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Questions tagged [stochastic-calculus]

Stochastic calculus is a branch of mathematics that operates on stochastic processes. It allows a consistent theory of integration to be defined for integrals of stochastic processes with respect to stochastic processes. It is used to model systems that behave randomly.

The main flavors of stochastic calculus are the Itô calculus and its variational relative the Malliavin calculus. For technical reasons the Itô integral is the most useful for general classes of , such as semimartingale processes, but the related Stratonovich integral is frequently useful in problem formulation.

The Stratonovich integral can readily be expressed in terms of the Itô integral. The main benefit of the Stratonovich integral is that it obeys the usual chain rule and therefore does not require Ito's lemma. This enables problems to be expressed in a coordinate system invariant form, which is invaluable when developing stochastic calculus on manifolds other than $\mathbb{R}^n$.

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Error, calculating covariance between two stochastic variables

In my exercise, I'm given two independent discrete stochastic variables, with the probability function; $$ p_{X}\left(x\right)=\left\{ \begin{array}{cc} \frac{1}{4} & \text{if } x = -1 \\ \frac{1}{4} & \text{if } x = 0 \\ \frac{1}{2} & \text{if } x…
Skeen
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Why does the following differential formula hold?

I am currently studying Stochastic Calculus for Continuous Time Finance models. I have stumbled upon the equation $$ d ln(S_t) = \frac{dS_t}{S_t} - \frac{1}{2S_t^2}(d(S(t))^2 $$ Why does that hold? I really do not get it. I thought that $$ dln(S_t)…
Zebraboard
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How to write a step function in stochastic calculus?

Suppose have a constant stochastic process $X(s)=k$. Suppose we have some other function $B_{s}$ and we are interested in computing $$\int_{0}^{t} X(s) dB_{s} =\int_{0}^{t} k dB_{s}=k\int_{0}^{t} dB_{s} = kB_{s}|_{0}^{t}=k(B_{t}-B_{0})$$ Now,…
Stan Shunpike
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Ito's formula for the given expression

$d(g(t)B(t)e^{B(t)})$ how can I calculate this using Ito's formula. I keep getting wrong answers all the time. I am using the Ito's chain rule for $e^{B(t)}$. Obtaining $e^{B(t)}dB(t)+1/2e^{B(t)}dt$.
GAUSS
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Difference between gamblers fallacy and multiple corona tests

I have a hard time grasping gamblers fallacy. When you flip a coin 100 times and it shows heads, flipping it again results always in a 50-50 chance for heads an tails. That is kind of logical, because past events cannot influence current outcomes.…
brandbenni
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how to express a uniform distribution with brownian motion (stochastic calculus)

I'd like to express a uniform distribution $U[0,1]$ as a function of a Brownian motion $w(t)$. Specifically, I am thinking about this problem in two versions of model setups. Model setup version 1 is: The total income of the society follows a…
cuteDP
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black-scholes market and european calls using drexel

Given is a Black–Scholes market with r = 0.2, α = 0.1, σ = 0.4, S0 = 80. You today (t = 0) sold a European call option based on the stock with an expiration date of T = 10 at a strike price of K = 90. You build a hedging portfolio for that option.…
bubbles562
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Confusion using Ito product rule in stochastic calculus

To calculate the Ito differential of the quantity $\frac{A}{B}$ I can use the Ito product rule which gives $$ d (\frac{A}{B})=\frac{dA}{B}-\frac{A}{B^{2}}dB-\frac{1}{B^{2}}dA dB $$ if I now let $B=A$, I should obtain the…
Robson Christie
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On the covariance of this process: $X_t=\int_0^t \text{sgn}(Bs)dBs$

Given $B_t$, $t \ge 0$ a Brownian motion on $(\Omega,\mathcal{F},\mathbb{P})$, computer the covariance of the process $$X_t=\int_0^t \text{sgn}(Bs)dBs$$ It was recommended in the question that I use Itô's Isometry and the hint that…
jeffery_the_wind
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How to prove this using Ito's lemma?

I am stuck at the following formula which I need to prove using Ito's calculus. $$\frac{1}{T}\int_0^T W_t^2 dt=\frac{T}{2}+\int_0^T 2W_t \left(1-\frac{t}{T}\right) dW_t$$ How to prove this?
Bravo
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what is the formula to calculate $dX_t$?

If $X_t= e^{W_t}g(t)$ where $W_t$ is an Wiener process and $g(t)\in C^2[0,\infty)$, could any one tell me what is the formula to calculate $dX_t$? Thanks so much. what about if $Y_t= \sqrt{X_t}$?, the same formuale to find $dY_t$?
Myshkin
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For which p>0 does $S_t=W_t+t^p$ admit an equivalent martingale measure?

Let $W$ be a brownian motion and $p>0$. For which $p$ does $S_t=W_t+t^p$ admit an equivalent martingale measure? I recently saw at my lectures that: NFLVR cond: There does not exist a sequence $\{H_n\}_{n \geq 1}$ of predictable processes,…
htd
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If $M_n$ is a a martingale, how to prove the following properties?

Another confusion: from the definition, if $M_n$ is a martingale $~E(M_{n+1}|\mathscr{F}_n)=M_n~$ could it implies $~E(M_{n+1}|\mathscr{F}_k)=M_k~,~~ k\le n~$.
AlieZ777777
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Characteristic function of Multi dimensional Brownian motion stopped at hitting time

I am trying to solve the following question: denote $(X_t,Y_t)$ a Brownian motion in $\mathbb{R}^n\times\mathbb{R}$ starting from $(0,a)$ with $a>0$. Let $T_a=\inf\{t:Y_t=0 \}$. Prove that the characteristic function of $X_{T_a}$ is $\exp(-a \Vert…
Onstack01
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Questions about existence and uniqueness theorem for stochastic differential equations in Oksendal's SDE book

In Oksendal's SDE book, Theorem 5.2.1. (Existence and uniqueness theorem for stochastic differential equations) assumes $Z$ is a random variable which is independent of the sigma algebra $\mathcal F_\infty^{(m)}$ generated by $B_s, s \geq 0$ and…
Tim
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