I don't think you can. The standard deviation is going to depend on the distribution of the observations much more so than the confidence intervals. For example, consider (sorry for the poor formating)
x = -a (p = 0.025)
0 (p = 0.95)
a (p = 0.025)
and
y = -a (p = 0.025)
-a+e (p = 0.475)
a-e (p = 0.475)
a (p = 0.025)
x and y will have the same mean and 95% confidence intervals, but different standard deviations.
