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awarded  Popular Question
Jan
4
answered Probability in two throws of $3$ indistinguishable dice
Nov
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Dec
10
accepted Solution to $\frac{\partial G}{\partial t}=(1-s)\left(-k_1G+k_2\frac{\partial G}{\partial s}\right)$
Dec
9
comment Solution to $\frac{\partial G}{\partial t}=(1-s)\left(-k_1G+k_2\frac{\partial G}{\partial s}\right)$
Yes, $s\in \mathbb{R}$ and $t \ge 0$. I'll look up the method of characteristics.
Dec
9
revised Solution to $\frac{\partial G}{\partial t}=(1-s)\left(-k_1G+k_2\frac{\partial G}{\partial s}\right)$
added 59 characters in body
Dec
9
asked Solution to $\frac{\partial G}{\partial t}=(1-s)\left(-k_1G+k_2\frac{\partial G}{\partial s}\right)$
Nov
9
awarded  Yearling
Oct
11
accepted Why can I exchange the order of integration in a multiple Ito stochastic integral?
Oct
10
comment Why can I exchange the order of integration in a multiple Ito stochastic integral?
In the portion where I set W=s^2, I am not talking about stochastic integrals, but instead just a regular integral, so your criticisms do not make sense.
Oct
10
comment Why can I exchange the order of integration in a multiple Ito stochastic integral?
$(s+ds)^2 - s^2 = 2s ds + ds^2 = 2s ds$
Oct
10
asked Why can I exchange the order of integration in a multiple Ito stochastic integral?