PhD Research (University of Florida)
My research is centered primarily in the area of geometric graph theory. We consider the embeddings of graphs in different dimensions and define a function that measures the “spread” of the graph over all embeddings of the graph. I am still in the early stages of my work, however, some progress have been made. Currently, I focus on finding the value of the function across all embeddings of various graphs.
Master’s Thesis (Marshall University – 2021)
Area of research: Graph Decompositions
Title: On Hamilton Cycle Decompositions of Complete Multipartite Graphs Which Are Both Cyclic and Symmetric
Research Papers
- On cyclic symmetric Hamilton cycle decompositions of complete multipartite graphs. With Michael W. Schroeder. Discrete Mathematics, Volume 348 (1), 2025, 114277.
[Publisher Link] - Optimizing the Role of ICT and Educational Innovation in the Digital Era: Challenges and Opportunities. With Sri Rizki and Liza Puspita Yanti. Proceeding of International Seminar On Student Research In Education, Science, and Technology, Volume 1, 2024, Pages 661-679.
[Publisher Link] - Pattern Popularity in Gamma-one Non Deranged Permutations: An Algebraic and Algorithmic Approach. With Ibrahim Hassan Abdulkarim, Olalekan Aremu Kazeem and Stephen Buoro. Anale. Seria Informatică, 2017, Volume 15 (2), Pages 115-122.
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