Essentially it's how far a mutation can be away from the last value.
"As far as real-valued search spaces are concerned, mutation is normally performed by adding a normally distributed random value to each vector component. The step size or mutation strength (i.e. the standard deviation of the normal distribution) is often governed by self-adaptation (see evolution window)."
That's complex talk for given a vector you are mutating (say X = [x1,x2,..,xN]) then you'll modify that vector's values by some random amount that won't be more than the mutation step size. So say we had a function called normal(v,stdDev) that generated random values with a normal distribution around some value with stdDev. Then we'd modify each value of that vector with the following psuedo code:
for x in X {
x = normal(x,mutationStepSize)
}