Your search keyword '"Agram Nacira"' showing total 14 results

1. The Donsker delta function and local time for McKean-Vlasov processes and applications

Author

Agram, Nacira and Øksendal, Bernt

Subjects

Mathematics - Functional Analysis, Optimization and Control (math.OC), Probability (math.PR), 60H15, 60H40, 60J35, FOS: Mathematics, Mathematics - Optimization and Control, Mathematics - Probability, Functional Analysis (math.FA)

Abstract

The purpose of this paper is to establish a stochastic differential equation for the Donsker delta measure of the solution of a McKean-Vlasov (mean-field) stochastic differential equation. If the Donsker delta measure is absolutely continuous with respect to Lebesgue measure, then its Radon-Nikodym derivative is called the Donsker delta function. In that case it can be proved that the local time of such a process is simply the integral with respect to time of the Donsker delta function. Therefore we also get an equation for the local time of such a process. For some particular McKean-Vlasov processes, we find explicit expressions for their Donsker delta functions and hence for their local times.

Published

2023

2. Impulse control of conditional McKean-Vlasov jump diffusions

Author

Agram, Nacira, Pucci, Giulia, and Oksendal, Bernt

Subjects

Optimization and Control (math.OC), FOS: Mathematics, Mathematics - Optimization and Control

Abstract

This paper establishes a verification theorem for impulse control problems involving conditional McKean-Vlasov jump diffusions. We obtain a Markovian system by combining the state equation of the problem with the stochastic Fokker-Planck equation for the conditional probability law of the state. We derive sufficient variational inequalities for a function to be the value function of the impulse control problem, and for an impulse control to be the optimal control. We illustrate our results by applying them to the study of an optimal stream of dividends under transaction costs. We obtain the solution explicitly by finding a function and an associated impulse control which satisfy the verification theorem., Comment: 19 pages. arXiv admin note: text overlap with arXiv:2207.13994

Published

2023

3. Optimal stopping of conditional McKean-Vlasov jump diffusions

Author

Agram, Nacira and Oksendal, Bernt

Subjects

Optimization and Control (math.OC), Probability (math.PR), FOS: Mathematics, Mathematics - Optimization and Control, Mathematics - Probability

Abstract

We study the problem of optimal stopping of conditional McKean-Vlasov (mean-field) stochastic differential equations with jumps (conditional McKean-Vlasov jump diffusions, for short). We obtain sufficient variational inequalities for a function to be the value function of such a problem and for a stopping time to be optimal. To achieve this, we combine the state equation for the conditional McKean-Vlasov equation with the associated stochastic Fokker-Planck equation for the conditional law of the solution of the state. This gives us a Markovian system which can be handled by using a version of the Dynkin formula. We illustrate our result by solving explicitly two optimal stopping problems for conditional McKean-Vlasov jump diffusions. More specifically, we first find the optimal time to sell in a market with common noise and jumps, and, next, we find the stopping time to quit a project whose state is modelled by a jump diffusion, when the performance functional involves the conditional mean of the state., Comment: arXiv admin note: text overlap with arXiv:2110.02193

Published

2022

4. Stochastic Fokker-Planck PIDE for conditional McKean-Vlasov jump diffusions and applications to optimal control

Author

Agram, Nacira and Oksendal, Bernt

Subjects

Optimization and Control (math.OC), Probability (math.PR), FOS: Mathematics, Mathematics - Optimization and Control, Mathematics - Probability

Abstract

The purpose of this paper is to study optimal control of conditional McKean-Vlasov (mean-field) stochastic differential equations with jumps (conditional McKean-Vlasov jump diffusions, for short). To this end, we first prove a stochastic Fokker-Planck equation for the conditional law of the solution of such equations. Combining this equation with the original state equation, we obtain a Markovian system for the state and its conditional law. Furthermore, we apply this to formulate an Hamilton-Jacobi-Bellman (HJB) equation for the optimal control of conditional McKean-Vlasov jump diffusions. Then we study the situation when the law is absolutely continuous with respect to Lebesgue measure. In that case the Fokker-Planck equation reduces to a stochastic partial differential equation (SPDE) for the Radon-Nikodym derivative of the conditional law. Finally we apply these results to solve explicitly the following problems: -Linear-quadratic optimal control of conditional stochastic McKean-Vlasov jump diffusions. -Optimal consumption from a cash flow modelled as a conditional stochastic McKean-Vlasov differential equation with jumps., Comment: 32

Published

2021

5. Pricing of European options in incomplete jump diffusion markets

Author

Agram, Nacira and ��ksendal, Bernt

Subjects

Computer Science::Computer Science and Game Theory, Optimization and Control (math.OC), 60G51, 60H10, 60J75, 93E20, 91Gxx, 60H35, 60H30, FOS: Mathematics, Mathematics - Optimization and Control

Abstract

We study option prices in financial markets where the risky asset prices are modelled by jump diffusions. It was proposed by Schweizer (1996) in a general semimartingale setting, following earlier works by F\"ollmer and Sondermann (1986) and Bouleau and Lamberton (1989), that the right price of such an option is the initial wealth needed to make it possible to generate by a self-financing portfolio a terminal wealth which is as close as possible to the payoff F in the sense of variance. Schweizer calls this price the approximation price and he investigates interesting general properties of this price and its corresponding optimal portfolio. -However, neither of these authors compute explicitly this price in concrete cases. This is the motivation for the current paper: We apply stochastic control methods to compute this price in the setting of markets with assets described by jump diffusions. Our method involves Stackelberg games and a suitably modified stochastic maximum principle. We show that such an optimal initial wealth, denoted by z^, with corresponding optimal portfolio {\pi}^ exist and are unique. - If the coefficients of the risky asset prices are deterministic, we show that z^=E_{Q*}[F], for a specific equivalent martingale measure (EMM) Q*. This shows in particular that the minimal variance price is free from arbitrage. -Then for the general case we apply a suitable maximum principle of optimal stochastic control to relate the minimal variance price z^=p_{mv}(F) to the Hamiltonian and its adjoint processes, and we show that, under some conditions, z^=E_{Q_0}[F] for any Q_0 in a family M_0 of EMMs, described by the set of solutions of a system of linear equations. -Finally, we illustrate our results by looking at specific examples.

Published

2020

6. Stochastic Maximum Principle with Default

Author

Cherif, Khalida Bachir, Agram, Nacira, and Dahl, Kristina

Subjects

Optimization and Control (math.OC), FOS: Mathematics, MathematicsofComputing_NUMERICALANALYSIS, Mathematics - Optimization and Control

Abstract

In this paper, we derive sufficient and necessary maximum principles for a stochastic optimal control problem where the system state is given by a controlled stochastic differential equation with default. We prove existence of a unique solution to the controlled default stochastic differential equation. Furthermore, we prove existence and uniqueness of solution to the adjoint backward stochastic differential equation which appears in connection to the maximum principles. Finally, we apply the maximum principles to solve a utility maximisation problem with logarithmic utility functions.

Published

2020

7. Singular optimal control of stochastic Volterra integral equations

Author

Agram, Nacira, Labed, Saloua, ��ksendal, Bernt, and Yakhlef, Samia

Subjects

Optimization and Control (math.OC), Probability (math.PR), FOS: Mathematics, 60H05, 60H20, 60J75, 93E20, 91G80, 91B70, Mathematics - Optimization and Control, Mathematics - Probability

Abstract

This paper deals with optimal combined singular and regular controls for stochastic Volterra integral equations, where the solution X^{u,\xi}(t)=X(t) is given by X(t) =\phi(t)+\int_{0}^{t}}b(t,s,X(s),u(s)) ds+\int_{0}^{t}\sigma(t,s,X(s),u(s))dB(s) +\int _{0}^{t}\int_{0}^{t}h(t,s) d\xi(s). Here dB(s) denotes the Brownian motion It\^o type differential and \xi denotes the singular control (singular in time t with respect to Lebesgue measure) and u denotes the regular control (absolutely continuous with respect to Lebesgue measure). Such systems may for example be used to model harvesting of populations with memory, where X(t) represents the population density at time t, and the singular control process \xi represents the harvesting effort rate. The total income from the harvesting is represented by J(u,\xi) =E[\int _{0}^{T}\int_{0}^{T} f_{0}(t,X(t),u(t))dt+\int _{0}^{T}\int_{0}^{T} f_{1}(t,X(t))d\xi(t)+g(X(T))], for given functions f_{0},f_{1} and g, where T>0 is a constant denoting the terminal time of the harvesting. Note that it is important to allow the controls to be singular, because in some cases the optimal controls are of this type. Using Hida-Malliavin calculus, we prove sufficient conditions and necessary conditions of optimality of controls. As a consequence, we obtain a new type of backward stochastic Volterra integral equations with singular drift. Finally, to illustrate our results, we apply them to discuss optimal harvesting problems with possibly density dependent prices.

Published

2019

8. Introduction to White Noise, Hida-Malliavin Calculus and Applications

Author

Agram, Nacira and Øksendal, Bernt

Subjects

Mathematics::Probability, Optimization and Control (math.OC), FOS: Mathematics, 60H05, 60H20, 60J75, 93E20, 91G80, 91B70, Mathematics - Optimization and Control

Abstract

The purpose of these lectures is threefold: We first give a short survey of the Hida white noise calculus, and in this context we introduce the Hida-Malliavin derivative as a stochastic gradient with values in the Hida stochastic distribution space $(\mathcal{S}% )^*$. We show that this Hida-Malliavin derivative defined on $L^2(\mathcal{F}_T,P)$ is a natural extension of the classical Malliavin derivative defined on the subspace $\mathbb{D}_{1,2}$ of $L^2(P)$. The Hida-Malliavin calculus allows us to prove new results under weaker assumptions than could be obtained by the classical theory. In particular, we prove the following: (i) A general integration by parts formula and duality theorem for Skorohod integrals, (ii) a generalised fundamental theorem of stochastic calculus, and (iii) a general Clark-Ocone theorem, valid for all $F \in L^2(\mathcal{F}_T,P)$. As applications of the above theory we prove the following: A general representation theorem for backward stochastic differential equations with jumps, in terms of Hida-Malliavin derivatives; a general stochastic maximum principle for optimal control; backward stochastic Volterra integral equations; optimal control of stochastic Volterra integral equations and other stochastic systems.

Published

2019

9. Mean-Field Delayed BSDEs with Jumps

Author

Agram, Nacira

Subjects

Optimization and Control (math.OC), FOS: Mathematics, 34F05, 60H30, 60G51, 60G57, Mathematics - Optimization and Control

Abstract

We establish sufficient conditions for the existence and uniqueness of mean-field backward stochastic differential equations with time delayed generator in the sense that at t, the generator may depend on previous values up to a delay constant {\delta} not on the hole past as in Delong and Imkeller [10], [13]. For sufficiently small delay constant {\delta} and for any finite time horizon, we get a unique solution., Comment: 12 pages

Published

2018

10. Model uncertainty stochastic mean-field control

Author

Agram, Nacira and ��ksendal, Bernt

Subjects

Optimization and Control (math.OC), FOS: Mathematics, Mathematics - Optimization and Control

Abstract

We consider the problem of optimal control of a mean-field stochastic differential equation under model uncertainty. The model uncertainty is represented by ambiguity about the law $\mathcal{L}(X(t))$ of the state $X(t)$ at time $t$. For example, it could be the law $\mathcal{L}_{\mathbb{P}}(X(t))$ of $X(t)$ with respect to the given, underlying probability measure $\mathbb{P}$. This is the classical case when there is no model uncertainty. But it could also be the law $\mathcal{L}_{\mathbb{Q}}(X(t))$ with respect to some other probability measure $\mathbb{Q}$ or, more generally, any random measure $\mu(t)$ on $\mathbb{R}$ with total mass $1$. We represent this model uncertainty control problem as a stochastic differential game of a mean-field related type stochastic differential equation (SDE) with two players. The control of one of the players, representing the uncertainty of the law of the state, is a measure valued stochastic process $\mu(t)$ and the control of the other player is a classical real-valued stochastic process $u(t)$. This control with respect to random probability processes $\mu(t)$ on $\mathbb{R}$ is a new type of stochastic control problems that has not been studied before. By introducing operator-valued backward stochastic differential equations, we obtain a sufficient maximum principle for Nash equilibria for such games in the general nonzero-sum case, and saddle points for zero-sum games. As an application we find an explicit solution of the problem of optimal consumption under model uncertainty of a cash flow described by a mean-field related type SDE., Comment: 19 pages

Published

2018

11. Stochastic optimal control of McKean-Vlasov equations with anticipating law

Author

Agram, Nacira

Subjects

Optimization and Control (math.OC), FOS: Mathematics, Mathematics - Optimization and Control

Abstract

In this paper, we generalise Pontryagin's stochastic maximum principle to controlled McKean-Vlasov equations with anticipating law. The associated new type of delayed backward equations with implicit terminal condition is studied.

Published

2016

12. Optimal control of forward-backward stochastic Volterra equations

Author

Agram, Nacira, Øksendal, Bernt, and Yakhlef, Samia

Subjects

Optimization and Control (math.OC), FOS: Mathematics, 60H20, 60g57, 60J70, 60J75, 93E20, 91B28, 91B70, 91B42, Mathematics - Optimization and Control

Abstract

We study the problem of optimal control of a coupled system of forward-backward stochastic Volterra equations. We use Hida-Malliavin calculus to prove a sufficient and a necessary maximum principle for the optimal control of such systems. Existence and uniqueness of backward stochastic Volterra integral equations are proved. As an application of our methods, we solve a recursive utility optimisation problem in a financial model with memory.

Published

2016

13. Mean-field delayed BSDEs in finite and infinite horizon

Author

Agram, Nacira and R��se, Elin Engen

Subjects

General Relativity and Quantum Cosmology, Optimization and Control (math.OC), FOS: Mathematics, F.2.2, I.2.7, Mathematics - Optimization and Control

Abstract

We establish sufficient conditions for the existence and uniqueness of different types of delayed BSDEs in finite time horizon. We consider then infinite horizon, replacing the terminal value condition in the finite horizon case with a condition of strong decay at infinity., 10 pages

Published

2015

14. Optimal control of forward-backward mean-field stochastic delayed systems

Author

Agram, Nacira and Rose, Elin Engen

Subjects

Optimization and Control (math.OC), FOS: Mathematics, Mathematics - Optimization and Control

Abstract

We study methods for solving stochastic control problems of systems of forward-backward mean-field equations with delay, in finite or infinite horizon. Necessary and sufficient maximum principles under partial information are given. The results are applied to solve a recursive utility optimal problem

Published

2014