Sri Sharan wrote, in part:
" Ok that cleared up things a bit, but I still can't find an exact quantitative definition of what zero probability means,not in that article nor any where else on the net.Can some one provide a definition of the same "
Well, I'm sorry I cannot give you a definition without a choice of probability perspective: if you are a frequentist (I think this is the term) , then an event has probability 0 is one so that, as the number of trials approaches ∞ , the relative frequency of the event , i.e., the ratio of successes to total trials, approaches zero. Maybe someone knows what this may mean in a Bayesian model.
Is this what you are looking for?
The mathematical aspects of measure zero are:
i)∫xxdx=0 (this is equivalent to saying individual points have
measure zero)
ii) The sum of uncountably-many non-zero terms (here probabilities of individual points in a continuum) will not converge , let alone sum to 1 (note that an integral over a continuous interval is a sort of countably-infinite sample from an uncountable set).