Add to ORKGWe consider the problem of finding optimal strategies that maximize the average growth rate of multiplicative stochastic processes. For a geometric Brownian motion, the problem is solved through the so-called Kelly criterion, according to which the optimal growth rate is achieved by investing a constant given fraction of resources at any step of the dynamics. We generalize these finding to the case of dynamical equations with finite carrying capacity, which can find applications in biology, mathematical ecology, and finance. We formulate the problem in terms of a stochastic process with multiplicative noise and a nonlinear drift term that is determined by the specific functional form of carrying capacity. We solve the stochastic equation fo...
We consider a discrete-time, infinite-horizon, one-good stochastic growth model and we solve the cen...
summary:We consider a non-consuming agent investing in a stock and a money market interested in the ...
We study a stochastic, continuous time model on a finite horizon for a firm that produces a single g...
The objective of this thesis is to develop and analyse two stochastic control problems arising in t...
The stochastic control problem of a firm aiming to optimally expand the production capacity, through...
We deal with an infinite horizon, infinite dimensional stochastic optimal control problem arising in...
In this paper, we introduce a class of stochastic harvesting population system with Fractional Brown...
Stochastic portfolio theory (SPT) is a financial framework with a large number d of stocks and the g...
A portfolio optimisation problem on an infinite time horizon is considered. Risky asset price obeys ...
It is shown that in a market modeled by a vector-valued semimartingale, when we choose the wealth pr...
Published: J. Phys. A: Math. Theor. 41, 365005 (2008).International audienceWe derive P(M,t_m), the ...
Two major financial market complexities are transaction costs and uncertain volatility, and we analy...
We study an infinite-dimensional continuous-time optimal control problem on finite horizon for a co...
2000 Mathematics Subject Classification: 37F21, 70H20, 37L40, 37C40, 91G80, 93E20.In this work we wi...
We consider an investment model with memory in which the prices of n risky assets are driven by an n...
We consider a discrete-time, infinite-horizon, one-good stochastic growth model and we solve the cen...
summary:We consider a non-consuming agent investing in a stock and a money market interested in the ...
We study a stochastic, continuous time model on a finite horizon for a firm that produces a single g...
The objective of this thesis is to develop and analyse two stochastic control problems arising in t...
The stochastic control problem of a firm aiming to optimally expand the production capacity, through...
We deal with an infinite horizon, infinite dimensional stochastic optimal control problem arising in...
In this paper, we introduce a class of stochastic harvesting population system with Fractional Brown...
Stochastic portfolio theory (SPT) is a financial framework with a large number d of stocks and the g...
A portfolio optimisation problem on an infinite time horizon is considered. Risky asset price obeys ...
It is shown that in a market modeled by a vector-valued semimartingale, when we choose the wealth pr...
Published: J. Phys. A: Math. Theor. 41, 365005 (2008).International audienceWe derive P(M,t_m), the ...
Two major financial market complexities are transaction costs and uncertain volatility, and we analy...
We study an infinite-dimensional continuous-time optimal control problem on finite horizon for a co...
2000 Mathematics Subject Classification: 37F21, 70H20, 37L40, 37C40, 91G80, 93E20.In this work we wi...
We consider an investment model with memory in which the prices of n risky assets are driven by an n...
We consider a discrete-time, infinite-horizon, one-good stochastic growth model and we solve the cen...
summary:We consider a non-consuming agent investing in a stock and a money market interested in the ...
We study a stochastic, continuous time model on a finite horizon for a firm that produces a single g...