Nonexistence of generalized bent functions and the quadratic norm form equations
نویسنده
چکیده
We obtain the nonexistence of generalized bent functions (GBFs) from (\ZZ/t\ZZ)^n to \ZZ/t\ZZ (called type [n,t]), for a large new class. Specifically, by showing certain quadratic norm form equations have no integral points, we obtain the universal nonexistence of GBFs with type [n, 2p^e] for all sufficiently large p with respect to n and (p-1)/\ord_2(p), and by computational methods with a well accepted hypothesis (generalized Riemann hypothesis), we also guarantee some nonexistence results for relative small prime p.
منابع مشابه
Nonexistence of Generalized Bent Functions From $Z_{2}^{n}$ to $Z_{m}$
Several nonexistence results on generalized bent functions f : Zn 2 → Zm presented by using some knowledge on cyclotomic number fields and their imaginary quadratic subfields.
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