To satisfy the property of expected-utility maximization, Tzeng et al. (2012) modify the almost second-degree stochastic dominance proposed by Leshno and Levy (2002) and define almost higher-degree stochastic dominance. In this note, we further investigate the relevant properties. We define an almost third-degree stochastic dominance in the same way that Leshno and Levy (2002) define second-degree stochastic dominance and show that Leshno and Levy's (2002) almost stochastic dominance has the hierarchy property but not expected-utility maximization. In contrast, Tzeng et al.'s (2012) definition has the property of expected-utility maximization but not the hierarchy property. This phenomenon also holds for higher-degree stochastic dominan...
Almost stochastic dominance is a relaxation of stochastic dominance, which allows small violations o...
Fishburn and Vickson (1978) showed that, when applied to random alternatives with an equal mean, 3rd...
Prospect and Markowitz Stochastic Dominance Levy and Wiener (1998), Levy and Levy (2002, 2004) devel...
To satisfy the property of expected-utility maximization, Tzeng et al. (2012) modify the almost seco...
This paper establishes some equivalent relationships for the first three orders of the almost stocha...
In this paper, we develop the concept of almost stochastic dominance for higher order pref...
In this paper we first develop a theory of almost stochastic dominance for risk-seeking investors to...
This paper provides a general framework for a unifying treatment of stochastic dominance of any degr...
Leshno and Levy (2002) extend stochastic dominance (SD) theory to almost stochastic dominance (ASD) ...
Title: Almost stochastic dominance Author: Adam Štefánik Department: Probability and Mathematical St...
This study establishes necessary conditions for Almost Stochastic Dominance criteria of various orde...
This paper studies some properties of stochastic dominance (SD) for risk-averse and risk-seeking inv...
Traditional stochastic dominance rules are so strict and qualitative conditions that generally a sto...
The concept of stochastic dominance is defined, and its relation to welfare, poverty, and income ine...
Almost stochastic dominance is a relaxation of stochastic dominance, which allows small violations o...
Fishburn and Vickson (1978) showed that, when applied to random alternatives with an equal mean, 3rd...
Prospect and Markowitz Stochastic Dominance Levy and Wiener (1998), Levy and Levy (2002, 2004) devel...
To satisfy the property of expected-utility maximization, Tzeng et al. (2012) modify the almost seco...
This paper establishes some equivalent relationships for the first three orders of the almost stocha...
In this paper, we develop the concept of almost stochastic dominance for higher order pref...
In this paper we first develop a theory of almost stochastic dominance for risk-seeking investors to...
This paper provides a general framework for a unifying treatment of stochastic dominance of any degr...
Leshno and Levy (2002) extend stochastic dominance (SD) theory to almost stochastic dominance (ASD) ...
Title: Almost stochastic dominance Author: Adam Štefánik Department: Probability and Mathematical St...
This study establishes necessary conditions for Almost Stochastic Dominance criteria of various orde...
This paper studies some properties of stochastic dominance (SD) for risk-averse and risk-seeking inv...
Traditional stochastic dominance rules are so strict and qualitative conditions that generally a sto...
The concept of stochastic dominance is defined, and its relation to welfare, poverty, and income ine...
Almost stochastic dominance is a relaxation of stochastic dominance, which allows small violations o...
Fishburn and Vickson (1978) showed that, when applied to random alternatives with an equal mean, 3rd...
Prospect and Markowitz Stochastic Dominance Levy and Wiener (1998), Levy and Levy (2002, 2004) devel...