Newton polygons of \(L\)-functions of polynomials of the form \(X^{d}+\lambda X\).
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Publication:1867480
DOI10.1016/S1071-5797(02)00006-0zbMath1116.14304OpenAlexW1974166358MaRDI QIDQ1867480
Publication date: 2 April 2003
Published in: Finite Fields and their Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/s1071-5797(02)00006-0
Polynomials over finite fields (11T06) Zeta functions and related questions in algebraic geometry (e.g., Birch-Swinnerton-Dyer conjecture) (14G10)
Related Items (11)
On the Newton polygons of twisted \(L\)-functions of binomials ⋮ $L$-functions of twisted diagonal exponential sums over finite fields ⋮ Newton polygons of \(L\)-functions of polynomials \(x^d + a x^{d - 1}\) with \(p \equiv -1 \bmod d\) ⋮ Newton polygons of \(L\) functions of polynomials \(x^{d}+ax\) ⋮ Newton polygon of \(L\) function of \(x^d + \lambda x^{d -1} + \mu x \) ⋮ Exponential sums over finite fields ⋮ On exponential sums of \(x^d+\lambda x^e\) with \(p\equiv e\pmod d\) ⋮ On a conjecture of Wan about limiting Newton polygons ⋮ Generic twisted \(T\)-adic exponential sums of binomials ⋮ Generic \(A\)-family of exponential sums ⋮ L-functions of symmetric powers of cubic exponential sums
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