The sum of your probabilities must add to 1. If you reduce the probability assigned to one theory, the freed probability mass must flow into other theories to preserve the sum.
But why are we assigning probability across a spectrum of competing theories? I thought we were supposed to be assigning probability to the theories themselves.
In other words, P(X) is my best guess at X being true. P(Y) is my best guess at Y being true. In the case of two complex theories trying to explain a particular phenomenon, why does P(X) + P(Y) + P(other theories) need to equal 1?
Or am I thinking of theories that are too complex? Are you thinking of X and Y as irreducible and mutually exclusive objects?
Or am I thinking of theories that are too complex? Are you thinking of X and Y as irreducible and mutually exclusive objects?
...yes? It’s not a matter of complexity, though; the problem you might be alluding to is that the groups of theories we describe when we enunciate our thoughts can overlap.
Not to be a chore, but can you explain why?
The sum of your probabilities must add to 1. If you reduce the probability assigned to one theory, the freed probability mass must flow into other theories to preserve the sum.
But why are we assigning probability across a spectrum of competing theories? I thought we were supposed to be assigning probability to the theories themselves.
In other words, P(X) is my best guess at X being true. P(Y) is my best guess at Y being true. In the case of two complex theories trying to explain a particular phenomenon, why does P(X) + P(Y) + P(other theories) need to equal 1?
Or am I thinking of theories that are too complex? Are you thinking of X and Y as irreducible and mutually exclusive objects?
...yes? It’s not a matter of complexity, though; the problem you might be alluding to is that the groups of theories we describe when we enunciate our thoughts can overlap.