJMTT, 64, 2, 74-79 (2018).             

A Novel Algorithmic Approach using Little Theorem of Fermat For Generating Primes and Poulet Numbers in Order

https://digitalcommons.aaru.edu.jo/cgi/viewcontent.cgi?article=1416&context=isl

A Novel Algorithmic Approach using Little Theorem of Fermat For Generating Primes and Poulet Numbers in Order

Abstract

Similar works

Full text

Available Versions

Arab Journals Platform