The proof of the Kontsevich periodicity conjecture on noncommutative birational transformations

Abstract

For an arbitrary associative unital ring R, let J1 and J2 be the following noncommutative birational partly defined involutions on the set M3(R) of 3× 3 matrices over R: J1(M)=M-1 (the usual matrix inverse) and J2(M)jk=(Mkj)-1\, (the transpose of the Hadamard inverse). We prove the following surprising conjecture by Kontsevich saying that (J2 J1)3 is the identity map modulo the DiagL × DiagR action (D1,D2)(M)=D1-1MD2 of pairs of invertible diagonal matrices. That is, we show that for each M in the domain where (J2 J1)3 is defined, there are invertible diagonal 3× 3 matrices D1=D1(M) and D2=D2(M) such that (J2 J1)3(M)=D1-1MD2.