Staff Member

Mrs. Faye Jackson

Lecturer Occupational Therapy

Profile AI

Faye Jackson is a mathematician whose work centers on combinatorics and number theory, with a particular emphasis on integer partitions and their structural properties. Her research explores subtle distribution patterns within partitions, especially biases across congruence classes, contributing to a deeper understanding of arithmetic behavior in discrete systems.

Her publications highlight sustained investigation into k-indivisible and k-regular partitions, revealing unexpected asymmetries and refining theoretical frameworks around partition statistics. Additional work extends into discrete geometry, algebraic structures such as semirings, and random matrix theory, demonstrating a breadth that connects combinatorial methods with spectral analysis and geometric problems.

Jackson’s contributions are marked by careful analytical techniques and a focus on uncovering hidden regularities in seemingly uniform systems. Her research strengthens links between classical partition theory and modern combinatorial questions, offering insights that are relevant across multiple areas of pure mathematics.

Latest publications

Most recent scholarly works and contributions.

Loading publications…