Add to ORKGLet $ℇ_{(ω)}(Ω)$ denote the non-quasianalytic class of Beurling type on an open set Ω in $ℝ^n$. For $μ ∈ ℇ'_{(ω)}(ℝ^n)$ the surjectivity of the convolution operator $T_μ: ℇ_{(ω)}(Ω_1) → ℇ_{(ω)}(Ω_2)$ is characterized by various conditions, e.g. in terms of a convexity property of the pair $(Ω_1, Ω_2)$ and the existence of a fundamental solution for μ or equivalently by a slowly decreasing condition for the Fourier-Laplace transform of μ. Similar conditions characterize the surjectivity of a convolution operator $S_μ: D'_{{ω}}(Ω_1) → D'_{{ω}}(Ω_2)$ between ultradistributions of Roumieu type whenever $μ ∈ ℇ'_{{ω}}(ℝ^n)$. These results extend classical work of Hörmander on convolution operators between spaces of $C^∞$-functions and more recent...
We prove the following inclusion WF*(u)⊂ WF*(Pu)∪ Σ, u∈ε′* (Ω) where WF* denotes the non-quasianalyt...
AbstractThis paper investigates the regularity of solutions of convolution equations in the frame of...
In this paper we continue the study of the spaces $O_{M,ω}(R^N)$ and $O_{C,ω}(R^N)$ undertaken in A...
Let $ε_{{ω}}(I)$ denote the space of all ω-ultradifferentiable functions of Roumieu type on an open ...
AbstractWe characterize surjectivity of convolution operators on spaces of ultradifferentiable funct...
Abstract. We achieve characterizations of those ultradistributions µ ∈ E ′(ω)(RN) (resp. E ′{ω}(R N)...
It is well-known that each distribution $\mu$ with compact support can be convolved with an arbitrar...
Abstract. Extending previous work by Meise and Vogt, we charac-terize those convolution operators, d...
[EN] We investigate the surjectivity of the Borel map in the quasianalytic setting for classes of u...
[EN] We investigate the surjectivity of the Borel map in the quasianalytic setting for classes of u...
We prove that the existence of a solution operator for a convolution operator from the space of ultr...
We prove that the existence of a solution operator for a convolution operator from the space of ultr...
We investigate the surjectivity of the Borel map in the quasianalytic setting for classes of ultradi...
We prove the following inclusion WF*(u)⊂ WF*(Pu)∪ Σ, u∈ε′* (Ω) where WF* denotes the non-quasianalyt...
Abstract. Let Ω be a nonempty open set of the k-dimensional euclidean space Rk. In this paper, we sh...
We prove the following inclusion WF*(u)⊂ WF*(Pu)∪ Σ, u∈ε′* (Ω) where WF* denotes the non-quasianalyt...
AbstractThis paper investigates the regularity of solutions of convolution equations in the frame of...
In this paper we continue the study of the spaces $O_{M,ω}(R^N)$ and $O_{C,ω}(R^N)$ undertaken in A...
Let $ε_{{ω}}(I)$ denote the space of all ω-ultradifferentiable functions of Roumieu type on an open ...
AbstractWe characterize surjectivity of convolution operators on spaces of ultradifferentiable funct...
Abstract. We achieve characterizations of those ultradistributions µ ∈ E ′(ω)(RN) (resp. E ′{ω}(R N)...
It is well-known that each distribution $\mu$ with compact support can be convolved with an arbitrar...
Abstract. Extending previous work by Meise and Vogt, we charac-terize those convolution operators, d...
[EN] We investigate the surjectivity of the Borel map in the quasianalytic setting for classes of u...
[EN] We investigate the surjectivity of the Borel map in the quasianalytic setting for classes of u...
We prove that the existence of a solution operator for a convolution operator from the space of ultr...
We prove that the existence of a solution operator for a convolution operator from the space of ultr...
We investigate the surjectivity of the Borel map in the quasianalytic setting for classes of ultradi...
We prove the following inclusion WF*(u)⊂ WF*(Pu)∪ Σ, u∈ε′* (Ω) where WF* denotes the non-quasianalyt...
Abstract. Let Ω be a nonempty open set of the k-dimensional euclidean space Rk. In this paper, we sh...
We prove the following inclusion WF*(u)⊂ WF*(Pu)∪ Σ, u∈ε′* (Ω) where WF* denotes the non-quasianalyt...
AbstractThis paper investigates the regularity of solutions of convolution equations in the frame of...
In this paper we continue the study of the spaces $O_{M,ω}(R^N)$ and $O_{C,ω}(R^N)$ undertaken in A...