Artur Avila Google Scholar !!top!! Jun 2026
Searching for is not merely an exercise in counting citations. It is a journey through the bleeding edge of mathematical physics. His profile serves three distinct audiences:
Google Scholar allows you to click the "Cited by" link next to any of Avila’s papers. If you are writing a thesis on dynamical systems, clicking "Cited by" on a 2009 Avila paper will instantly show you every subsequent paper that used that result. This is the fastest way to conduct a literature review.
: Co-authored with Sébastien Gouëzel and Jean-Christophe Yoccoz, addressing the statistical properties of complex geometric flows. Career Overview artur avila google scholar
: Beyond the Fields Medal, he has received the Salem Prize (2006), the EMS Prize (2008), and the TWAS Prize (2013).
For graduate students or early-career mathematicians, using is a masterclass in research strategy. Here is why his profile is a valuable educational tool: Searching for is not merely an exercise in
His most cited works, according to Google Scholar, reveal the pillars of his research:
As of 2025, Artur Avila’s Google Scholar metrics are staggering by any mathematical standard: If you are writing a thesis on dynamical
Analyzing the "Cited by" column in offers a fascinating insight into which of his contributions the scientific community finds most valuable. His most cited paper, often hovering around 400+ citations, deals with Schrödinger operators and the KAM (Kolmogorov–Arnold–Moser) theory .
Scrolling through Avila’s profile, one immediately notices the diversity of the journals. You will find his work in the Annals of Mathematics (one of the most selective journals in the world), Inventiones Mathematicae , and Communications in Mathematical Physics .
Artur Avila is a name that resonates with a unique gravity in the mathematical community. As the first Latin American to win the prestigious Fields Medal (often described as the Nobel Prize for mathematics) in 2014, Avila has redefined entire subfields of dynamical systems and spectral theory. But for the modern researcher, the most efficient way to trace the arc of his genius is through his digital footprint—specifically, his profile.
