# Abstracts for AustMS2018

13 abstracts submitted for session.

Authors | Title | Session | Timetabled | Abstract |
---|---|---|---|---|

Dr Anand Rajendra Deopurkar | On the geometric Steinitz problem | Num Th | 2018-12-07 09:30:00 | Let L/K be a finite extension of ... |

Dr Min Sha | Carmichael polynomials over finite fields | Num Th | 2018-12-07 09:00:00 | Motivated by Carmichael numbers, we introduce Carmichael ... |

Dr Mumtaz Hussain | Measure theoretic laws in Diophantine approximation | Num Th | 2018-12-06 09:30:00 | In this talk, I will briefly discuss ... |

Dr Nicole Sutherland | The efficient computation of Splitting Fields using Galois groups | Num Th | 2018-12-06 09:00:00 | We consider the efficient computation of splitting ... |

Dr Thomas Morrill | Overpartitions | Num Th | 2018-12-05 16:30:00 | We give a brief introduction to these ... |

Dr Timothy Trudgian | Zeroes of the zeta-function: mind the gap! | Num Th | 2018-12-05 17:00:00 | Several open problems (with wine/cash prizes for ... |

Miss Ayreena Bakhtawar | On the growth of product of partial quotients | Num Th | 2018-12-05 15:30:00 | The metrical theory of continued fractions is ... |

Mr Marley Young | On multiplicative independence of rational function iterates | Num Th | 2018-12-05 17:30:00 | We give lower bounds for the degree ... |

Mr Matteo Bordignon | Explicit bounds on exceptional zeroes of Dirichlet L-functions | Num Th | 2018-12-04 16:00:00 | We aim to improve the upper bound ... |

Mr Philip Bos | Hausdorff Measure and Dirichlet Non-Improvable Numbers | Num Th | 2018-12-05 16:00:00 | Let $\Psi :[1,\infty )\rightarrow \mathbb{R}_{+}$ be a ... |

Ms Michaela Cully-Hugill | Square-free numbers in short intervals | Num Th | 2018-12-04 16:30:00 | The smallest theoretical interval length containing at ... |

Prof Florian Breuer | Heights and isogenies of Drinfeld modules | Num Th | 2018-12-04 15:30:00 | It is known that if two elliptic ... |

Prof Ole Warnaar | On modular Nekrasov--Okounkov formulas | Num Th | 2018-12-04 14:00:00 | The Nekrasov--Okounkov formula is a far-reaching generalisation ... |