Add to ORKGSince the symplectic, Poisson and contact manifolds exist in infinite dimensional case ([1] [2] [7]); it is natural to investigate the Kirillov problem [3] and the Schouten bracket [9] in this case: In this paper we introduce the notion of multiderivation and we establish the necessary results for the study of Kirillov problem in the infinite dimensional case. Moreover, we give an algebraically definition of Jacobi algebra and Jacobi manifold and their caraterizations by multiderivations and Richardson-Nijenhuis bracket
This thesis examines some approaches to address Diophantine equations, specifically we focus on the ...
This paper describes an Artinian module over a ring of prime characteristic whose algebra of Frobeni...
AbstractWe establish recursiveness properties for multipartitional polynomials and their connection ...
In this paper, we investigate the polynomial numerical index (n^{(k)}(l_p),) the symmetric multiline...
AbstractThe main object of this paper is to construct a systematic investigation of a multivariable ...
AbstractIn this paper we shall give a unified technique in the discussion of the additivity of n-mul...
AbstractAlgorithms for multi-sum summation and intergration of hypergeometric summands and integrand...
Let $T$ be a measure preserving $\mathbb{Z}^\ell$-action on the probability space $(X,{\mathcal B},\...
AbstractStarting from Jacobi–Trudi type determinantal expressions for the Schur functions of types B...
The Siegel-Jacobi space is a non-symmetric homogeneous space which is very important geometrically a...
AbstractAn interesting and recently much studied generalization of the classical Schur class is the ...
2010 Mathematics Subject Classification: 33C45, 40G05.In this paper we give some results concerning ...
Making use of a convolution structure, we introduce a new class of analytic functions $mathbb{T}^{p}...
MSC 2010: 30C10The classical notion of apolarity is defined for two algebraic polynomials of equal d...
Let double-struck K denote an algebraically closed field and let q denote a nonzero scalar in double...
This thesis examines some approaches to address Diophantine equations, specifically we focus on the ...
This paper describes an Artinian module over a ring of prime characteristic whose algebra of Frobeni...
AbstractWe establish recursiveness properties for multipartitional polynomials and their connection ...
In this paper, we investigate the polynomial numerical index (n^{(k)}(l_p),) the symmetric multiline...
AbstractThe main object of this paper is to construct a systematic investigation of a multivariable ...
AbstractIn this paper we shall give a unified technique in the discussion of the additivity of n-mul...
AbstractAlgorithms for multi-sum summation and intergration of hypergeometric summands and integrand...
Let $T$ be a measure preserving $\mathbb{Z}^\ell$-action on the probability space $(X,{\mathcal B},\...
AbstractStarting from Jacobi–Trudi type determinantal expressions for the Schur functions of types B...
The Siegel-Jacobi space is a non-symmetric homogeneous space which is very important geometrically a...
AbstractAn interesting and recently much studied generalization of the classical Schur class is the ...
2010 Mathematics Subject Classification: 33C45, 40G05.In this paper we give some results concerning ...
Making use of a convolution structure, we introduce a new class of analytic functions $mathbb{T}^{p}...
MSC 2010: 30C10The classical notion of apolarity is defined for two algebraic polynomials of equal d...
Let double-struck K denote an algebraically closed field and let q denote a nonzero scalar in double...
This thesis examines some approaches to address Diophantine equations, specifically we focus on the ...
This paper describes an Artinian module over a ring of prime characteristic whose algebra of Frobeni...
AbstractWe establish recursiveness properties for multipartitional polynomials and their connection ...