Nonexistence of generalized bent functions and the quadratic norm form equations

Abstract

We present a new result on the nonexistence of generalized bent functions (GBFs)from (Z/tZ)n to Z/tZ (called type [n, t]) for a large class. Assume p is an odd prime number. By showing certain quadratic norm form equations having no integral points, we obtain a universalresult on the nonexistence of GBFs with type [n,2pe] when p and n satisfy a certain inequality, and by computational methods with a widely accepted hypothesis, Generalized Riemann Hypothesis, we also achieve some results on the nonexistence of GBFs for relatively small p.