原题链接在这里:https://leetcode.com/problems/longest-absolute-file-path/
题目:
Suppose we abstract our file system by a string in the following manner:
The string "dir\n\tsubdir1\n\tsubdir2\n\t\tfile.ext"
represents:
dir subdir1 subdir2 file.ext
The directory dir
contains an empty sub-directory subdir1
and a sub-directory subdir2
containing a file file.ext
.
The string "dir\n\tsubdir1\n\t\tfile1.ext\n\t\tsubsubdir1\n\tsubdir2\n\t\tsubsubdir2\n\t\t\tfile2.ext"
represents:
dir subdir1 file1.ext subsubdir1 subdir2 subsubdir2 file2.ext
The directory dir
contains two sub-directories subdir1
and subdir2
. subdir1
contains a file file1.ext
and an empty second-level sub-directory subsubdir1
. subdir2
contains a second-level sub-directory subsubdir2
containing a file file2.ext
.
We are interested in finding the longest (number of characters) absolute path to a file within our file system. For example, in the second example above, the longest absolute path is "dir/subdir2/subsubdir2/file2.ext"
, and its length is 32
(not including the double quotes).
Given a string representing the file system in the above format, return the length of the longest absolute path to file in the abstracted file system. If there is no file in the system, return 0
.
Note:
- The name of a file contains at least a
.
and an extension. - The name of a directory or sub-directory will not contain a
.
.
Time complexity required: O(n)
where n
is the size of the input string.
Notice that a/aa/aaa/file1.txt
is not the longest file path, if there is another path aaaaaaaaaaaaaaaaaaaaa/sth.png
.
题解:
The longest absolute file path ends with file containing ".".
First separate input staring by "\n", now each line is one part.
For each line, have its last index of "\t" + 1 as level.
Now try to find its parent. While stack size is > level, pop the stack. When stack size == level, the stack top is the parent.
We have parent + "\" and append current part - length of "\t" as the new candidate.
If candidate contains ".", update the longest path length.
Push current candidate to the stack.
Time Complexity: O(n).n = input.length(). Each part could be in and out of stack once.
Space: O(n).
AC Java:
1 class Solution { 2 public int lengthLongestPath(String input) { 3 if(input == null || input.length() == 0){ 4 return 0; 5 } 6 7 String [] parts = input.split("\n"); 8 Stackstk = new Stack<>(); 9 int res = 0; 10 11 for(String part : parts){ 12 int level = part.lastIndexOf("\t") + 1; 13 while(stk.size() > level){ 14 stk.pop(); 15 } 16 17 int parent = stk.isEmpty() ? 0 : stk.peek() + 1; 18 int can = parent + part.length() - level; 19 if(part.indexOf(".") != -1){ 20 res = Math.max(res, can); 21 } 22 23 stk.push(can); 24 } 25 26 return res; 27 } 28 }