Add to ORKGAbstract: In this article we establish the zero-free region of certain Dirichlet polynomials LF;X arising in approximate functional equation for functions in the Selberg class and we prove an asymptotic formula for the number of zeros of LF;X. Key words: Selberg class, Dirichlet polynomial, approximate functional equation, distribution of zero
In this paper we locate the regions containing all or some of the zeros of a certain class of polyno...
Garunkštis Abstract. Wenzhi Luo studied the distribution of nontrivial zeros of the deriva-tives of...
The doctoral dissertation contains the material of scientific investigations done in 2008-2012 in th...
This thesis is comprised of three articles in which we prove explicit estimates for different number...
In this work we consider Dirichlet polynomials that belong to the extended Selberg class. Functions ...
We prove that every functional equation of Riemann's type has infinitely many linearly independent s...
An estimate of the number of zeros of one function related to Dirichlet L-function
In an earlier paper (Part VII, with the same title as the present paper) we proved results on the lo...
Wydział Matematyki i Informatyki: Zakład Algebry i Teorii LiczbPierwsza część rozprawy przedstawia d...
International audienceIn an earlier paper (Part VII, with the same title as the present paper) we pr...
We study Riemann-type functional equations with respect to value-distribution theory and derive impl...
Wydział Matematyki i Informatyki: Zakład Algebry i Teorii LiczbPierwsza część rozprawy przedstawia d...
In this thesis we introduce the Rankin-Selberg hypothesis in the Selberg Class to obtain a non-vanis...
AbstractThis paper discusses the distribution of the zeros generated by length-and-degree-bounded po...
In the present paper, the assumptions on the function $F(s)$ are more restrictive but the conclusion...
In this paper we locate the regions containing all or some of the zeros of a certain class of polyno...
Garunkštis Abstract. Wenzhi Luo studied the distribution of nontrivial zeros of the deriva-tives of...
The doctoral dissertation contains the material of scientific investigations done in 2008-2012 in th...
This thesis is comprised of three articles in which we prove explicit estimates for different number...
In this work we consider Dirichlet polynomials that belong to the extended Selberg class. Functions ...
We prove that every functional equation of Riemann's type has infinitely many linearly independent s...
An estimate of the number of zeros of one function related to Dirichlet L-function
In an earlier paper (Part VII, with the same title as the present paper) we proved results on the lo...
Wydział Matematyki i Informatyki: Zakład Algebry i Teorii LiczbPierwsza część rozprawy przedstawia d...
International audienceIn an earlier paper (Part VII, with the same title as the present paper) we pr...
We study Riemann-type functional equations with respect to value-distribution theory and derive impl...
Wydział Matematyki i Informatyki: Zakład Algebry i Teorii LiczbPierwsza część rozprawy przedstawia d...
In this thesis we introduce the Rankin-Selberg hypothesis in the Selberg Class to obtain a non-vanis...
AbstractThis paper discusses the distribution of the zeros generated by length-and-degree-bounded po...
In the present paper, the assumptions on the function $F(s)$ are more restrictive but the conclusion...
In this paper we locate the regions containing all or some of the zeros of a certain class of polyno...
Garunkštis Abstract. Wenzhi Luo studied the distribution of nontrivial zeros of the deriva-tives of...
The doctoral dissertation contains the material of scientific investigations done in 2008-2012 in th...