Add to ORKGWe reduce the Mathieu conjecture for $SU(2)$ to a conjecture about moments of Laurent polynomials in two variables with single variable polynomial coefficients.Comment: Considerably revised and simplified. Now 5 pages. To appear in Indagationes Mathematica
AbstractIn this paper, we reconsider the problem discussed in [G.W. Chen, S.B. Wang, Small amplitude...
Several new inequalities of type $sum w_a^{-2m}geq alpha_mcdotsum a^{pm m}$ for angle-bisectors are ...
In this paper we make some further generalization of well known Hilbert's inequality and its equival...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
AbstractNew lower bounds are given for the sum of degrees of simple and distinct irreducible factors...
* Dedicated to the memory of Prof. N. ObreshkoffA Schoenberg conjecture connecting quadratic mean ra...
We use the large deviation approach to sum rules pioneered by Gamboa, Nagel, and Rouault to prove hi...
In this paper we significantly improve our previous results of reducing relative Thue inequalities t...
In this paper, Voronovskaja-type results with quantitative upper estimates and the exact orders in s...
For a given monic integral polynomial $f(x)$ of degree $n$, we define local roots $r_i$ of $f(x)$ fo...
AbstractIn this paper we consider two elliptic problems. The first one is a Dirichlet problem while ...
Let $A$ and $B$ be two subsets of the nonnegative integers. We call $A$ and $B$ additive complements...
The aim of our present work here is to present few results in the theory of Mellin transforms using ...
* The second author is supported by the Alexander-von-Humboldt Foundation. He is on leave from: Inst...
AbstractIn this paper, we reconsider the problem discussed in [G.W. Chen, S.B. Wang, Small amplitude...
Several new inequalities of type $sum w_a^{-2m}geq alpha_mcdotsum a^{pm m}$ for angle-bisectors are ...
In this paper we make some further generalization of well known Hilbert's inequality and its equival...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
In this paper, we show under the abc conjecture that the Diophantine equation f(x)=u!+v! has only fi...
AbstractNew lower bounds are given for the sum of degrees of simple and distinct irreducible factors...
* Dedicated to the memory of Prof. N. ObreshkoffA Schoenberg conjecture connecting quadratic mean ra...
We use the large deviation approach to sum rules pioneered by Gamboa, Nagel, and Rouault to prove hi...
In this paper we significantly improve our previous results of reducing relative Thue inequalities t...
In this paper, Voronovskaja-type results with quantitative upper estimates and the exact orders in s...
For a given monic integral polynomial $f(x)$ of degree $n$, we define local roots $r_i$ of $f(x)$ fo...
AbstractIn this paper we consider two elliptic problems. The first one is a Dirichlet problem while ...
Let $A$ and $B$ be two subsets of the nonnegative integers. We call $A$ and $B$ additive complements...
The aim of our present work here is to present few results in the theory of Mellin transforms using ...
* The second author is supported by the Alexander-von-Humboldt Foundation. He is on leave from: Inst...
AbstractIn this paper, we reconsider the problem discussed in [G.W. Chen, S.B. Wang, Small amplitude...
Several new inequalities of type $sum w_a^{-2m}geq alpha_mcdotsum a^{pm m}$ for angle-bisectors are ...
In this paper we make some further generalization of well known Hilbert's inequality and its equival...