Self-dual codes with an automorphism of order 11 N Yankov, MH Lee, M Gürel, M Ivanova IEEE Transactions on Information Theory 61 (3), 1188-1193, 2015 | 21 | 2015 |

Classification of the binary self-dual [42, 21, 8] codes having an automorphism of order 3 S Bouyuklieva, N Yankov, R Russeva Finite Fields and Their Applications 13 (3), 605-615, 2007 | 21 | 2007 |

Binary self-dual codes of lengths 52 to 60 with an automorphism of order 7 or 13 N Yankov, R Russeva IEEE transactions on information theory 57 (11), 7498-7506, 2011 | 17 | 2011 |

Classification of binary self-dual [48, 24, 10] codes with an automorphism of odd prime order S Bouyuklieva, N Yankov, JL Kim Finite Fields and Their Applications 18 (6), 1104-1113, 2012 | 15 | 2012 |

A putative doubly even [72, 36, 16] code does not have an automorphism of order 9 N Yankov IEEE Transactions on Information Theory 58 (1), 159-163, 2011 | 15 | 2011 |

On binary self-dual codes of lengths 60, 62, 64 and 66 having an automorphism of order 9 R Russeva, N Yankov Designs, Codes and Cryptography 45 (3), 335-346, 2007 | 15 | 2007 |

On the structure of binary self-dual codes having an automorphism of order a square of an odd prime S Bouyuklieva, R Russeva, N Yankov IEEE transactions on information theory 51 (10), 3678-3686, 2005 | 15 | 2005 |

New extremal singly even self-dual codes of lengths 64 and 66 D Anev, M Harada, N Yankov Journal of Algebra Combinatorics Discrete Structures and Applications 5 (3), 2018 | 14* | 2018 |

New binary self-dual codes of lengths 50–60 N Yankov, MH Lee Designs, Codes and Cryptography 73 (3), 983-996, 2014 | 14 | 2014 |

Self-dual codes with an automorphism of order 7 and *s*-extremal codes of length 68N Yankov, M Ivanova, MH Lee Finite Fields and Their Applications 51, 17-30, 2018 | 13 | 2018 |

Self-dual codes with an automorphism of order 17 M Gürel, N Yankov Mathematical Communications 21 (1), 97-107, 2016 | 13 | 2016 |

Self-dual [62, 31, 12] and [64, 32, 12] codes with an automorphism of order 7 N Yankov Advances in Mathematics of Communications 8 (1), 73, 2014 | 12 | 2014 |

Classification of self-dual codes of length 50 with an automorphism of odd prime order N Yankov, MH Lee Designs, Codes and Cryptography 74 (3), 571-579, 2015 | 10 | 2015 |

On the classication of binary self dual [44, 22, 8] codes with an automorphism of order 3 or 7 S Bouyuklieva, N Yankov, R Russeva International Journal of Information and Coding Theory 2 (1), 21-37, 2011 | 9 | 2011 |

On the classification of binary self dual [44, 22, 8] codes with an automorphism of order 3 or 7 S Bouyuklieva, N Yankov, R Russeva International Journal of Information and Coding Theory 2 (1), 21-37, 2011 | 9 | 2011 |

On the classification of binary self-dual [44, 22, 8] codes with an automorphism of order 3 S Bouyuklieva, R Russeva, N Yankov, N Ziapkov, M Nikolova Proceedings of the International Workshop OCRT, Varna, 32-37, 2009 | 9 | 2009 |

On the extremal binary codes of lengths 36 and 38 with automorphism of order 5 N Yorgov, V. Y. and Yankov Proceedings of Fifth Internatinal Workshop on Algebraic and Combinatorial …, 1996 | 8* | 1996 |

On the self-dual codes with an automorphism of order 5 N Yankov, D Anev Applicable Algebra in Engineering, Communication and Computing, 1-15, 2019 | 7 | 2019 |

Self-dual codes with an automorphism of order 13 N Yankov, D Anev, M Gürel Advances in Mathematics of Communications 11 (3), 635, 2017 | 6 | 2017 |

New optimal [52, 26, 10] self-dual codes N Yankov Designs, codes and cryptography 69 (2), 151-159, 2013 | 5 | 2013 |