The Lifting of Kloosterman Sums

We obtain an estimate for incomplete multiple Kloosterman sums modulo a prime which improves the previous result of W. Luo.

In this article, we obtain relations between two types of Kloosterman sums and corresponding ones for finite field extensions, using L-series and Euler product expansions. The methods used were first applied by A. Weil in his proof of the Davenport-Hasse relation for Gauss sums ([8, Chap. 11]), and

An upper bound for the extended Kloosterman sum over Galois rings is derived. This bound is then used to construct new sequence families with low correlation properties and alphabet size a power of a prime.

We give bounds for exponential sums associated to functions on curves defined over Galois rings. We first define summation subsets as the images of lifts of points from affine opens of the reduced curve, and give bounds for the degrees of their coordinate functions. Then we get bounds for exponentia