We present a necessary and sufficient condition for a stochastic exponential to be a true martingale. It is proved that the criteria for the true martingale property are related to whether a related process explodes. An alternative and interesting interpretation of this result is that the stochastic exponential is a true martingale if and only if under a 'candidate measure' the integrand process is square integrable over time. Applications of our theorem to problems arising in mathematical finance are also given
AbstractIn this paper, we shall firstly illustrate why we should consider integral of a stochastic p...
In this paper we generalize the martingale of Kella and Whitt to the setting of Lévy-type processes ...
Examples of square integrable martingales adapted to processes with independent increments and ortho...
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...
This note studies the martingale property of a nonnegative, continuous local martingale Z, given as ...
The stochastic exponential Zt=expMt−M0−(12)MMt of a continuous local martingale M is itself a conti...
The martingale property in the context of stochastic differential equations Johannes Ruf* This note ...
Let X be a progressively measurable, almost surely right-continuous stochastic process such that Xτ ...
The stochastic exponential $Z_t=\exp\{M_t-M_0-(1/2) _t\}$ of a continuous local martingale $M$ is it...
Let I⊆R⁺∪{0} be an arbitrary set with 0∈I; Ξ≡(Ω,F,(F_{t})_{t∈I},P) be a complete filtered probabilit...
AbstractLet {Xt} be a continuous square integrable martingale. Denote its increasing (natural) proce...
Pricing in mathematical finance often involves taking expected values underdifferent equivalent meas...
The paper considers a statistical concept of causality in continuous time between filtered probabili...
Exponential processes in the Ito theory of stochastic integration can be viewed in three aspects: mu...
AbstractIn this paper, we shall firstly illustrate why we should consider integral of a stochastic p...
In this paper we generalize the martingale of Kella and Whitt to the setting of Lévy-type processes ...
Examples of square integrable martingales adapted to processes with independent increments and ortho...
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...
This note studies the martingale property of a nonnegative, continuous local martingale Z, given as ...
The stochastic exponential Zt=expMt−M0−(12)MMt of a continuous local martingale M is itself a conti...
The martingale property in the context of stochastic differential equations Johannes Ruf* This note ...
Let X be a progressively measurable, almost surely right-continuous stochastic process such that Xτ ...
The stochastic exponential $Z_t=\exp\{M_t-M_0-(1/2) _t\}$ of a continuous local martingale $M$ is it...
Let I⊆R⁺∪{0} be an arbitrary set with 0∈I; Ξ≡(Ω,F,(F_{t})_{t∈I},P) be a complete filtered probabilit...
AbstractLet {Xt} be a continuous square integrable martingale. Denote its increasing (natural) proce...
Pricing in mathematical finance often involves taking expected values underdifferent equivalent meas...
The paper considers a statistical concept of causality in continuous time between filtered probabili...
Exponential processes in the Ito theory of stochastic integration can be viewed in three aspects: mu...
AbstractIn this paper, we shall firstly illustrate why we should consider integral of a stochastic p...
In this paper we generalize the martingale of Kella and Whitt to the setting of Lévy-type processes ...
Examples of square integrable martingales adapted to processes with independent increments and ortho...