Add to ORKGAssume that $G/H$ is a noncompactly causal symmetric space with restricted root system of the non-exceptional type and the multiplicity of the short roots is even. Using shift operators we obtain explicit formulas for the Bessel function on the tangent space to $G/H$ at the origin. This enable us to investigate the nature and order of the singularities of the Bessel function, and to formulate a conjecture on this matter
AbstractThe structured Bessel-type functions of arbitrary even-order were introduced by Everitt and ...
AbstractThe spectral problem for the Bessel equation of order ν on (0, ∞) in the case 0<ν<1 is close...
AbstractBy taking an appropriate zero-curvature limit, we obtain the spherical functions on flat sym...
Abstract. Assume that G/H is a noncompactly causal symmetric space with re-stricted root system of t...
By taking an appropriate limit, we obtain the Bessel functions related to root systems as limit of H...
In this paper we extend previous classes of generalized Bessel functions. This follows via a limit t...
We determine integral formulas for the meromorphic extension in the λ-parameter of the spherical fun...
Soumis à Journal of Lie theoryLet $\q$ be the tangent space to the noncompact causal symmetric space...
Abstract. By taking an appropriate limit, we obtain the Bessel functions related to root systems as ...
AbstractWe determine integral formulas for the meromorphic extension in the λ-parameter of the spher...
Abstract. In this paper we extend previous classes of generalized Bessel functions. This follows via...
Abstract. In this paper we extend previous classes of generalized Bessel functions. This follows via...
Abstract. Let q be the tangent space to the noncompact causal symmetric space SU(n, n)/SL(n,C) × R∗...
By taking an appropriate zero-curvature limit, we obtain the spherical functions on flat symmetric s...
In this article we prove new growth estimates for the spherical functions on non-compactly causal sy...
AbstractThe structured Bessel-type functions of arbitrary even-order were introduced by Everitt and ...
AbstractThe spectral problem for the Bessel equation of order ν on (0, ∞) in the case 0<ν<1 is close...
AbstractBy taking an appropriate zero-curvature limit, we obtain the spherical functions on flat sym...
Abstract. Assume that G/H is a noncompactly causal symmetric space with re-stricted root system of t...
By taking an appropriate limit, we obtain the Bessel functions related to root systems as limit of H...
In this paper we extend previous classes of generalized Bessel functions. This follows via a limit t...
We determine integral formulas for the meromorphic extension in the λ-parameter of the spherical fun...
Soumis à Journal of Lie theoryLet $\q$ be the tangent space to the noncompact causal symmetric space...
Abstract. By taking an appropriate limit, we obtain the Bessel functions related to root systems as ...
AbstractWe determine integral formulas for the meromorphic extension in the λ-parameter of the spher...
Abstract. In this paper we extend previous classes of generalized Bessel functions. This follows via...
Abstract. In this paper we extend previous classes of generalized Bessel functions. This follows via...
Abstract. Let q be the tangent space to the noncompact causal symmetric space SU(n, n)/SL(n,C) × R∗...
By taking an appropriate zero-curvature limit, we obtain the spherical functions on flat symmetric s...
In this article we prove new growth estimates for the spherical functions on non-compactly causal sy...
AbstractThe structured Bessel-type functions of arbitrary even-order were introduced by Everitt and ...
AbstractThe spectral problem for the Bessel equation of order ν on (0, ∞) in the case 0<ν<1 is close...
AbstractBy taking an appropriate zero-curvature limit, we obtain the spherical functions on flat sym...