Aqeeb Sabree
Biography
In mathematics, a collection of functions on a set can be referenced as a function space. We construct a Hilbert function space by requiring the functions to satisfy certain properties. Knowledge derived from nature dictates infinite-dimensional Hilbert spaces. My research has applications in signal processing, physics, and machine learning, to mention a few. My research analyzes abstract Hilbert function spaces and their boundary representations; this leads to applications in physics, statistic, and probability theory.