A sufficient condition for finiteness of Frobenius test exponents

Abstract

The Frobenius test exponent Fte(R) of a local ring (R,m) of prime characteristic p > 0 is the smallest e0 ∈ N such that for every ideal q generated by a (full) system of parameters, the Frobenius closure qF has (qF)[pe0] = q[pe0]. We establish a suffcient condition for Fte(R)<∞ and use it to show that if R is such that the Frobenius closure of the zero submodule in the lower local cohomology modules has finite colength, i.e. Hjm(R) / 0FHjm(R) is finite length for 0 j < (R), then Fte(R)<∞.