Identifier
etd-04062017-175346
Degree
Doctor of Philosophy (PhD)
Department
Mathematics
Document Type
Dissertation
Abstract
Additive enumeration problems, such as counting the number of integer partitions, lie at the intersection of various branches of mathematics including combinatorics, number theory, and analysis. Extending partitions to integer unimodal sequences has also yielded interesting combinatorial results and asymptotic formulae, which form the subject of this thesis. Much like the important work of Hardy and Ramanujan proving the asymptotic formula for the partition function, Auluck and Wright gave similar formulas for unimodal sequences. Following the circle method of Wright, we provide the asymptotic expansion for unimodal sequences with odd parts. This is then generalized to a two-parameter family of mixed congruence relations, with parts on one side with parts on one side up to the peak satisfying r (mod m) and parts on the other side -r (mod m), and an asymptotic formula is provided. Techniques used in the proofs include Wright's circle method, modular transformations, and bounding of complex integrals.
Date
2017
Document Availability at the Time of Submission
Release the entire work immediately for access worldwide.
Recommended Citation
Frnka, Richard Alexander, "Asymptotic Formulae for Restricted Unimodal Sequences" (2017). LSU Doctoral Dissertations. 4460.
https://repository.lsu.edu/gradschool_dissertations/4460
Committee Chair
Mahlburg, Karl
DOI
10.31390/gradschool_dissertations.4460