Girja Shanker Tripathi
School of Mathematics, TIFR
September 15, 2011
Representing hermitian K-theory by orthogonal Grassmannian in $A^1$-homotopy theory: In this talk I will explain a joint work with Marco Schlichting on geometric representability of hermitian K-theory in the homotopy theory of schemes. After recalling some basic notions from the homotopy theory of schemes developed by Morel and Voevodsky, I will define an ind-scheme GrO, the orthogonal Grassmannian, and construct a map from GrO into hermitian K-theory KO. I will sketch a proof that this map is a homotopy equivalence and discuss some applications of the result.
School of Mathematics, TIFR
September 15, 2011
Representing hermitian K-theory by orthogonal Grassmannian in $A^1$-homotopy theory: In this talk I will explain a joint work with Marco Schlichting on geometric representability of hermitian K-theory in the homotopy theory of schemes. After recalling some basic notions from the homotopy theory of schemes developed by Morel and Voevodsky, I will define an ind-scheme GrO, the orthogonal Grassmannian, and construct a map from GrO into hermitian K-theory KO. I will sketch a proof that this map is a homotopy equivalence and discuss some applications of the result.