When it comes to impressive contributions in the field of mathematics, one name that stands out today is that of Professor Michael Lacey. His groundbreaking work began during his days working for his PhD at University of Illinois at Urbana-Champaign when he did his thesis on Banach Spaces. Read more: Michael Lacey | Wikipedia and Michael Lacey |Math Alliance
This led to Lacey solving one of the problems pertaining to the law of the iterated logarithm. The logarithm is a probability theory regarding the magnitude of fluctuations of a random walk.
Following his graduation, Lacey obtained a teaching position at Louisiana State University, before moving on to North Carolina-Chapel Hill. While there, Lacey teamed up again with Walter Philipp, who oversaw Lacey’s thesis in Illinois. The pair presented their proof of the central limit theorem, which deals with independent random variables in probability theory. Learn more about Michael Lacey: https://www.math.gatech.edu/people/michael-lacey and https://www.genealogy.math.ndsu.nodak.edu/id.php?id=62509
Lacey’s next stop was Indiana University, where he received a National Science Foundation postdoctoral fellowship. He also studied the bilinear Hilbert transform, which takes the function of a real variable and produces another function of a real variable.
The transform was conjecture until 1996 when Lacey and another colleague, Christoph Thiele, solved it. They were both awarded the Salem Prize for outstanding work in mathematics for this accomplishment.
Lacey took a job as professor of mathematics at the Georgia Institute of Technology in 1996, and has been employed by the school ever since.
He is a member of the American Mathematical Society, and is also a Guggenheim Fellow. His hard work and numerous accomplishments have earned Michael Lacey a reputation among his peers as the greatest mathematician of the present day.