Thursday, November 17, 2022 | 4:30pm to 6pm
About this Event
182 Memorial Drive, Cambridge, MA 02142
http://www.northeastern.edu/tzhou/bhmn/colloquium.html #MIT MathSpeaker: Tamar Ziegler (Hebrew University)
Title: Sign patterns of the Mobius function
Abstract: important arithmetic functions. There is a vague yet well known principle regarding its randomness properties called the “Mobius randomness law". It basically states that the Mobius function should be orthogonal to any "structured" sequence. P. Sarnak suggested a far reaching conjecture as a possible formalization of this principle. He conjectured that "structured sequences" should correspond to sequences arising from deterministic dynamical systems. Sarnak’s conjecture follows from Chowla’s conjecture - which is the mobius version of the prime tuple conjecture. I will describe progress in recent years towards these conjectures, building on major advances in dynamics, additive combinatorics, and analytic number theory.