902. Numbers At Most N Given Digit Set
Problem Description
The problem asks us to determine how many positive integers we can generate that are less than or equal to a given integer n
, using the given set of digits. The digits are provided in a non-decreasing array, and you can use each digit as many times as desired to form numbers. For instance, if the digit set is [1, 3, 5]
, you can form numbers such as 13
, 551
, and 1351315
. Importantly, the numbers we create must be less than or equal to n
.
Intuition
The given problem is a classic case of digit dynamic programming (DP) combined with the concept of combinatorial mathematics. The algorithm counts all valid numbers up to the length of n
considering the following:
- For each length
i
smaller than the number of digits inn
, we calculate how many distinct numbers can be formed using the available digits. - To handle the constraint that formed numbers must be less than or equal to
n
, we compare the generated digits with the corresponding digits ofn
when we reach the same number of digits as inn
. - If we have a leading zero (which means we haven't started writing digits of the number yet), it's a special case and must be handled differently because we don't count these leading zeros as part of a number.
The recursive function dfs
(depth-first search) is used to traverse through the possibilities. We use several parameters for our DFS function:
pos
: Positions left to fill in our number. This can be thought of as the place value we're currently considering.lead
: A boolean flag indicating whether we have started creating our number or are still at leading zeroes.limit
: A boolean flag indicating whether we're limited by the digit at our current position ofn
.
At each recursive call, we:
- Decide whether to place a digit at the current position or not.
- If we place a digit, check if the digit is in the set of allowed digits.
- If we are at the last digit (
pos
is 1), ensure we do not exceed the corresponding digit ofn
iflimit
is True.
Moreover, the algorithm is optimized using memoization (@cache
) to avoid recomputations of states that we have already calculated. We build up an answer by counting all the valid combinations recursively, and our base case checks whether we have filled out all the positions and met the conditions.
Learn more about Math, Binary Search and Dynamic Programming patterns.
Solution Approach
In the given solution, we have implemented several important concepts:
-
Depth-First Search (DFS) and Memoization: The
dfs
function represents a depth-first recursive search with memoization. The memoization is enabled using the@cache
decorator which stores the results of previous computations and avoids redundant calculations. -
Digit-wise Comparison and Computation: We compare each digit of the potential numbers with the corresponding digit in
n
. This comparison dictates whether we have a limit to follow (if the current digit of the potential number is the same as the one at the corresponding position inn
). -
Handling Leading Zeros: The
lead
variable serves a dual purpose. Initially, it isTrue
to indicate that we haven't started forming the number (we're at leading zeros). As soon as we place a nonzero digit from our set, we setlead
toFalse
. Leading zeros are not counted as part of a number, so they are handled differently. -
Breaking Down the Problem: The problem is simplified by considering it digit by digit. For each digit position from right to left, we explore all possible digit options from the given set.
Here's a detailed breakdown of the solution implementation:
-
The main function
atMostNGivenDigitSet
begins by initializing a few variables.l
will keep track of the length of the numbern
.a
is an array of size 12 (since the constraints of the problem assuren
will have at most 10 digits, additional space is for safety).s
is a set that stores the digits provided in the digit set (for constant-time access). -
We populate
a
with the digits ofn
by progressively dividingn
by 10 and storing the remainder. This effectively storesn
in a reversed manner (least significant digit first). -
dfs
is then called with the position set to the length ofn
,lead
set toTrue
, andlimit
set toTrue
. Thedfs
function will now try to compute the count of numbers recursively. -
Inside
dfs
, we first check the base case: ifpos
is 0, it means we have already formed our number and check iflead
isFalse
(which means we actually started the number and it isn't just leading zeros). If this is the case, we return 1 for a valid number, else 0. -
If not the base case, we then determine the upper bound (
up
) for the current position. If we are limited byn
,up
will be the current digit inn
. Otherwise, it's 9 (since it's the largest digit we could place). -
We loop through all digits from 0 to
up
(includingup
). For each digit, we determine if we can place that digit into our current position either if it's a leading zero (and we still haven't started the number), or if it's a digit from our set. If it's a zero andlead
isTrue
, we recursively calldfs
with decrementedpos
, the samelead
, andlimit
updated accordingly (limit and i == up
). If it's a digit in our set,lead
is set toFalse
. -
We sum up the results and return them, giving a count of all the valid combinations that can form a number less than or equal to
n
given the constraints.
The code effectively uses a bottom-up approach since it starts from the least significant digit and works its way to the most significant, calculating the number of possibilities at each step and letting the recursion handle the complexity.
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Start EvaluatorExample Walkthrough
To illustrate the solution approach, let's use the digit set [1, 3, 5]
and the target integer n = 300
.
Walkthrough using the digit set [1, 3, 5]
:
- We start by storing the digits of
n
in reverse order in an arraya
, which will be[0, 0, 3]
. - We initialize our
dfs
withpos
at 3 (the length ofn
),lead
asTrue
(indicating leading zeros), andlimit
asTrue
(indicating we must respect the digits inn
).
Let's begin by running the dfs
function:
-
On the first call,
dfs(3, True, True)
, we check digits from0
to3
(since3
is the current digit ofn
at the position we're at, and we're underlimit
):- Choosing
0
gives us a call todfs(2, True, True)
(still leading zeros). - Choosing
1
or3
setslead
toFalse
and makes recursive callsdfs(2, False, True)
anddfs(2, False, False)
respectively because we can only match3
once without a limit.
- Choosing
-
After the above, we proceed with calls like
dfs(2, False, True)
. At position 2, sincea[2]
is0
, our upper bound is9
aslimit
isFalse
now:- Again, zeros are skipped and we consider digits
1
,3
, and5
(from our set), making recursive callsdfs(1, False, False)
for each since there is no upper bound anymore.
- Again, zeros are skipped and we consider digits
-
Now at the last position with
dfs(1, False, False)
, we have an upper bound of9
, and we can place any digit from our set, resulting in callsdfs(0, False, False)
for each selected digit. -
Once
pos
reaches0
, we've successfully formed a number without violating any constraints and the base case returns1
indicating a valid number count. If at any point, a digit choice is not in our digit set, then that branch of the recursive tree does not contribute to the count.
Counting each of these valid calls, we get:
- For
dfs(2, True, True)
, which corresponds to having one leading zero and two positions to fill, only1
and3
lead to valid numbers. - For
dfs(1, False, False)
, all digits1
,3
, and5
are valid choices for each of the previous positions.
Therefore, for n = 300
with the given set [1, 3, 5]
:
- The number of possible numeric combinations of one digit is
3
(since1
,3
, and5
are all ≤3
and0
doesn't count). - The number of possible numeric combinations of two digits is
3 * 3
because for each valid single-digit number, we can append any of the digits from the set at the tens place (1X
,3X
, and5X
whereX
can again be1
,3
, or5
). - For three digits, we initially have the possibility of
1XX
or3XX
. We cannot use5
in the hundreds place because that would exceed300
. So we have an additional3 * 3
(for1XX
) plus another3 * 3
(for3XX
) combinations, giving us18
for this case.
By aggregating these counts, we get a total number of positive integers less than or equal to 300
, which can be formed using the digits [1, 3, 5]
: the sum is 3 + 9 + 18
, amounting to 30
.
Solution Implementation
1from typing import List
2from functools import cache
3
4class Solution:
5 def at_most_n_given_digit_set(self, digits: List[str], n: int) -> int:
6 # Helper function that performs Depth First Search (DFS) to find the count.
7 @cache
8 def dfs(position, is_leading, is_limit):
9 # If the position is less than or equal to 0, check if leading zero is still true.
10 if position <= 0:
11 return int(not is_leading)
12
13 # Use the upper bound 'a[position]' if limit is true, otherwise default to 9
14 upper_bound = a[position] if is_limit else 9
15 count = 0
16 for i in range(upper_bound + 1):
17 # If the current digit is a leading zero, continue the DFS without changing leading status
18 if i == 0 and is_leading:
19 count += dfs(position - 1, is_leading, is_limit and i == upper_bound)
20 # If the digit is in our digit set, continue the DFS counting this digit
21 elif i in digit_set:
22 count += dfs(position - 1, False, is_limit and i == upper_bound)
23 return count
24
25 # Calculate the length of the number 'n' and populate the 'a' array with each digit.
26 length_of_n = 0
27 a = [0] * 12 # Array initialized to store each digit in reverse.
28 digit_set = {int(d) for d in digits} # Store digits as integers in a set for easy access.
29
30 # Extract digits of 'n' and store in 'a' starting from 'a[1]'
31 while n:
32 length_of_n += 1
33 a[length_of_n] = n % 10
34 n //= 10
35
36 # Initiate DFS from the most significant digit, indicating we have a leading zero and are limited by 'n'.
37 return dfs(length_of_n, True, True)
38
39# An example call to the function:
40# sol = Solution()
41# print(sol.at_most_n_given_digit_set(["1","3","5","7"], 100)) # This would return the count of numbers <= 100.
42
1class Solution {
2 private int[] digitsArray = new int[12]; // Array to store digits of the number n
3 private int[][] memo = new int[12][2]; // Memoization table for dynamic programming
4 private Set<Integer> digitSet = new HashSet<>(); // Set to store the unique digits
5
6 // Main function to calculate numbers with digits up to n
7 public int atMostNGivenDigitSet(String[] digits, int n) {
8 // Initialize memoization table with -1, which denotes that the values haven't been calculated yet
9 for (int[] row : memo) {
10 Arrays.fill(row, -1);
11 }
12
13 // Fill digitSet with the digits provided in the input
14 for (String digit : digits) {
15 digitSet.add(Integer.parseInt(digit));
16 }
17
18 // Split the number n into its digits and fill digitsArray
19 int length = 0; // Length of the number n in terms of digits
20 while (n > 0) {
21 digitsArray[++length] = n % 10;
22 n /= 10;
23 }
24
25 // Start dynamic programming with depth-first search
26 return dfs(length, 1, true);
27 }
28
29 // Helper DFS method with memoization
30 private int dfs(int position, int isLeading, boolean isLimit) {
31 // Base case: if there are no more digits to process
32 if (position <= 0) {
33 return isLeading ^ 1; // If leading, return 0, else return 1
34 }
35 // Check memo table if answer already computed for this sub-problem
36 if (!isLimit && isLeading != 1 && memo[position][isLeading] != -1) {
37 return memo[position][isLeading];
38 }
39
40 int count = 0; // Counter for valid numbers
41 int upperBound = isLimit ? digitsArray[position] : 9; // Determine upper bound for loop
42
43 // Loop through all valid digit choices
44 for (int i = 0; i <= upperBound; ++i) {
45 if (i == 0 && isLeading == 1) {
46 // If i = 0 and this is the leading digit, do not add i to the sequence yet
47 count += dfs(position - 1, isLeading, isLimit && i == upperBound);
48 } else if (digitSet.contains(i)) {
49 // If the digit is in the given set, include it and continue
50 count += dfs(position - 1, 0, isLimit && i == upperBound);
51 }
52 }
53
54 // Cache results in the memo table if not at a limit and not a leading zero
55 if (!isLimit && isLeading == 0) {
56 memo[position][isLeading] = count;
57 }
58 return count; // Return the total count of valid numbers
59 }
60}
61
1class Solution {
2public:
3 int digitsArray[12]; // Array to store each digit of the number 'n'
4 int memoization[12][2]; // Memoization array for the dynamic programming approach
5 unordered_set<int> digitSet; // Set to store the given digits for easy lookup
6
7 // Calculate the number of integers that are less than or equal to n and
8 // can be formed using the given digit set
9 int atMostNGivenDigitSet(vector<string>& digits, int n) {
10 memset(memoization, -1, sizeof memoization); // Initialize memoization array with -1
11 // Convert strings to integers and add to the set
12 for (auto& d : digits) {
13 digitSet.insert(stoi(d));
14 }
15
16 int numSize = 0; // Length of the number 'n'
17 // Split the number 'n' into its digits and store in reverse order in the array
18 while (n) {
19 digitsArray[++numSize] = n % 10;
20 n /= 10;
21 }
22
23 // Call the depth-first search function with the position starting from the last digit,
24 // leading flag set to true, and limit flag set to true
25 return dfs(numSize, 1, true);
26 }
27
28 // Depth-first search function to count the number of valid integers
29 int dfs(int position, int isLeadingZero, bool isLimited) {
30 // Base case: when all positions have been processed
31 if (position == 0) {
32 return isLeadingZero ^ 1; // if isLeadingZero is true, return 0; otherwise, return 1
33 }
34
35 // If not limited and not leading with zero and value is already computed, return the stored value
36 if (!isLimited && !isLeadingZero && memoization[position][isLeadingZero] != -1) {
37 return memoization[position][isLeadingZero];
38 }
39
40 int count = 0; // Initialize count of valid numbers
41 int upperBound = isLimited ? digitsArray[position] : 9; // Determine the upper bound for the current digit position
42
43 // Loop through all possible digits from 0 to the upper bound
44 for (int digit = 0; digit <= upperBound; ++digit) {
45 // Case for leading zero
46 if (digit == 0 && isLeadingZero) {
47 count += dfs(position - 1, isLeadingZero, isLimited && digit == upperBound);
48 }
49 // Case for valid digit from the set
50 else if (digitSet.count(digit)) {
51 count += dfs(position - 1, 0, isLimited && digit == upperBound);
52 }
53 }
54
55 // Store the result in memoization array if the case is not limited and does not have leading zero
56 if (!isLimited && !isLeadingZero) {
57 memoization[position][isLeadingZero] = count;
58 }
59
60 return count; // Return the total count of valid numbers
61 }
62};
63
1// We'll define the relevant types and variables globally.
2
3type MemoizationArray = number[][];
4let digitsArray: number[] = new Array(12); // Array to store each digit of the number 'n'
5let memoization: MemoizationArray = Array.from(Array(12), () => Array(2).fill(-1)); // 2D array for memoization
6let digitSet: Set<number> = new Set<number>(); // Set to store the given digits for easy lookup
7
8// Calculate the number of integers that are less than or equal to n and
9// can be formed using the given digit set.
10function atMostNGivenDigitSet(digits: string[], n: number): number {
11 // Reset memoization array with -1
12 memoization = memoization.map(row => row.fill(-1));
13
14 // Convert strings to integers and add to the set
15 digits.forEach(d => digitSet.add(parseInt(d)));
16
17 let numSize: number = 0; // Length of the number 'n'
18
19 // Split the number 'n' into its digits and store in reverse order in the array
20 while (n) {
21 digitsArray[++numSize] = n % 10;
22 n = Math.floor(n / 10);
23 }
24
25 // Call the depth-first search function with the position starting from the last digit,
26 // leading flag set to true, and limit flag set to true
27 return dfs(numSize, 1, true);
28}
29
30// Depth-first search function to count the number of valid integers
31function dfs(position: number, isLeadingZero: number, isLimited: boolean): number {
32 // Base case: when all positions have been processed
33 if (position === 0) {
34 return isLeadingZero ^ 1;
35 }
36
37 // If not limited and not leading with zero and value is already computed, return the stored value
38 if (!isLimited && isLeadingZero === 0 && memoization[position][isLeadingZero] !== -1) {
39 return memoization[position][isLeadingZero];
40 }
41
42 let upperBound: number = isLimited ? digitsArray[position] : 9; // Determine the upper bound for the current digit position
43 let count: number = 0; // Initialize count of valid numbers
44
45 // Loop through all possible digits from 0 to the upper bound
46 for (let digit = 0; digit <= upperBound; digit++) {
47 // Case for leading zero
48 if (digit === 0 && isLeadingZero) {
49 count += dfs(position - 1, isLeadingZero, isLimited && digit === upperBound);
50 }
51 // Case for valid digit from the set
52 else if (digitSet.has(digit)) {
53 count += dfs(position - 1, 0, isLimited && digit === upperBound);
54 }
55 }
56
57 // Store the result in memoization array if the case is not limited and does not have leading zero
58 if (!isLimited && isLeadingZero === 0) {
59 memoization[position][isLeadingZero] = count;
60 }
61
62 return count; // Return the total count of valid numbers
63}
64
Time and Space Complexity
The given code defines a function atMostNGivenDigitSet
which is used to determine the number of valid numbers that can be formed with a given set of digits that are at most N.
To understand the complexity, let’s walk through the main components of the code:
-
dfs
is a recursive function that's used to figure out the count of valid numbers of a given length. It's decorated with@cache
which memoizes the results of the calls to avoid repeated computation on the same states. -
dfs
function is called with three parameters:pos
which denotes the current position in the number we are forming,lead
which indicates whether we have already placed a non-zero digit or not, andlimit
which indicates if we are bound by the upper limitn
. -
Inside
dfs
, there is a loop that iterates at most 10 times (0 through 9, hence theup + 1
whereup
is the upper bound digit we can use at the current position). -
There is post-processing of the value
n
to convert it into an arraya
which takes linear time related to the number of digits inn
.
Time Complexity:
The time complexity of the algorithm is determined by the number of states the dfs
can have and how many times each state is computed. With memoization, each state is computed exactly once. The number of states is determined by the pos
parameter, which can have l
different values (where l
is the length of n
), the lead
parameter, which can be True
or False
, and the limit
parameter, which can also be True
or False
. This gives us a total of 2 * 2 * l = 4l
states. Since the digit loop runs at most 10 times, the time complexity is O(10 * 4l)
which simplifies to O(l)
.
Space Complexity:
The space complexity is determined by the depth of the recursion stack and the size of the cache. The deepest the recursion stack can go is l
(which is the number of digits in n
). The cache size is also 4l
states as calculated above. Thus, the overall space complexity is O(l)
for the recursion stack plus O(l)
for the cache, leading to O(l)
space complexity overall.
Learn more about how to find time and space complexity quickly using problem constraints.
Which of the following is a min heap?
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