The J-invariant, Tits algebras and Triality

Abstract

In the present paper we set up a connection between the indices of the Tits algebras of a simple linear algebraic group G and the degree one parameters of its motivic J-invariant. Our main technical tool are the second Chern class map and Grothendieck's γ-filtration. As an application we recover some known results on the J-invariant of quadratic forms of small dimension; we describe all possible values of the J-invariant of an algebra with orthogonal involution up to degree 8 and give explicit examples; we establish several relations between the J-invariant of an algebra A with orthogonal involution and the J-invariant of the corresponding quadratic form over the function field of the Severi-Brauer variety of A.