Radial basis function network: Difference between revisions
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In the [[stochastic calculus]], '''Tanaka's formula''' states that | |||
:<math>|B_t| = \int_0^t \sgn(B_s)\, dB_s + L_t</math> | |||
where ''B''<sub>''t''</sub> is the standard [[Brownian motion]], sgn denotes the [[sign function]] | |||
:<math>\sgn (x) = \begin{cases} +1, & x \geq 0; \\ -1, & x < 0. \end{cases}</math> | |||
and ''L''<sub>''t''</sub> is its [[Local time (mathematics)|local time]] at 0 (the local time spent by ''B'' at 0 before time ''t'') given by the [[Lp space|''L''<sup>2</sup>-limit]] | |||
:<math>L_{t} = \lim_{\varepsilon \downarrow 0} \frac1{2 \varepsilon} | \{ s \in [0, t] | B_{s} \in (- \varepsilon, + \varepsilon) \} |.</math> | |||
Tanaka's formula is the explicit [[Doob–Meyer decomposition theorem|Doob–Meyer decomposition]] of the submartingale |''B''<sub>''t''</sub>| into the [[martingale (probability theory)|martingale]] part (the [[integral]] on the right-hand side), and a continuous increasing process (local time). It can also be seen as the analogue of [[Itō's lemma]] for the (nonsmooth) absolute value function <math>f(x)=|x|</math>, with <math> f'(x) = \sgn(x)</math> and <math> f''(x) = 2\delta(x) </math>; see [[Local time (mathematics)|local time]] for a formal explanation of the Itō term. | |||
== Outline of proof == | |||
The [[Function (mathematics)|function]] |''x''| is not [[smooth function|''C''<sup>2</sup>]] in ''x'' at ''x'' = 0, so we cannot apply [[Itō's formula]] directly. But if we approximate it near zero (i.e. in [−''ε'', ''ε'']) by [[parabola]]s | |||
:<math>\frac{x^2}{2|\varepsilon|}+\frac{|\varepsilon|}{2}.</math> | |||
And using [[Itō's formula]] we can then take the [[Limit (mathematics)|limit]] as ''ε'' → 0, leading to Tanaka's formula. | |||
== References == | |||
* {{cite book | |||
| last = Øksendal | |||
| first = Bernt K. | |||
| authorlink = Bernt Øksendal | |||
| title = Stochastic Differential Equations: An Introduction with Applications | |||
| edition = Sixth edition | |||
| publisher=Springer | |||
| location = Berlin | |||
| year = 2003 | |||
| isbn = 3-540-04758-1 | |||
}} (Example 5.3.2) | |||
* {{cite book | |||
| last = Shiryaev | |||
| first = Albert N. | |||
|authorlink= Albert Shiryaev | |||
| title = Essentials of stochastic finance: Facts, models, theory | |||
| series = Advanced Series on Statistical Science & Applied Probability No. 3 | |||
|coauthors = trans. N. Kruzhilin | |||
|publisher = World Scientific Publishing Co. Inc. | |||
| location = River Edge, NJ | |||
| year = 1999 | |||
| isbn = 981-02-3605-0 | |||
}} | |||
[[Category:Equations]] | |||
[[Category:Martingale theory]] | |||
[[Category:Probability theorems]] | |||
Revision as of 02:56, 29 January 2014
In the stochastic calculus, Tanaka's formula states that
where Bt is the standard Brownian motion, sgn denotes the sign function
and Lt is its local time at 0 (the local time spent by B at 0 before time t) given by the L2-limit
Tanaka's formula is the explicit Doob–Meyer decomposition of the submartingale |Bt| into the martingale part (the integral on the right-hand side), and a continuous increasing process (local time). It can also be seen as the analogue of Itō's lemma for the (nonsmooth) absolute value function , with and ; see local time for a formal explanation of the Itō term.
Outline of proof
The function |x| is not C2 in x at x = 0, so we cannot apply Itō's formula directly. But if we approximate it near zero (i.e. in [−ε, ε]) by parabolas
And using Itō's formula we can then take the limit as ε → 0, leading to Tanaka's formula.
References
- 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534 (Example 5.3.2) - 20 year-old Real Estate Agent Rusty from Saint-Paul, has hobbies and interests which includes monopoly, property developers in singapore and poker. Will soon undertake a contiki trip that may include going to the Lower Valley of the Omo.
My blog: http://www.primaboinca.com/view_profile.php?userid=5889534