Why is it most efficient to resize a dynamic array to 2 * array.length()?

Question

By dynamic array, I mean an array that when it becomes full we replace it with a new array having greater capacity than the previous array.

I read in a textbook that doubling the size of the array is the most efficient resizing. I want to know if this is in fact demonstrably true and not just a matter of personal preference.

We will want to minimize the amount of resizing events, because each such event requires O(n) time where n is the number of elements in the list.

We also should be careful not to make the list too big because it might be a waste of memory.

Why does the author of my textbook say that 2 * array.length() is the magic number?

Answer 1

Consider a model in which elements are only added, one at a time, and once an array is full, it is increased in size by a factor of $C$. Suppose also that resizing an array of size $x$ costs $Cx$. Adding $N = C^n$ elements (the worst case in terms of resizing cost per element) has cost $C(1+C+C^2+\cdots+C^n) \approx \frac{C^2}{C-1} N$. The amortized cost of adding an element is thus $f(C) = \frac{C^2}{C-1}$. The derivative of this function is $$ f'(C) = \frac{2C(C-1)-C^2}{(C-1)^2} = \frac{C(2-C)}{(C-1)^2}, $$ which vanishes at $C=2$. It is not hard to check that this is a minimum of $f(C)$.

Answer 2

Let $C$ be the growth factor. In practice, we don't use small $C$ because reallocation would be too frequent; we don't use large $C$ because we would waste $(C−1)/C$ of space in the worse case or $(C−1)/(2C)$ in average. I don't think there is an accurate model to compute $C$ because it is hard to precisely weight speed vs space waste. $C=2$ is something we feel comfortable most of time. It is also fast to compute (a bit shift) and may align well with typical page size which is almost always power-of-2.