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Construct continuous martingales that are close to constants

Let $\mu_0,\mu_1$ be probability measures on $\mathbb R$ that are of finite second moment and increasing in convex order, i.e. $$\int_\mathbb R f(x)\mu_0(dx) \le \int_\mathbb R f(x)\mu_1(dx)$$ holds f …
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0 votes
0 answers
172 views

A variant of Dubins–Schwarz's theorem

Let $W$ be a Brownian motion and $\alpha$, $\beta$ be two progressively measurable processes taking values in $\mathbb R_+$ s.t. $\alpha_t\le \beta_t$ for all $t\ge 0$. Define respectively $X$, $Y$ by …
Fawen90's user avatar
  • 1,409
1 vote
1 answer
189 views

On a martingale defined via some SDE

Let $W$ be a one-dimensional Brownian motion. Consider the stochastic differential equation (SDE) $$dX_t = C(t)(1-X_t)dW_t,\quad \forall t\ge 0,$$ where $C$ is a continuous and bounded function. Under …
Fawen90's user avatar
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3 votes
1 answer
464 views

Trajectory regularity of conditional expectation with additional randomness

Consider a probability space that support a standard Brownian motion $W=(W_t)$ and a random variable $Z$ that is independent of $W$. Denote by $\mathbb F^W=(\mathcal F^W_t)_t$ the natural filtration g …
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3 votes
2 answers
238 views

Can any right-continuous martingale be approximated by continuous ones?

My questions are as follows : Can we construct a sequence of continuous martingales $M^n=(M^n_t:0\le t\le T)$ (that can be defined in different probability spaces) such that ${\rm Law}(M^n)\to {\rm Law …
Fawen90's user avatar
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1 vote
0 answers
91 views

Gluing theorem for martingales

Let $M=(M_t)_{1\le t\le 2}$ be a continuous (resp. right-continuous) martingale. Denote $x:=\mathbb E[M_1]\in\mathbb R$. Can we construct on some probability space a continuous (resp. right-continuous …
Fawen90's user avatar
  • 1,409
5 votes
0 answers
302 views

Sharpness of Doob's upcrossing inequality

Provided a martingale $X$, discrete-time $X=(X_n, n\in\mathbb N)$ or continuous-time $X=(X_t, t\ge 0)$, Doob's upcrosssing inequality states that : If $U_N(a,b)$ denotes the number of up-crossings of …
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4 votes
1 answer
251 views

Explicit expression for the expected number of up-crossings of Brownian motion

Let $W$ be a standard Brownian motion starting at $1/2$, i.e. $W_0=1/2$. Set $$\tau := \inf\big\{t>0: W_t\notin (0,1)\big\}.$$ As $(W_t^2-t)_t$ is a martingale, one has $\mathbb P[W_\tau =0]=1/2 = \ma …
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0 votes
0 answers
7 views

Characterisation of a family of continuous martingales

I look for a full characterisation of the continuous martingales $X=(X_t)_{0\leq t\leq T}$ (defined on some filtered probability space as nice as possible) such that $$X_0=0\quad \mbox{ and } \quad\mathbb … Does this contraction contains all desired continuous martingales? …
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Uniqueness of the transport plan satisfying the super-martingale constraint

The answer is non due to the very simple example. Put $$\mu=\delta_0 \quad\mbox{and}\quad \nu=p\delta_{1}+(1-p)\delta_{-1}$$ where $p\in (0,1)$. A straightforward verification yields $\mu\le_{cd}\nu$ …
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1 vote
1 answer
36 views

Uniqueness of the transport plan satisfying the super-martingale constraint

Let $\mu,\nu$ be probability measures on $\mathbb R$ such that $$\int_{\mathbb R}|x| \mu(d x) + \int_{\mathbb R}|x| \nu(d x)<\infty.$$ $\mu\le_{cd} \nu$ is said to hold if $$\int_{\mathbb R}(x-y)^+\mu …
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1 vote
0 answers
125 views

Can we construct close discrete martingales if their terminal marginal laws are close?

As no answer or comment to Can we construct close martingales if their terminal marginal laws are close? … For any $\nu$ satisfying $W_2(\mu,\nu)\le \varepsilon$, can we construct two discrete-time martingales $X, Y$ (on suitable probability space) such that $${\rm Law}(X)={\rm Law}(M),\quad {\rm Law}(Y_n)= …
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2 votes
1 answer
243 views

Can we construct close martingales if their terminal marginal laws are close?

For any $\nu$ satisfying $W_2(\mu,\nu)\le \varepsilon$, can we construct two continuous martingales $X, Y$ (on suitable probability space) such that $${\rm Law}(X)={\rm Law}(M),\quad {\rm Law}(Y_1)=\nu …
Fawen90's user avatar
  • 1,409
2 votes
0 answers
277 views

Identify two continuous martingales in law as time-changed Brownian motions

Let $W$ be a Brownian motion and $\alpha$ be a progressively measurable process taking values in $\mathbb R_+$. Set $\beta_t:=\max(\alpha_t, 1)$ for all $t\ge 0$. Define respectively $X$, $Y$ by $$X_t …
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