In this paper we introduce the concept of \textit{conic martingales}. This class refers to stochastic processes having the martingale property, but that evolve within given (possibly time-dependent) boundaries. We first review some results about the martingale property of solution to driftless stochastic differential equations. We then provide a simple way to construct and handle such processes. Specific attention is paid to martingales in $[0,1]$. One of these martingales proves to be analytically tractable. It is shown that up to shifting and rescaling constants, it is the only martingale (with the trivial constant, Brownian motion and Geometric Brownian motion) having a separable diffusion coefficient $\sigma(t,y)=g(t)h(y)$ and that can ...
Let Q and P be equivalent probability measures and let ψ be a J-dimensional vector of random variabl...
Being a systematic treatment of the modern theory of stochastic integrals and stochastic differentia...
Lyons TJ, Röckner M, Zhang TS. Martingale decomposition of Dirichlet processes on the Banach space C...
International audienceIn this paper we introduce the concept of \textit{conic martingales}. This cla...
In this paper we focus on continuous martingales evolving in the unit interval [0,1]. We first revie...
In this paper we focus on continuous martingales evolving in the unit interval $[0,1]$. We first rev...
Mathematical finance extensively relies on martingales. In some cases, they need to meet constraints...
Abstract. For a real Borel measurable function b, which satisfies certain integrability conditions, ...
For a real Borel measurable function b, which satisfies certain integrability conditions, it is poss...
AbstractLet {Xt} be a continuous square integrable martingale. Denote its increasing (natural) proce...
This book offers a rigorous and self-contained presentation of stochastic integration and stochastic...
The stochastic exponential $Z_t=\exp\{M_t-M_0-(1/2) _t\}$ of a continuous local martingale $M$ is it...
The stochastic exponential Zt=expMt−M0−(12)MMt of a continuous local martingale M is itself a conti...
In the recent years, several groups have studied stochastic equations (e.g. SDE's, SPDE's, stochasti...
AbstractLet M be a square integrable martingale indexed by [0, 1]2 with respect to a filtration whic...
Let Q and P be equivalent probability measures and let ψ be a J-dimensional vector of random variabl...
Being a systematic treatment of the modern theory of stochastic integrals and stochastic differentia...
Lyons TJ, Röckner M, Zhang TS. Martingale decomposition of Dirichlet processes on the Banach space C...
International audienceIn this paper we introduce the concept of \textit{conic martingales}. This cla...
In this paper we focus on continuous martingales evolving in the unit interval [0,1]. We first revie...
In this paper we focus on continuous martingales evolving in the unit interval $[0,1]$. We first rev...
Mathematical finance extensively relies on martingales. In some cases, they need to meet constraints...
Abstract. For a real Borel measurable function b, which satisfies certain integrability conditions, ...
For a real Borel measurable function b, which satisfies certain integrability conditions, it is poss...
AbstractLet {Xt} be a continuous square integrable martingale. Denote its increasing (natural) proce...
This book offers a rigorous and self-contained presentation of stochastic integration and stochastic...
The stochastic exponential $Z_t=\exp\{M_t-M_0-(1/2) _t\}$ of a continuous local martingale $M$ is it...
The stochastic exponential Zt=expMt−M0−(12)MMt of a continuous local martingale M is itself a conti...
In the recent years, several groups have studied stochastic equations (e.g. SDE's, SPDE's, stochasti...
AbstractLet M be a square integrable martingale indexed by [0, 1]2 with respect to a filtration whic...
Let Q and P be equivalent probability measures and let ψ be a J-dimensional vector of random variabl...
Being a systematic treatment of the modern theory of stochastic integrals and stochastic differentia...
Lyons TJ, Röckner M, Zhang TS. Martingale decomposition of Dirichlet processes on the Banach space C...