Intuitive explanation for why QuickSort is n log n?

后端 未结 6 1110
悲&欢浪女
悲&欢浪女 2020-12-07 09:23

Is anybody able to give a \'plain english\' intuitive, yet formal, explanation of what makes QuickSort n log n? From my understanding it has to make a pass over n items, and

相关标签:
6条回答
  • 2020-12-07 09:52

    There's a key intuition behind logarithms:

    The number of times you can divide a number n by a constant before reaching 1 is O(log n).

    In other words, if you see a runtime that has an O(log n) term, there's a good chance that you'll find something that repeatedly shrinks by a constant factor.

    In quicksort, what's shrinking by a constant factor is the size of the largest recursive call at each level. Quicksort works by picking a pivot, splitting the array into two subarrays of elements smaller than the pivot and elements bigger than the pivot, then recursively sorting each subarray.

    If you pick the pivot randomly, then there's a 50% chance that the chosen pivot will be in the middle 50% of the elements, which means that there's an 80% chance that the larger of the two subarrays will be at most 75% the size of the original. (Do you see why?)

    Therefore, a good intuition for why quicksort runs in time O(n log n) is the following: each layer in the recursion tree does O(n) work, and since each recursive call has a good chance of reducing the size of the array by at least 25%, we'd expect there to be O(log n) layers before you run out of elements to throw away out of the array.

    This assumes, of course, that you're choosing pivots randomly. Many implementations of quicksort use heuristics to try to get a nice pivot without too much work, and those implementations can, unfortunately, lead to poor overall runtimes in the worst case. @Jerry Coffin's excellent answer to this question talks about some variations on quicksort that guarantee O(n log n) worst-case behavior by switching which sorting algorithms are used, and that's a great place to look for more information about this.

    0 讨论(0)
  • 2020-12-07 09:52

    Break the sorting algorithm in two parts. First is the partitioning and second recursive call. Complexity of partioning is O(N) and complexity of recursive call for ideal case is O(logN). For example, if you have 4 inputs then there will be 2(log4) recursive call. Multiplying both you get O(NlogN). It is a very basic explanation.

    0 讨论(0)
  • 2020-12-07 10:01

    Well, it's not always n(log n). It is the performance time when the pivot chosen is approximately in the middle. In worst case if you choose the smallest or the largest element as the pivot then the time will be O(n^2).

    To visualize 'n log n', you can assume the pivot to be element closest to the average of all the elements in the array to be sorted. This would partition the array into 2 parts of roughly same length. On both of these you apply the quicksort procedure.

    As in each step you go on halving the length of the array, you will do this for log n(base 2) times till you reach length = 1 i.e a sorted array of 1 element.

    0 讨论(0)
  • 2020-12-07 10:08

    Each partitioning operation takes O(n) operations (one pass on the array). In average, each partitioning divides the array to two parts (which sums up to log n operations). In total we have O(n * log n) operations.

    I.e. in average log n partitioning operations and each partitioning takes O(n) operations.

    0 讨论(0)
  • 2020-12-07 10:11

    Complexity

    A Quicksort starts by partitioning the input into two chunks: it chooses a "pivot" value, and partitions the input into those less than the pivot value and those larger than the pivot value (and, of course, any equal to the pivot value have go into one or the other, of course, but for a basic description, it doesn't matter a lot which those end up in).

    Since the input (by definition) isn't sorted, to partition it like that, it has to look at every item in the input, so that's an O(N) operation. After it's partitioned the input the first time, it recursively sorts each of those "chunks". Each of those recursive calls looks at every one of its inputs, so between the two calls it ends up visiting every input value (again). So, at the first "level" of partitioning, we have one call that looks at every input item. At the second level, we have two partitioning steps, but between the two, they (again) look at every input item. Each successive level has more individual partitioning steps, but in total the calls at each level look at all the input items.

    It continues partitioning the input into smaller and smaller pieces until it reaches some lower limit on the size of a partition. The smallest that could possibly be would be a single item in each partition.

    Ideal Case

    In the ideal case we hope each partitioning step breaks the input in half. The "halves" probably won't be precisely equal, but if we choose the pivot well, they should be pretty close. To keep the math simple, let's assume perfect partitioning, so we get exact halves every time.

    In this case, the number of times we can break it in half will be the base-2 logarithm of the number of inputs. For example, given 128 inputs, we get partition sizes of 64, 32, 16, 8, 4, 2, and 1. That's 7 levels of partitioning (and yes log2(128) = 7).

    So, we have log(N) partitioning "levels", and each level has to visit all N inputs. So, log(N) levels times N operations per level gives us O(N log N) overall complexity.

    Worst Case

    Now let's revisit that assumption that each partitioning level will "break" the input precisely in half. Depending on how good a choice of partitioning element we make, we might not get precisely equal halves. So what's the worst that could happen? The worst case is a pivot that's actually the smallest or largest element in the input. In this case, we do an O(N) partitioning level, but instead of getting two halves of equal size, we've ended up with one partition of one element, and one partition of N-1 elements. If that happens for every level of partitioning, we obviously end up doing O(N) partitioning levels before even partition is down to one element.

    This gives the technically correct big-O complexity for Quicksort (big-O officially refers to the upper bound on complexity). Since we have O(N) levels of partitioning, and each level requires O(N) steps, we end up with O(N * N) (i.e., O(N2) complexity.

    Practical implementations

    As a practical matter, a real implementation will typically stop partitioning before it actually reaches partitions of a single element. In a typical case, when a partition contains, say, 10 elements or fewer, you'll stop partitioning and and use something like an insertion sort (since it's typically faster for a small number of elements).

    Modified Algorithms

    More recently other modifications to Quicksort have been invented (e.g., Introsort, PDQ Sort) which prevent that O(N2) worst case. Introsort does so by keeping track of the current partitioning "level", and when/if it goes too deep, it'll switch to a heap sort, which is slower than Quicksort for typical inputs, but guarantees O(N log N) complexity for any inputs.

    PDQ sort adds another twist to that: since Heap sort is slower, it tries to avoid switching to heap sort if possible To to that, if it looks like it's getting poor pivot values, it'll randomly shuffle some of the inputs before choosing a pivot. Then, if (and only if) that fails to produce sufficiently better pivot values, it'll switch to using a Heap sort instead.

    0 讨论(0)
  • 2020-12-07 10:13

    In-fact you need to find the position of all the N elements(pivot),but the maximum number of comparisons is logN for each element (the first is N,second pivot N/2,3rd N/4..assuming pivot is the median element)

    0 讨论(0)
提交回复
热议问题