Michael Lacey is a prominent American mathematician whose name is known around the globe. He currently holds a tenured position at the Georgia Institute of technology. Here, he is the lead for linear algebra and calculus. He is who mentor students pursuing their doctoral degrees. He also helps pre-doctoral students work on their research question prior to writing their dissertations.
In 2004, he was the recipient of the prestigious Guggenheim Fellowship grant. These grants are meant to be given to advance professionals who are currently halfway through their careers. It is given to those who have been productive already and show great promise for the future. Those who have received Guggenheim fellowships include Nobel laureates, Pulitzer Prize winners, and other prestigious awards. Every year, the Guggenheim Fellowship receives over 4000 applications for only 200 people receive awards. Michael Lacey was one of those people. He is to use this money to free up his time in order to continue working on his passion.
Michael Lacey has also been recognized by the Simon foundation. In the year 2012, he was awarded a fellowship with the American mathematical Society.
It was clear during his time mentoring underneath Walter Philip the Michael Lacey would become a wonderful addition to the world of mathematics. He and Walter Philip were essential improving the central limit theorem. Sense then, he has published several different papers that have appeared in peer-reviewed journals concerning that theorem.
During his time getting his PhD, Michael Lacey worked with Walter Philip in the area of Banach Spaces. By doing so, he was able to solve a worldwide problem concerning the empirical characteristic functions of the law of integrated logarithms.
Lacey’s first job upon graduation was a position at the State University of Louisiana. After working here for just a year he will move on to North Carolina where he would teach at Chapel Hill. During this time he continued his postdoctoral work with Walter Philip as the to publish cutting edge theorems.