Utility and risk are two often competing measurements on the investment success. We show that efficient trade-off between these two measurements for investment portfolios happens, in general, on a convex curve in the two-dimensional space of utility and risk. This is a rather general pattern. The modern portfolio theory of Markowitz (1959) and the capital market pricing model Sharpe (1964), are special cases of our general framework when the risk measure is taken to be the standard deviation and the utility function is the identity mapping. Using our general framework, we also recover and extend the results in Rockafellar et al. (2006), which were already an extension of the capital market pricing model to allow for the use of more general ...
This paper derives a unified framework for portfolio optimization, derivative pricing, financial mod...
This book provides a concise introduction to convex duality in financial mathematics. Convex duality...
The basic elements of modern portfolio theory are covered in this Chapter. Starting from the basics ...
Utility and risk are two often competing measurements on the investment success. We show that effici...
The following four modular building blocks are crucial in the context of portfolio theory: (a) the m...
The aim of this paper is to provide several examples of convex risk measures necessary for the appli...
In this paper, we offer a novel class of utility functions applied to optimal portfolio selection. T...
We develop a model of optimal asset allocation based on a utility framework. This applies to a more ...
We develop a model of optimal asset allocation based on a utility framework. This applies to a more ...
We formulate and carry out an analytical treatment of a single-period portfolio choice model featuri...
Since the birth of mathematical nance, portfolio selection has been one of the topics which have att...
We formulate and carry out an analytical treatment of a single-period portfolio choice model featuri...
The primary focus of this dissertation is a new risk measure, Swap Variance (SwV), and its applicati...
The logical derivation of the two-factors model (The CAPM) is not empirically testable. This has pav...
The prospect theory of Kahneman and Tversky (in Econometrica 47(2), 263–291, 1979) and the cumulativ...
This paper derives a unified framework for portfolio optimization, derivative pricing, financial mod...
This book provides a concise introduction to convex duality in financial mathematics. Convex duality...
The basic elements of modern portfolio theory are covered in this Chapter. Starting from the basics ...
Utility and risk are two often competing measurements on the investment success. We show that effici...
The following four modular building blocks are crucial in the context of portfolio theory: (a) the m...
The aim of this paper is to provide several examples of convex risk measures necessary for the appli...
In this paper, we offer a novel class of utility functions applied to optimal portfolio selection. T...
We develop a model of optimal asset allocation based on a utility framework. This applies to a more ...
We develop a model of optimal asset allocation based on a utility framework. This applies to a more ...
We formulate and carry out an analytical treatment of a single-period portfolio choice model featuri...
Since the birth of mathematical nance, portfolio selection has been one of the topics which have att...
We formulate and carry out an analytical treatment of a single-period portfolio choice model featuri...
The primary focus of this dissertation is a new risk measure, Swap Variance (SwV), and its applicati...
The logical derivation of the two-factors model (The CAPM) is not empirically testable. This has pav...
The prospect theory of Kahneman and Tversky (in Econometrica 47(2), 263–291, 1979) and the cumulativ...
This paper derives a unified framework for portfolio optimization, derivative pricing, financial mod...
This book provides a concise introduction to convex duality in financial mathematics. Convex duality...
The basic elements of modern portfolio theory are covered in this Chapter. Starting from the basics ...