Add to ORKGS. Kusuoka [K 01, Theorem 4] gave an interesting dual characterizationof law invariant coherent risk measures, satisfying the Fatou property.The latter property was introduced by F. Delbaen [D 02]. In thepresent note we extend Kusuoka's characterization in two directions, thefirst one being rather standard, while the second one is somewhat surprising. Firstly we generalize — similarly as M. Fritelli and E. Rossaza Gianin [FG05] — from the notion of coherent risk measures to the more general notion of convex risk measures as introduced by H. F¨ollmer and A. Schied [FS 04]. Secondly — and more importantly — we show that the hypothesis of Fatou property may actually be dropped as it is automatically implied by the hypothesis of law invariance....
Convex risk measures are best known on L∞. In this paper we argue that Lp, for p ∈ [1,∞), is a more ...
In the present contribution, we characterise law determined convex risk measures that have convex l...
We provide a representation theorem for convex risk measures defined on L^{p}(Ω,F,P) spaces, 1≤p≤+∞,...
S. Kusuoka [K 01, Theorem 4] gave an interesting dual characterization<br />of law invariant coheren...
S. Kusuoka [K 01, Theorem 4] gave an interesting dual characteriza-tion of law invariant coherent ri...
Le fichier attaché est une version également éditée dans les Cahiers de la Chaire "Les Particuliers ...
As a generalization of a result by Kusuoka (2001), we provide the representation of law invariant co...
In this paper, we explore several Fatou-type properties of risk measures. The paper continues to rev...
In this paper, we explore several Fatou-type properties of risk measures. The paper continues to rev...
We provide a variety of results for quasiconvex, law-invariant functionals defined on a general Orli...
We provide a variety of results for quasiconvex, law-invariant functionals defined on a general Orli...
Kusuoka (2001) has obtained explicit representation theorems for comonotone risk measures and, more ...
Abstract. In this paper we discuss representations of law invariant coherent risk measures in a form...
Kusuoka representations provide an important and useful characterization of law invariant coherent r...
Aone-to-one correspondence is drawnbetween lawinvariant risk measures and divergences,which we defin...
Convex risk measures are best known on L∞. In this paper we argue that Lp, for p ∈ [1,∞), is a more ...
In the present contribution, we characterise law determined convex risk measures that have convex l...
We provide a representation theorem for convex risk measures defined on L^{p}(Ω,F,P) spaces, 1≤p≤+∞,...
S. Kusuoka [K 01, Theorem 4] gave an interesting dual characterization<br />of law invariant coheren...
S. Kusuoka [K 01, Theorem 4] gave an interesting dual characteriza-tion of law invariant coherent ri...
Le fichier attaché est une version également éditée dans les Cahiers de la Chaire "Les Particuliers ...
As a generalization of a result by Kusuoka (2001), we provide the representation of law invariant co...
In this paper, we explore several Fatou-type properties of risk measures. The paper continues to rev...
In this paper, we explore several Fatou-type properties of risk measures. The paper continues to rev...
We provide a variety of results for quasiconvex, law-invariant functionals defined on a general Orli...
We provide a variety of results for quasiconvex, law-invariant functionals defined on a general Orli...
Kusuoka (2001) has obtained explicit representation theorems for comonotone risk measures and, more ...
Abstract. In this paper we discuss representations of law invariant coherent risk measures in a form...
Kusuoka representations provide an important and useful characterization of law invariant coherent r...
Aone-to-one correspondence is drawnbetween lawinvariant risk measures and divergences,which we defin...
Convex risk measures are best known on L∞. In this paper we argue that Lp, for p ∈ [1,∞), is a more ...
In the present contribution, we characterise law determined convex risk measures that have convex l...
We provide a representation theorem for convex risk measures defined on L^{p}(Ω,F,P) spaces, 1≤p≤+∞,...