Let X and Y be independent random variables with "Saint-Petersburg" distribution, i.e. for any k=1,2,… their value is 2k with probability 2k1. Show that X and Y can be realized on a sufficiently big probability space such that there exists another pair of independent "Saint-Petersburg" random variables (X′,Y′) on this space with the property that X+Y=2X′+Y′I(Y′≤X′) almost surely (here I(A) denotes the indicator function of the event A).(translated by L. Erdős) college contestsMiklos Schweitzerprobabilityfunction