| Structure of random 312‐avoiding permutations N Madras, L Pehlivan Random Structures & Algorithms 49 (3), 599-631, 2016 | 32 | 2016 |
| Large deviations for permutations avoiding monotone patterns N Madras, L Pehlivan arXiv preprint arXiv:1606.07906, 2016 | 12 | 2016 |
| On the number of representations of a positive integer as a sum of two binary quadratic forms Ş Alaca, L Pehlivan, KS Williams International Journal of Number Theory 10 (06), 1395-1420, 2014 | 6 | 2014 |
| (k, l)-UNIVERSALITY OF TERNARY QUADRATIC FORMS ax2 + by2 + cz2. L Pehlivan, KS Williams Integers: Electronic Journal of Combinatorial Number Theory 18, 2018 | 4 | 2018 |
| No feedback card guessing for top to random shuffles L Pehlivan arXiv preprint arXiv:1006.1321, 2010 | 4 | 2010 |
| On top to random shuffles, no feedback card guessing, and fixed points of permutations L Pehlivan University of Southern California, 2009 | 4* | 2009 |
| Analysis of Calculus Textbook Problems via Bloom's Taxonomy F Alayont, G Karaali, L Pehlivan PRIMUS 33 (3), 203-218, 2023 | 3 | 2023 |
| Positive integers represented by regular primitive positive-definite integral ternary quadratic forms G Doyle, JB Muskat, L Pehlivan, KS Williams Integers 19, A45, 2019 | 3 | 2019 |
| REPRESENTATION NUMBERS OF SPINOR REGULAR TERNARY QUADRATIC FORMS. ZS Aygin, G Doyle, F Münkel, L Pehlivan, KS Williams Integers: Electronic Journal of Combinatorial Number Theory 21, 2021 | 2 | 2021 |
| The power series expansion of certain infinite products qr∏ n= 1∞(1− qn) a 1 (1− q 2 n) a 2⋯(1− qmn) am q^rn=1^∞(1-q^n)^a_1(1-q^2n)^a_2⋯(1-q^mn)^a_m L Pehlivan, KS Williams The Ramanujan Journal 33, 23-53, 2014 | 2 | 2014 |
| Some product-to-sum identities S Alaca, L Pehlivan, KS Williams J. Comb. Number Theory 4, 35-52, 2012 | 1 | 2012 |
| What Does It Take to Teach Nonmajors Effectively? F Alayont, G Karaali, L Pehlivan | 1 | 2012 |
| Infinite product representations of some q-series F Münkel, L Pehlivan, KS Williams The Ramanujan Journal 63 (3), 839-872, 2024 | | 2024 |
| ARITHMETIC PROPERTIES OF THE TERNARY QUADRATIC FORM 3x²+ 6y²+ 14z²+ 4yz+ 2zx+ 2xy. F Münkel, L Pehlivan, KS Williams Integers: Electronic Journal of Combinatorial Number Theory 22, 2022 | | 2022 |
| Positive-Definite Ternary Quadratic Forms Which are (4, 1)-universal and (4, 3)-universal. L Pehlivan, KS Williams Integers 18, A92, 2018 | | 2018 |
| Some new evaluations of the Legendre symbol L Pehlivan, KS Williams Acta Arithmetica 170, 361-380, 2015 | | 2015 |
| Analysis of calculus textbook problems via Bloom's taxonomy L Pehlivan, G Karaali Taylor & Francis Inc., 0 | | |
