Borel's paradox Guide, Meaning , Facts, Information and Description
Borel's paradox (sometimes known as the Borel-Kolmogorov paradox) is a paradox of probability theory relating to conditional probability density functions.Suppose we have two random variables, X and Y, with joint probability density pX,Y(x,y). We can form the conditional density for Y given X,
where pX(x) is the appropriate marginal distribution.
Using the substitution rule, we can reparameterize the joint distribution with the functions U= f(X,Y), V = g(X,Y), and can then form the condition density for V given U.
Given a particular condition on X and the equivalent condition on U, intuition suggests that the conditional densities pY|X(y|x) and pV|U(v|u) should also be equivalent. This is not the case in general.
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We are given the joint probability density
So the conditional density of Y given X is
which is uniform with respect to y.
Now, we apply the following transformation:
Using the substitution rule, we obtain
So the conditional density of V given U is
which is not uniform with respect to v.A concrete example
A uniform distribution
shows the support of this distribution.
The marginal density of X is calculated to beReparameterization
shows the support of this distribution.
The marginal distribution is calculated to be