Multiple Lucas–Dirichlet Series Associated With Additive and Dirichlet Characters

We study a double Dirichlet series of the form [Formula: see text], where [Formula: see text] and [Formula: see text] are quadratic Dirichlet characters with prime conductors [Formula: see text] and [Formula: see text] respectively. A functional equation group isomorphic to the dihedral group of order 6 continues the function meromorphically to [Formula: see text]. The developed theory is used to prove an upper bound for the smallest positive integer [Formula: see text] such that [Formula: see text] does not vanish. Additionally, a convexity bound at the central point is established to be [Formula: see text] and a subconvexity bound of [Formula: see text] is proven. An application of bounds at the central point to the non-vanishing problem is also discussed.

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Dirichlet series expansions of p-adic L-functions

Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg ◽

10.1007/s12188-021-00244-0 ◽

2021 ◽

Author(s):

Heiko Knospe ◽

Lawrence C. Washington

Keyword(s):

Dirichlet Series ◽

Series Expansion ◽

Regularization Parameter ◽

Complex Case ◽

Alternative Proof ◽

Series Expansions ◽

Bernoulli Distribution ◽

Natural Manner ◽

Limiting Behavior ◽

Dirichlet Characters

AbstractWe study p-adic L-functions $$L_p(s,\chi )$$ L p ( s , χ ) for Dirichlet characters $$\chi $$ χ . We show that $$L_p(s,\chi )$$ L p ( s , χ ) has a Dirichlet series expansion for each regularization parameter c that is prime to p and the conductor of $$\chi $$ χ . The expansion is proved by transforming a known formula for p-adic L-functions and by controlling the limiting behavior. A finite number of Euler factors can be factored off in a natural manner from the p-adic Dirichlet series. We also provide an alternative proof of the expansion using p-adic measures and give an explicit formula for the values of the regularized Bernoulli distribution. The result is particularly simple for $$c=2$$ c = 2 , where we obtain a Dirichlet series expansion that is similar to the complex case.

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SPECIAL VALUES OF THE POLYGAMMA FUNCTIONS

International Journal of Number Theory ◽

10.1142/s1793042109002079 ◽

2009 ◽

Vol 05 (02) ◽

pp. 257-270 ◽

Cited By ~ 9

Author(s):

M. RAM MURTY ◽

N. SARADHA

Keyword(s):

Natural Number ◽

Dirichlet Series ◽

Linear Independence ◽

Polygamma Function ◽

Special Values ◽

Polygamma Functions ◽

Dirichlet Characters ◽

Special Value

Let q be a natural number and [Formula: see text]. We consider the Dirichlet series ∑n ≥ 1 f(n)/ns and relate its value when s is a natural number, to the special values of the polygamma function. For certain types of functions f, we evaluate the special value explicitly and use this to study linear independence over ℚ of L(k,χ) as χ ranges over Dirichlet characters mod q which have the same parity as k.

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On Dirichlet Series Attached to Holomorphic Cusp Forms on $SO(2, q)$

Automorphic Forms and Number Theory ◽

10.2969/aspm/00710333 ◽

2018 ◽

Cited By ~ 3

Author(s):

Takashi Sugano

Keyword(s):

Dirichlet Series ◽

Cusp Forms ◽

Holomorphic Cusp Forms

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Cancellation in algebraic twisted sums on GL_ m

Forum Mathematicum ◽

10.1515/forum-2020-0252 ◽

2021 ◽

Vol 33 (4) ◽

pp. 1061-1082

Author(s):

Yujiao Jiang ◽

Guangshi Lü

Keyword(s):

Dirichlet Series ◽

Central Character ◽

Multiplicative Functions ◽

Cuspidal Representation ◽

Series Coefficient

Abstract Let π be an automorphic irreducible cuspidal representation of GL m {\operatorname{GL}_{m}} over ℚ {\mathbb{Q}} with unitary central character, and let λ π ⁢ ( n ) {\lambda_{\pi}(n)} be its n-th Dirichlet series coefficient. We study short sums of isotypic trace functions associated to some sheaves modulo primes q of bounded conductor, twisted by multiplicative functions λ π ⁢ ( n ) {\lambda_{\pi}(n)} and μ ⁢ ( n ) ⁢ λ π ⁢ ( n ) {\mu(n)\lambda_{\pi}(n)} . We are able to establish non-trivial bounds for these algebraic twisted sums with intervals of length of at least q 1 / 2 + ε {q^{1/2+\varepsilon}} for an arbitrary fixed ε > 0 {\varepsilon>0} .

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A dominated convergence theorem for Eisenstein series

Annales mathématiques du Québec ◽

10.1007/s40316-021-00157-7 ◽

2021 ◽

Author(s):

Johann Franke

Keyword(s):

Fourier Series ◽

Dirichlet Series ◽

Eisenstein Series ◽

Modular Forms ◽

Convergence Theorem ◽

Rational Functions ◽

New Approach ◽

Series Representations ◽

Dominated Convergence ◽

Generalized Dirichlet

AbstractBased on the new approach to modular forms presented in [6] that uses rational functions, we prove a dominated convergence theorem for certain modular forms in the Eisenstein space. It states that certain rearrangements of the Fourier series will converge very fast near the cusp $$\tau = 0$$ τ = 0 . As an application, we consider L-functions associated to products of Eisenstein series and present natural generalized Dirichlet series representations that converge in an expanded half plane.

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