# How to find second largest number in an array in Java?

I'm just practicing some MIT java assignments. But, I'm not sure how to find the second largest number. http://ocw.csail.mit.edu/f/13

``````  public class Marathon {
public static void main(String[] arguments) {
String[] names = { "Elena", "Thomas", "Hamilton", "Suzie", "Phil",
"Matt", "Alex", "Emma", "John", "James", "Jane", "Emily",
"Daniel", "Neda", "Aaron", "Kate" };

int[] times = { 341, 273, 278, 329, 445, 402, 388, 275, 243, 334, 412,
393, 299, 343, 317, 265 };

for (int i = 0; i < names.length; i++) {
System.out.println(names[i] + ": " + times[i]);
}

System.out.println();
System.out.println("Largest Timing " + Largest(times));
System.out.println();

}

public static int Largest(int[] times) {
int maxValue = times[0];

for (int i = 1; i < times.length; i++) {
if (times[i] > maxValue) {
maxValue = times[i];
}
}
return maxValue;
}

}
``````
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Sort the array largest to smallest and subscript the 2nd element? –  alex Nov 13 '12 at 1:17
Or just have two running `maxValue`s, one greater than the other. –  irrelephant Nov 13 '12 at 1:18
Will give them a try. Thank You –  AppSensei Nov 13 '12 at 1:21
@alex, Sorting an array is overkill for finding min/max. The linear solution is pretty trivial. –  jrajav Nov 13 '12 at 1:21
Yep, sorting is overkill. See my answer. –  Hot Licks Nov 13 '12 at 1:23
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Sorting the array simply to find an order statistics is too wasteful. You can find the second largest element by following an algorithm that resembles the one that you already have, with an additional variable representing the second largest number.

Currently, the next element could be larger than the max or equal to/smaller than the max, hence a single `if` is sufficient:

``````if (times[i] > maxValue) {
maxValue = times[i];
}
``````

With two variables to consider, the next element could be

• Greater than the max - the max becomes second largest, and the next element becomes the max
• Smaller than the max but greater than the second largest - the next element becomes second largest.

A special care must be taken about the initial state. Look at the first two items, and assign the larger one to the `max` and the smaller to the second largest; start looping at the element number three, if there is one.

Here is how you can code it:

``````if (times[i] > maxValue) {
secondLargest = maxValue;
maxValue = times[i];
} else if (times[i] > secondLargest) {
secondLargest = times[i];
}
``````
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Actually, this algorithm (as "coded") breaks down if you have multiple identical "largest" values. The "secondLargest" variable will end up the same as "largest", rather than reflecting the true second-largest. To do it right the second test needs to check for SMALLER than largest in addition to being LARGER than second-largest. –  Hot Licks Nov 13 '12 at 1:51
@HotLicks, That's not necessarily a bug. This problem deals with rankings (see the original problem linked), not with finding the next smallest unique value. In fact, even a mathematically correct "second max" algorithm would probably return the same result if we're dealing with a list, and not a set. –  jrajav Nov 13 '12 at 2:10
@Kiyura -- I would argue that if an algorithm reports a "second largest" value that is the same as the "largest" value, it's broken. "Second largest" means that the value is smaller than "largest". –  Hot Licks Nov 13 '12 at 2:16
@HotLicks In the context of this problem where all numbers are distinct there is no need to deal with ties. If the logic to deal with ties is desired, an extra `if` would be necessary. –  dasblinkenlight Nov 13 '12 at 2:18
In the context of this problem there's no need to write much code, beyond "int largest = 445; int secondLargest = 412;`. –  Hot Licks Nov 13 '12 at 2:25
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Instead of resorting to sorting the array, you can simply do the following:

• Keep a `largestValue` and a `secondLargestValue`
• Loop through the entire array once, for each element:
• Check to see if the current element is greater than `largestValue`:
• If so, assign `largestValue` to `secondLargestValue`, then assign the current element to `largestValue` (think of it as shifting everything down by 1)
• If not, check to see if the current element is greater than `secondLargestValue`
• If so, assign the current element to `secondLargestValue`
• If not, do nothing.

O(n) run time

O(1) space requirement

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wow, how do you guys come up with such logic... I feel so stupid lol. I need to keep practicing. –  AppSensei Nov 13 '12 at 1:26
@Appsheriff, by diligently doing the exact same homework. :) –  jrajav Nov 13 '12 at 1:28
Minor bug, see comment dasblinkin's post. –  Hot Licks Nov 13 '12 at 1:52
@HotLicks I'm not seeing the bug :< –  sampson-chen Nov 13 '12 at 4:16

Generally speaking:

Have two values -- "largest" and "notQuite".

Initialize both to -9999 or whatever.

Scan through your list. If the number is larger than "largest", set "largest" to that number. But before you do that, copy the old "largest" value to "notQuite".

If, on the other hand, the number is smaller than "largest" but is larger than "notQuite", set "notQuite" to that number.

When you're done examining all the numbers, "notQuite" contains the second-largest.

And note that, as you fill in the above numbers, you can also keep a "largestIndex" and "notQuiteIndex" and fill those in with the corresponding array index values, so you can identify the "winning" value. Unfortunately, though, if there are multiple identical "largest" or "secondLargest" values the simple index scheme doesn't work and you need to keep a list of some sort.

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It's better to have a sentinel check for unset running values, or at least set them to Integer.MIN_VALUE. –  jrajav Nov 13 '12 at 1:30
@Kiyura -- Yep. For many cases simply initializing to -1 will suffice. Depends on the nature of your data. The odd case would be a list that consisted entirely of MIN_VALUE entries, in which case the sentinel would be needed, as there would be no "second largest". –  Hot Licks Nov 13 '12 at 1:48
Why would that case need special treatment? If the list consists entirely of MIN_VALUE, and that's what you initialize your max and secondMax to, they will both be correct at the end. –  jrajav Nov 13 '12 at 2:05
Depends on your definition of "second largest". Can they be the same?? –  Hot Licks Nov 13 '12 at 2:07
In this problem, they correspond to rankings (specifically, times people get in a competition), so yes. In fact, they should be if multiple indices have the max value. i.e., "Depends on the nature of your data" ;) –  jrajav Nov 13 '12 at 2:09
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