| The Congruencex1x2≡ x3x4 (modp), the Equationx1x2≡ x3x4, and Mean Values of Character Sums A Ayyad, T Cochrane, Z Zheng journal of number theory 59 (2), 398-413, 1996 | 87 | 1996 |
| The Congruencex1x2≡ x3x4 (modp), the Equationx1x2≡ x3x4, and Mean Values of Character Sums A Ayyad, T Cochrane, Z Zheng journal of number theory 59 (2), 398-413, 1996 | 87 | 1996 |
| Lattices in Z2 and the congruence xy+ uv≡ c (mod m) A Ayyad, T Cochrane Acta Arith 132, 127-133, 2008 | 10 | 2008 |
| The distribution of solutions of the congruence 𝑥₁𝑥₂𝑥₃… 𝑥_ {𝑛}≡ 𝑐 (\mod𝑝) A Ayyad Proceedings of the American Mathematical Society 127 (4), 943-950, 1999 | 8* | 1999 |
| THE CONGRUENCE ax1x2··· xk+ bxk··· x2k≡ c (mod p) A Ayyad, T Cochrane AMERICAN MATHEMATICAL SOCIETY 145 (2), 467-477, 2017 | 6 | 2017 |
| MODULAR HYPERBOLAS AND THE CONGRUENCE ax1x2 · · · xk + bxk+1xk+2 · · · x2k ≡ c (mod m). A Ayyad, T Cochrane, S Shi Integers: Electronic Journal of Combinatorial Number Theory 18, 2018 | 2 | 2018 |
| MODULAR HYPERBOLAS AND THE CONGRUENCE A Ayyad, T Cochrane, S Shi INTEGERS 18, 2, 2018 | | 2018 |
| School of Mathematics, Hefei University of Technology, Hefei, PR China vera123 99@ hotmail. com A Ayyad, T Cochrane, S Shi INTEGERS 18, 2, 2018 | | 2018 |
| The congruence 𝑎𝑥₁𝑥₂⋯ 𝑥_ {𝑘}+ 𝑏𝑥_ {𝑘+ 1} 𝑥_ {𝑘+ 2}⋯ 𝑥_ {2𝑘}≡ 𝑐 (mod 𝑝) A Ayyad, T Cochrane Proceedings of the American Mathematical Society 145 (2), 467-477, 2017 | | 2017 |
| On the congruence ax-by equivalent to c (mod p) and the finite field Z (p) A Ayyad NOTES ON NUMBER THEORY AND DISCRETE MATHEMATICS 22 (1), 29-32, 2016 | | 2016 |
| • ON THE PERFECT NUMBERS AND THEIR ALGEBRAIC MEANING A Ayyad International Research Journal of Pure Algebra ISSN: 2248-9037 4 (3), 2014 | | 2014 |
| The distribution of solutions of the multiplicative congruence x (, 1) x (, 2) x (, 3)... x (, n) equivalent to (mod p) AA Ayyad Kansas State University, 1997 | | 1997 |
| article no. 0108 A Adelberg, HPK Adongo, M Amou, A Ayyad, JA Buchmann, T Cochrane, ... journal of number theory 59, 420, 1996 | | 1996 |
| On the congruence ax− by≡ c (mod p) and the finite field Zp A Ayyad | | |
| We may also view B and V as subsets of F%. Solutions of (1) with some,= 0 (mod p) A AYYAD, T COCHRANE, Z ZHENG | | |
| THE CONGRUENCE cclzrg E $3134 (mod p), THE EQUATION A AYYAD, T COGHRANE, Z ZHENG | | |
| An investigation of Kaprekar operation on six-digit numbers computational approach A Ayyad GENERAL MATHEMATICS, 23, 0 | | |
| THE CONGRUENCE хгх2= хгхА (mod р), THE EQUATION Ж1ж2= Ж3Ж4 AND MEAN VALUES OF CHARACTER SUMS A Ayyad, T Cochrane, Z Zheng | | |
