Add to ORKGWe provide a detailed characterization of the optimal consumption stream for the additive habit-forming utility maximization problem, in a framework of general discrete-time incomplete markets and random endowments. This characterization allows us to derive the monotonicity and concavity of the optimal consumption as a function of wealth, for several important classes of incomplete markets and preferences. These results yield a deeper understanding of the fine structure of the optimal consumption and provide a further theoretical support for the classical conjectures of Keynes (The general theory of employment, interest and money. Cambridge University Press, Cambridge, 1936
This Ph.D. thesis consists of two contributed papers. It builds on the recent dynamic macroeconomic ...
Only abstract. Paper copies of master’s theses are listed in the Helka database (http://www.helsinki...
In this thesis a mathematical description and analysis of the Cumulative Prospect Theory is present...
We prove that for any incomplete market and any concave utility function the marginal propensities t...
textThis dissertation studies a class of path-dependent stochastic control problems with application...
We prove that for any incomplete market and any concave utility function the marginal propensities t...
This paper studies the optimal consumption via the habit formation preference in markets with transa...
This paper studies the continuous time utility maximization problem on consumption with addictive ha...
The utility maximization problem of ’ratchet investors’ who do not tolerate any decline in their con...
Krsnik S. Consumption selection on incomplete markets. Bielefeld (Germany): Bielefeld University; 20...
The "standard" Merton formulation of optimal investment and consumption involves optimizing the inte...
Recent empirical research, Flavin (1981), Hagashi (1982), has rejected the certainty-equivalent form...
This paper explores the optimal consumption and investment behavior of an individual who derives uti...
In a market with stochastic investment opportunities, we study an optimal consumption investment pro...
A leading explanation of aggregate stock market behavior suggests that assets are priced as if there...
This Ph.D. thesis consists of two contributed papers. It builds on the recent dynamic macroeconomic ...
Only abstract. Paper copies of master’s theses are listed in the Helka database (http://www.helsinki...
In this thesis a mathematical description and analysis of the Cumulative Prospect Theory is present...
We prove that for any incomplete market and any concave utility function the marginal propensities t...
textThis dissertation studies a class of path-dependent stochastic control problems with application...
We prove that for any incomplete market and any concave utility function the marginal propensities t...
This paper studies the optimal consumption via the habit formation preference in markets with transa...
This paper studies the continuous time utility maximization problem on consumption with addictive ha...
The utility maximization problem of ’ratchet investors’ who do not tolerate any decline in their con...
Krsnik S. Consumption selection on incomplete markets. Bielefeld (Germany): Bielefeld University; 20...
The "standard" Merton formulation of optimal investment and consumption involves optimizing the inte...
Recent empirical research, Flavin (1981), Hagashi (1982), has rejected the certainty-equivalent form...
This paper explores the optimal consumption and investment behavior of an individual who derives uti...
In a market with stochastic investment opportunities, we study an optimal consumption investment pro...
A leading explanation of aggregate stock market behavior suggests that assets are priced as if there...
This Ph.D. thesis consists of two contributed papers. It builds on the recent dynamic macroeconomic ...
Only abstract. Paper copies of master’s theses are listed in the Helka database (http://www.helsinki...
In this thesis a mathematical description and analysis of the Cumulative Prospect Theory is present...