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#1 Re: Help Me ! » another tricky integral » 2009-08-30 22:24:20
Hi Bobbym,
Thank you, for your answer.
it is just the notation...
And yes, the limits of integration are from -∞ to ∞.
Thanks!
#2 Re: Help Me ! » another tricky integral » 2009-08-28 23:36:45
Hi Bobbym,
You are right, the function is 1D, but it is easy to increase dimensions...
My goal is not to "get the job done", but to get the job done in a smart way... 
the goal is a closed form...
Do you think IBP can help in this case? any suggestion?
Thanks
#3 Re: Help Me ! » another tricky integral » 2009-08-28 20:15:11
Hi Bobbym,
Thank you!
Numerical integration and asymptotic analysis.
If
have multiple dimensions...
Well I have to go to a casino in Monte Carlo...
or visit Laurent series and
function...asymptotic analysis, I wasn't looking in that direction... THANK YOU!
Can I ask for a good book in that subject?
#4 Re: Help Me ! » Simple question about two real variables » 2009-08-28 08:54:25
you only have trivial solutions for your problem...
x=y=1 or x=y=0 with any a
#5 Re: Help Me ! » roots of equation » 2009-08-28 08:25:57
Can I say that a periodic function has the same value in infinite multiple values?
you can look to
as a circle, one perspective of a periodic function...
in that sense, you have infinite multiple time values with the same angle value, the solution of your equation...
If you don't reduce the angle to a circle you will count the rotations, coded in the angle value... but it is only a different representation of the periodic function... the value of the function is the same...
hope this is useful... 
#6 Re: Help Me ! » another tricky integral » 2009-08-28 07:40:54
Hi George,
Thank you for your interest.
Do I need to have a use for it?
I'm trying to solve this integral just as an exercise.
Is it impossible?
#7 Re: Help Me ! » another tricky integral » 2009-08-28 07:34:54
Hi Bobbym,
Thank you for your answer.
You can look to the function and if it is normalized, you have a probability density function... correct.
About the Gaussian, all the fun is in u2 and s2, without them you don't have the square root of a sum, the other part of the fun...
Is it impossible?
#8 Help Me ! » another tricky integral » 2009-08-19 23:13:16
- ac
- Replies: 11
Dear all,
I'm trying to solve this integral:
with
constants and real
Please, help me!
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