IV. Feasibility of Learning
1. Learning is Impossible?
Lin provides two examples to show learning seems to be impossible.
2. Probability to the Rescue
Hoeffding’s Inequality:
μ
\mu
μ is the actual frequency of event A and
ν
\nu
ν is my hypothetical frequency of event A. Hoeffding’s Inequality shows that the probability of the exitance of a huge gap(
ϵ
\epsilon
ϵ) between
μ
\mu
μ and
ν
\nu
ν is tiny when I have a large N(big data)
the statement ‘
μ
=
ν
\mu = \nu
μ=ν’ is probably approximately correct(PAC)
3. Connection to Learning
The verification flow guarantee ‘historical records’(training set) are similar to the current conditon(test set).
Check ② of this quiz:
4. Connection to Real Learning
‘Bad Data’ could happens from time to time(let’s say if you filp a coin 5 times and get 5 heads). Accroding to Hoeffding’s inequality, the probability could be tiny when you have a large data.
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