Small-valued variables convergence tolerance

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Orllaem
Orllaem on 20 Dec 2012
Please, how do I set convergence tolerance for iterative simulation of very small variable so as not to exceed the PC's rounding-off limit.
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Jan
Jan on 21 Dec 2012
@Orllaem: It would be helpful if you post more details of the problem.
Orllaem
Orllaem on 21 Dec 2012
@ all: Thanks for your comments, I am a bit busy now, I will give more details later

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Answers (1)

Jan
Jan on 20 Dec 2012
The round-off limits are relative. There is no problem for calculting values of 1.2345678901234e-187, as long as all concerned values have the same magnitude:
1.2345678901234e-187 + 1.0987654321234e-187 % Accurate!
-1.0 + 1.2345678901234e-187 + 1.0 % Loss of accuracy
Multiplying all values by 1e+187 would not change the effect.
This argument holds true until you reach realmin = 2.2251e-308. Are you talking about values smaller than 2.2251e-292?
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Jan
Jan on 21 Dec 2012
@Jose-Luis: I do not understand. Do you mean something like this: When the start value is small and the series converges slowly, an absolute convergence criterium is not appropriate, if it is too large?
José-Luis
José-Luis on 21 Dec 2012
I don't think the speed of convergence matters, but yes. An absolute convergence criterium might be inadequate if the value to be minimized is itself small (or at least of the same order of magnitude as the criterium) and doesn't show much variation.
Of course, it might not matter at all if the value to be minimized varies wildly. I should have been more careful with my language and said that the magnitude of the value might matter.

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