In this article a class of symmetric functions is defined and used in some special representation of holomorphic functions. This representation plays an important role in transitions from concrete problems of projective description to equivalent problems of inductive description and finds multiple applications in questions connected with spectral synthesis of differential operators
AbstractLef f be a homogeneous polynomial mapping of degree d from C2 into the space of complex n × ...
AbstractIn this article we derive differential recursion relations for the Laguerre functions on the...
New examples of homogeneous operators involving infinitely many parameters are constructed. They are...
In the paper we study properties of symmetric powers of complex manifolds. We investigate a number o...
AbstractLet X=H/L be an irreducible real bounded symmetric domain realized as a real form in an Herm...
Spectral synthesis on the complex plane related to solutions of some homogeneous equations of convol...
Polynomials appear in many different fields such as statistics, physics and optimization. However, w...
2010 Mathematics Subject Classification: 05A15, 05E05, 05E10, 13A50, 15A72, 16R10, 16R30, 20G05Let K...
AbstractThere is a well known isometry between the center Z(Sn) of the group algebra of the symmetri...
It is studied the Classification Problem for Formal (Holomorphic) Embeddings between Shilov Boundari...
AbstractThe problem of spectral analysis and synthesis is studied in the space C∞ (X) of smooth func...
Let G/H be a semisimple symmetric space. The main tool to embed a principal series representation of...
AbstractIf (b,j,ƒ0) is a normal j-algebra and b− = {X + ijX;X∈b} then b− is a positive polarization ...
AbstractThe concept of a symmetric operator relative to a quadratic form is extended to a k-form ϕ a...
Bounded symmetric domains are the Harish-Chandra realizations of Hermitian symmetric manifolds of th...
AbstractLef f be a homogeneous polynomial mapping of degree d from C2 into the space of complex n × ...
AbstractIn this article we derive differential recursion relations for the Laguerre functions on the...
New examples of homogeneous operators involving infinitely many parameters are constructed. They are...
In the paper we study properties of symmetric powers of complex manifolds. We investigate a number o...
AbstractLet X=H/L be an irreducible real bounded symmetric domain realized as a real form in an Herm...
Spectral synthesis on the complex plane related to solutions of some homogeneous equations of convol...
Polynomials appear in many different fields such as statistics, physics and optimization. However, w...
2010 Mathematics Subject Classification: 05A15, 05E05, 05E10, 13A50, 15A72, 16R10, 16R30, 20G05Let K...
AbstractThere is a well known isometry between the center Z(Sn) of the group algebra of the symmetri...
It is studied the Classification Problem for Formal (Holomorphic) Embeddings between Shilov Boundari...
AbstractThe problem of spectral analysis and synthesis is studied in the space C∞ (X) of smooth func...
Let G/H be a semisimple symmetric space. The main tool to embed a principal series representation of...
AbstractIf (b,j,ƒ0) is a normal j-algebra and b− = {X + ijX;X∈b} then b− is a positive polarization ...
AbstractThe concept of a symmetric operator relative to a quadratic form is extended to a k-form ϕ a...
Bounded symmetric domains are the Harish-Chandra realizations of Hermitian symmetric manifolds of th...
AbstractLef f be a homogeneous polynomial mapping of degree d from C2 into the space of complex n × ...
AbstractIn this article we derive differential recursion relations for the Laguerre functions on the...
New examples of homogeneous operators involving infinitely many parameters are constructed. They are...