Abstract :
In the paper, via the singular Riemann–Roch theorem, it is proved that the class of the eth Frobenius power can be described using the class of the canonical module ωA for a normal local ring A of positive characteristic. As a corollary, we prove that the coefficient β(I,M) of the second term of the Hilbert–Kunz function ℓA(M/I[pe]M) of e vanishes if A is a -Gorenstein ring and M is a finitely generated A-module of finite projective dimension.
For a normal algebraic variety X over a perfect field of positive characteristic, it is proved that the first Chern class of the eth Frobenius power can be described using the canonical divisor KX.
