Abstract: The "equivalence principle" says that meaningful statements in mathematics should be invariant under the appropriate notion of equivalence of the objects under consideration. In set-theoretic foundations, the EP is not enforced; e.g., the statement "1 ϵ Nat" is not invariant under isomorphism of sets. In univalent foundations, on the other hand, the equivalence principle has been proved for many mathematical structures. In this introductory talk, I give an overview of univalent foundations and the equivalence principle therein.
of anisotropy of an algebraic variety (that is, the absence of points of degree prime to a given p on it) plays an important role (most notably, in the theory of quadratic forms).
I will discuss main ideas and steps in the
proof of Milnor and Bloch-Kato Conjectures given by Voevodsky .
winner, and a faculty member at the Institute for Advanced Study, until his
sudden and unexpected death in 2017 at the age of 51. He had a special flair
for thinking creatively about ways to incorporate topology and homotopy theory
into other fields of mathematics. In this talk for a general audience, I will
sketch his seminal contributions to two broad areas, algebraic geometry and the
Abstract: In the univalent foundation formalism, equality makes sense only between objects of the same type, and is itself a type. We will explain that this is closer to mathematical practice than the Zermelo-Fraenkel notion of equality is.
Its importance for type theory cannot be overestimated: it is like the "induction principle" for arithmetic.
I will recall the homotopy interpretation of type theory and the notion of univalent fibration.
I will describe the connection between univalence and descent in higher toposes.