This is a blog for cp newbies (like me).↵
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For a long time I think the [Dijkstra algorithm (dij)](https://en.wikipedia.org/wiki/Dijkstra%27s_algorithm) only has two usages:↵
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(1) Calculate the distance between vertices when the weights of edges are non-negative.↵
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(2) (Minimax) Given a path $p = x_1x_2...x_n$, define $f(p) := \max_{i=1}^{n-1}d(x_i, x_{i+1})$. Given source vertex $s$ and target vertex $t$, dij is able to calculate $min \\{f(p)|p\,\text{is a s-t path}\\}$.↵
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However, dij works for a function class, not only the sum/max functions. The sum/max functions are only the two most frequently used members of this function class, but the function class is far larger. Once the function $f$ satisfies several mandatory properties, you could use dij. The word "function class" is like an abstract class in C++:↵
↵
~~~~~↵
struct f{↵
virtual bool induction_property() = 0; //bool: satisfy or not↵
virtual bool extension_property() = 0; //bool: satisfy or not↵
virtual bool dp_property() = 0; //bool: satisfy or not↵
};//dijkstra function.↵
dij(f);↵
~~~~~↵
↵
The graph $G=(V(G),E(G))$. WLOG we assume $G$ is connected. There is a non-empty source set $S \in V(G)$ that needs not be a singleton. A path $p$ is a vector of vertices $\\{v_1,v_2,...,v_n\\}$ and the function $f$is a function that maps paths to real numbers: $\text{path} \rightarrow \mathbb{R}$. To be brief, $f(\\{v_1,v_2,...,v_n\\})$ is shorten to $f(v_1,v_2,...,v_n)$. We say that dij works for $f$ if $\forall v \in V(G)$, dij correctly computes $d(v) := \min f(\\{p \mid p\,\text{is a S-v path}\\})$. $f$ should satisfy three properties that are also sufficient:↵
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(1, induction base) $\forall s \in S,\,f(s)$ should be correctly initialized. Pay attention that $f(s)$ needs not to be $0$.↵
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(2, Extension property) $\forall p$, for every vertex $v$ adjacent to the end of $p$ (`p.back()`), $f(p \cup v) \geq f(p)$.↵
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(3, dynamic programming (dp) property) If path $p, q$ has the same end (i.e., `p.back()==q.back()`) and $f(p) \geq f(q)$, then for every vertex $v$ adjacent to `p.back()`, $f(p \cup v) \geq f(q \cup v)$. ↵
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Remarks of the dp property:↵
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First, The dp property guarantees that, if $\\{v_1, v_2, ..., v_n\\}$ is the shortest path from $v_1$ to $v_n$, then for $\forall 1 \leq k \leq n$, $\\{v_1, v_2, ..., v_k\\}$ is the shortest $v_1$-$v_k$ path. You can do induction from end to front.↵
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Second, if $f(p) = f(q)$, then $f(p \cup v) = f(q \cup v)$. Because $f(p) \geq f(q)$, $f(p \cup v) \geq f(q \cup v)$. Because $f(q) \geq f(p)$, $f(q \cup v) \geq f(p \cup v)$. Therefore $f(p \cup v) = f(q \cup v)$.↵
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The necessity of the induction base is obvious. Otherwise, the $f$(source vertices) are wrong. For the second property, it is well known that the sum version of dij (shortest path) does not work for edges with negative cost (but the max version works!). For the dp property, let's consider the following example:↵
↵
![ ](/predownloaded/15/02/15021e161f935d16062738bb78e71a1e21dcd7da.png)↵
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In this example $f(p):=\sum\limits_{i=1}^{n-1} i \text{dis}(v_i, v_{i+1})$. $f(ABC) = 1+4*2 = 9$; $f(AC)=10$; $f(ABCD) = 1+4*2 + 5*3=24$, $f(ACD)=10+5*2=20$. Since $f(ABC) < f(AC),\,f(ABCD) > f(ACD)$, $f$ violates the dp property. In this case, dij does not work, because dij uses ABC to slack D, giving a wrong result $24$ instead of the correct answer $20$. ↵
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We denote $d(v)$ as the **real** value of the shortest path (i.e., $\min f(\\{p \mid p\,\text{is a S-v path}\\}$), and $h(v)$ as the value calculated by dij. We want to prove $\forall v \in V(G),\,h(v) = d(v)$. We briefly review the outline of the dij:↵
↵
~~~~~↵
define a distance array d. Initially fill d with INF;↵
Initialize d(s), h(s) for all source vertices s in S;↵
define a set T which is initially S;↵
constexpr int calculation_limit = |V(G)|; //You can set the calculation limit to an arbitrary number you want, default |V(G)|↵
int i = 0; //frame number↵
↵
while T != V(G) && i < calculation_limit{↵
choose a vertex u that is not in T with the lowest h value; //Choice step↵
for every vertice v not in T and adjacent to u, update h(v) as h(v) = min(h(v), f([path from S to u] + v)). //You can record the shortest path from S to v here; //Slack step↵
T.insert(u);↵
i++;↵
}↵
~~~~~↵
↵
In the induction step, the $d$ is correctly computed for every source vertex. In the $i$-th frame, a vertex $u$ is chosen in the choice step. We assume that for every $v$ chosen in the choice step of $0,\,1,\,2...\,i-1$ frames, $h(v) = d(v)$. For the $i$-th frame, I am going to show $h(u) = d(u)$. Consider the shortest path from $S$ to $u$ (we call it $S-u$ path, and it must exist since the graph is finite), and denote $y$ as the last vertex that does not belong to $T$:↵
↵
![ ](/predownloaded/af/1f/af1fe82d231b9320a4319c76ac91e9672f3b1a88.png)↵
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In the following proof, $S-x$ means a path from S to $x$. It is **not** set difference.↵
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First, for all source vertices, i.e., $\forall s \in S$, we have $h(s) = d(s)$. That is property 1, induction base.↵
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(1) $h(u) \leq h(y)$. That is **irrelevant** to these properties, because dij always choose the vertex $u \notin T$ with the lowest $h$ value, if $h(u) > h(y)$, dij will not choose $u$ in this frame.↵
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(2) $d(y) \leq d(u)$. This uses the **extension** property. $S-u$ path is shortest, so $f(S-u)=d(u)$. Due to the extension property, $f(S-y) \leq f(S-u)$. Since $d(y) = \min \text{all}\,f(S-y)\,\text{paths}$, we get $d(y) \leq d(u)$.↵
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(3) $h(y) \leq f(S-x-y)$. This uses the **dp** property. By the induction hypothesis, $y$ is slacked using some path $p$ from S to x. Please be careful, $p$ needs **not** to be the $S-x$ path in the above picture. But according to the first remark of the dp property, $f(S-x) = f(p) = d(x)$. Therefore, by the second remark of the dp property, $y$ is slacked by $f(p-y) = f(S-x-y)$. When calculating $f(p-y)$, the algorithm actually uses $h(x)$ instead of $f(p)$, by the induction hypothesis, $h(x)$ is correctly computed, equals to $f(p)$.↵
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(4) $d(y) = f(S-x-y)$. This uses the **dp** property (the first remark). ↵
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(5) $h(y) = d(y)$. $h(y)$ gives a feasible path from $S$ to $y$, which is greater or equal than the shortest path $d(y)$, that is $h(y) \geq d(y)$. By (3, 4) $h(y) \leq d(y)$. Therefore $h(y) = d(y)$.↵
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(6) $h(u) = d(u)$. $h(u) \leq h(y) = d(y) \leq d(u) \leq h(u)$. Therefore $h(u) = d(u)$.↵
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Now I offer three examples of elegant usage of the function class.↵
↵
**Example 1:**↵
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[Leetcode2386: Find the K-Sum of an Array](https://leetcode.com/problems/find-the-k-sum-of-an-array/). I failed to solve it during the contest. The problem is: You are given an integer array nums and a positive integer k. You can choose any subsequence of the array and sum all of its elements together. We define the K-Sum of the array as the kth largest subsequence sum that can be obtained (not necessarily distinct). Return the K-Sum of the array. For example:↵
↵
Input: nums = [2,4,-2], k = 5↵
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Output: 2↵
↵
Explanation: All the possible subsequence sums that we can obtain are the following sorted in decreasing order:↵
6, 4, 4, 2, 2, 0, 0, -2.↵
The 5-Sum of the array is 2.↵
↵
n := len(nums) <= 100000; k <= min(2000, 1 << n)↵
↵
First, we are calculating the "largest", so we need to change $\leq$ to $\geq$ in the three properties. We first add all nonnegative elements in `nums`. The sum of nonnegative elements is the source vertex that is calculated correctly (property 1). We denote the sum as $S$. For example, if $nums=[2, 4, -2],\,S = 6$. We set every $nums[i]$ to $-nums[i]$ if $nums[i] < 0$. After this statement, all $nums[i] \geq 0$. Then, we sort `nums` ascendingly. For example, nums: $[2, 4, -2] \rightarrow [2, 4, 2] \rightarrow [2, 2, 4]$. We define the graph $G$ as follows: The vertex $v \in [0, 2^n-1]$ is a binary string of length $n$. If $v[i]=1$, keep $nums[i]$, otherwise, if $v[i]=0$, discard $nums[i]$. For each vertex the out degree is at most $2$: (1)Set $v[i]$ to $0$. (2) If $i \geq 1$, Set $v[i]$ to $0$ and recover $v[i-1]$ to $1$. Below is the search tree:↵
↵
![ ](/predownloaded/48/71/4871feeb7e6606adeab335940ccc30932799c155.png)↵
↵
First, the graph $G$ is a connected tree. It is left to you as an exercise. Feel free to comment if you disagree with it. For a ↵
vertex $v$, let $f(v) := S - \sum\limits_{i=0}^{n-1}(1 - v[i]) * nums[i]$ ($f(v)$ is well-defined, there is only one path from root to $v$). You can verify that $f$ satisfies the extension property (That is why we need to sort `nums`), and due to the nature of add, it satisfies the dp property. Even when the abstracted graph is super large, If the degree of each vertex (which decides how many adjacent vertices we need to explore, in this problem, 2) and the calculation_limit is small enough (In this problem, $\leq 2000$), the dij is feasible even if the abstracted graph is super large, remember to use a priority queue! Below is the code written by [0x3f](https://codeforces.net/profile/0x3f):↵
↵
↵
~~~~~↵
//Original code address: https://leetcode.cn/problems/find-the-k-sum-of-an-array/solution/zhuan-huan-dui-by-endlesscheng-8yiq/↵
class Solution {↵
public:↵
long long kSum(vector<int> &nums, int k) {↵
long sum = 0L;↵
for (int &x : nums)↵
if (x >= 0) sum += x;↵
else x = -x;↵
sort(nums.begin(), nums.end());↵
priority_queue<pair<long, int>> pq;↵
pq.emplace(sum, 0);↵
while (--k) {↵
auto[sum, i] = pq.top();↵
pq.pop();↵
if (i < nums.size()) {↵
pq.emplace(sum - nums[i], i + 1); //Discard nums[i-1]↵
if (i) pq.emplace(sum - nums[i] + nums[i - 1], i + 1); //Keeps nums[i-1]↵
}↵
}↵
return pq.top().first;↵
}↵
};↵
~~~~~↵
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**Example 2:**↵
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[ABC267E Erasing Vertices 2](https://atcoder.jp/contests/abc267/tasks/abc267_e). Left as practice.↵
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**Example 3**↵
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[ARC150C Path and Subsequence](https://atcoder.jp/contests/arc150/tasks/arc150_c). This problem is super interesting, editorial: https://atcoder.jp/contests/arc150/editorial/4999. There are two sequences $A$ and $B$, and an undirected connected graph $G=(V(G), E(G))$. The problem asks: For every simple path from vertex $1$ to vertex $N$, $p = (v_1, v_2, ..., v_k);\,v_1=1,\;v_k=N$, is $B$ a (not necessarily contiguous) subsequence of $(A_{v_1}, A_{v_2}, ..., A_{v_k})$? All sequences are **1-indexed**.↵
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For every simple path $p$ (not necessarily starting from $1$ and ending at $n$), we define:↵
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`A(p) := list(map(lambda x: A_x, p))`↵
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$f(p) := \max\\{j|[B_1, B_2,\...,\,B_j] \text{is a subsequence of}\,A(p)\\}$.↵
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For example, ↵
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![ ](/predownloaded/e2/dc/e2dc666eb84faf7d0052b37ded7511944f137474.png)↵
↵
$A = [1, 2, 3, 5, 2], B = [1, 3, 2]$. If $p = [1, 2, 5]$, $A(p) = [A[1], A[2], A[5]] = [1, 2, 2]$, $f(p)=1$, because only the first $1$ elements of $B$ ($[1]$) is a subsequence of $A(p)$. If $p = [1, 2, 3, 4, 5]$, $A(p) = [A[1], A[2], A[3], A[4], A[5]] = [1, 2, 3, 5, 2]$ and $f(p) = 3$, because the first $3$ elements of $B$ ($[1, 3, 2]$) is a subsequence of $A(p)$. Does such $f$ satisfy the three properties? For the first property, we need to correctly initialize $f(\{1\}) := [A[1] = B[1]]$. Second, the extension property obviously holds. Third, for the dp property, if $p_1 = p + [u]$:↵
↵
$$↵
f(p_1)=↵
\begin{cases}↵
f(p)+1, A_u = B_{f(p)+1}\\↵
f(p), A_u \neq B_{f(p)+1}↵
\end{cases}↵
$$↵
↵
Therefore, if $p$ and $q$ are simple paths with same the same ending, and $f(p) > f(q)$, we must have $f(p + [u]) \geq f(q + [u])$. That is because adding one vertex could increase $f(q)$ at most $1$. If $f(p) = f(q)$, Then $f(p + [u]) = f(q + [u])$. That is because, whether $f(p_1)$ ($f(q_1)$) is $f(p)$ or $f(p)+1$ ($f(q)$ or $f(q)+1$) depends only on $A_u$ and $B_{f(p)+1}$, which are the same for $p$ and $q$. Therefore, the dp property holds.↵
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You can solve this problem using dij in $O(|V(G)| + |E(G)|)$.↵
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---↵
Update: Fix some typos. I do not intentionally occupy the "Recent actions" column.↵
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For a long time I think the [Dijkstra algorithm (dij)](https://en.wikipedia.org/wiki/Dijkstra%27s_algorithm) only has two usages:↵
↵
(1) Calculate the distance between vertices when the weights of edges are non-negative.↵
↵
(2) (Minimax) Given a path $p = x_1x_2...x_n$, define $f(p) := \max_{i=1}^{n-1}d(x_i, x_{i+1})$. Given source vertex $s$ and target vertex $t$, dij is able to calculate $min \\{f(p)|p\,\text{is a s-t path}\\}$.↵
↵
However, dij works for a function class, not only the sum/max functions. The sum/max functions are only the two most frequently used members of this function class, but the function class is far larger. Once the function $f$ satisfies several mandatory properties, you could use dij. The word "function class" is like an abstract class in C++:↵
↵
~~~~~↵
struct f{↵
virtual bool induction_property() = 0; //bool: satisfy or not↵
virtual bool extension_property() = 0; //bool: satisfy or not↵
virtual bool dp_property() = 0; //bool: satisfy or not↵
};//dijkstra function.↵
dij(f);↵
~~~~~↵
↵
The graph $G=(V(G),E(G))$. WLOG we assume $G$ is connected. There is a non-empty source set $S \in V(G)$ that needs not be a singleton. A path $p$ is a vector of vertices $\\{v_1,v_2,...,v_n\\}$ and the function $f$
↵
(1, induction base) $\forall s \in S,\,f(s)$ should be correctly initialized. Pay attention that $f(s)$ needs not to be $0$.↵
↵
(2, Extension property) $\forall p$, for every vertex $v$ adjacent to the end of $p$ (`p.back()`), $f(p \cup v) \geq f(p)$.↵
↵
(3, dynamic programming (dp) property) If path $p, q$ has the same end (i.e., `p.back()==q.back()`) and $f(p) \geq f(q)$, then for every vertex $v$ adjacent to `p.back()`, $f(p \cup v) \geq f(q \cup v)$. ↵
↵
Remarks of the dp property:↵
↵
First, The dp property guarantees that, if $\\{v_1, v_2, ..., v_n\\}$ is the shortest path from $v_1$ to $v_n$, then for $\forall 1 \leq k \leq n$, $\\{v_1, v_2, ..., v_k\\}$ is the shortest $v_1$-$v_k$ path. You can do induction from end to front.↵
↵
Second, if $f(p) = f(q)$, then $f(p \cup v) = f(q \cup v)$. Because $f(p) \geq f(q)$, $f(p \cup v) \geq f(q \cup v)$. Because $f(q) \geq f(p)$, $f(q \cup v) \geq f(p \cup v)$. Therefore $f(p \cup v) = f(q \cup v)$.↵
↵
The necessity of the induction base is obvious. Otherwise, the $f$(source vertices) are wrong. For the second property, it is well known that the sum version of dij (shortest path) does not work for edges with negative cost (but the max version works!). For the dp property, let's consider the following example:↵
↵
![ ](/predownloaded/15/02/15021e161f935d16062738bb78e71a1e21dcd7da.png)↵
↵
In this example $f(p):=\sum\limits_{i=1}^{n-1} i \text{dis}(v_i, v_{i+1})$. $f(ABC) = 1+4*2 = 9$; $f(AC)=10$; $f(ABCD) = 1+4*2 + 5*3=24$, $f(ACD)=10+5*2=20$. Since $f(ABC) < f(AC),\,f(ABCD) > f(ACD)$, $f$ violates the dp property. In this case, dij does not work, because dij uses ABC to slack D, giving a wrong result $24$ instead of the correct answer $20$. ↵
↵
We denote $d(v)$ as the **real** value of the shortest path (i.e., $\min f(\\{p \mid p\,\text{is a S-v path}\\}$), and $h(v)$ as the value calculated by dij. We want to prove $\forall v \in V(G),\,h(v) = d(v)$. We briefly review the outline of the dij:↵
↵
~~~~~↵
define a distance array d. Initially fill d with INF;↵
Initialize d(s), h(s) for all source vertices s in S;↵
define a set T which is initially S;↵
constexpr int calculation_limit = |V(G)|; //You can set the calculation limit to an arbitrary number you want, default |V(G)|↵
int i = 0; //frame number↵
↵
while T != V(G) && i < calculation_limit{↵
choose a vertex u that is not in T with the lowest h value; //Choice step↵
for every vertice v not in T and adjacent to u, update h(v) as h(v) = min(h(v), f([path from S to u] + v)). //You can record the shortest path from S to v here; //Slack step↵
T.insert(u);↵
i++;↵
}↵
~~~~~↵
↵
In the induction step, the $d$ is correctly computed for every source vertex. In the $i$-th frame, a vertex $u$ is chosen in the choice step. We assume that for every $v$ chosen in the choice step of $0,\,1,\,2...\,i-1$ frames, $h(v) = d(v)$. For the $i$-th frame, I am going to show $h(u) = d(u)$. Consider the shortest path from $S$ to $u$ (we call it $S-u$ path, and it must exist since the graph is finite), and denote $y$ as the last vertex that does not belong to $T$:↵
↵
![ ](/predownloaded/af/1f/af1fe82d231b9320a4319c76ac91e9672f3b1a88.png)↵
↵
In the following proof, $S-x$ means a path from S to $x$. It is **not** set difference.↵
↵
First, for all source vertices, i.e., $\forall s \in S$, we have $h(s) = d(s)$. That is property 1, induction base.↵
↵
(1) $h(u) \leq h(y)$. That is **irrelevant** to these properties, because dij always choose the vertex $u \notin T$ with the lowest $h$ value, if $h(u) > h(y)$, dij will not choose $u$ in this frame.↵
↵
(2) $d(y) \leq d(u)$. This uses the **extension** property. $S-u$ path is shortest, so $f(S-u)=d(u)$. Due to the extension property, $f(S-y) \leq f(S-u)$. Since $d(y) = \min \text{all}\,f(S-y)\,\text{paths}$, we get $d(y) \leq d(u)$.↵
↵
(3) $h(y) \leq f(S-x-y)$. This uses the **dp** property. By the induction hypothesis, $y$ is slacked using some path $p$ from S to x. Please be careful, $p$ needs **not** to be the $S-x$ path in the above picture. But according to the first remark of the dp property, $f(S-x) = f(p) = d(x)$. Therefore, by the second remark of the dp property, $y$ is slacked by $f(p-y) = f(S-x-y)$. When calculating $f(p-y)$, the algorithm actually uses $h(x)$ instead of $f(p)$, by the induction hypothesis, $h(x)$ is correctly computed, equals to $f(p)$.↵
↵
(4) $d(y) = f(S-x-y)$. This uses the **dp** property (the first remark). ↵
↵
(5) $h(y) = d(y)$. $h(y)$ gives a feasible path from $S$ to $y$, which is greater or equal than the shortest path $d(y)$, that is $h(y) \geq d(y)$. By (3, 4) $h(y) \leq d(y)$. Therefore $h(y) = d(y)$.↵
↵
(6) $h(u) = d(u)$. $h(u) \leq h(y) = d(y) \leq d(u) \leq h(u)$. Therefore $h(u) = d(u)$.↵
↵
Now I offer three examples of elegant usage of the function class.↵
↵
**Example 1:**↵
↵
[Leetcode2386: Find the K-Sum of an Array](https://leetcode.com/problems/find-the-k-sum-of-an-array/). I failed to solve it during the contest. The problem is: You are given an integer array nums and a positive integer k. You can choose any subsequence of the array and sum all of its elements together. We define the K-Sum of the array as the kth largest subsequence sum that can be obtained (not necessarily distinct). Return the K-Sum of the array. For example:↵
↵
Input: nums = [2,4,-2], k = 5↵
↵
Output: 2↵
↵
Explanation: All the possible subsequence sums that we can obtain are the following sorted in decreasing order:↵
6, 4, 4, 2, 2, 0, 0, -2.↵
The 5-Sum of the array is 2.↵
↵
n := len(nums) <= 100000; k <= min(2000, 1 << n)↵
↵
First, we are calculating the "largest", so we need to change $\leq$ to $\geq$ in the three properties. We first add all nonnegative elements in `nums`. The sum of nonnegative elements is the source vertex that is calculated correctly (property 1). We denote the sum as $S$. For example, if $nums=[2, 4, -2],\,S = 6$. We set every $nums[i]$ to $-nums[i]$ if $nums[i] < 0$. After this statement, all $nums[i] \geq 0$. Then, we sort `nums` ascendingly. For example, nums: $[2, 4, -2] \rightarrow [2, 4, 2] \rightarrow [2, 2, 4]$. We define the graph $G$ as follows: The vertex $v \in [0, 2^n-1]$ is a binary string of length $n$. If $v[i]=1$, keep $nums[i]$, otherwise, if $v[i]=0$, discard $nums[i]$. For each vertex the out degree is at most $2$: (1)Set $v[i]$ to $0$. (2) If $i \geq 1$, Set $v[i]$ to $0$ and recover $v[i-1]$ to $1$. Below is the search tree:↵
↵
![ ](/predownloaded/48/71/4871feeb7e6606adeab335940ccc30932799c155.png)↵
↵
First, the graph $G$ is a connected tree. It is left to you as an exercise. Feel free to comment if you disagree with it. For a ↵
vertex $v$, let $f(v) := S - \sum\limits_{i=0}^{n-1}(1 - v[i]) * nums[i]$ ($f(v)$ is well-defined, there is only one path from root to $v$). You can verify that $f$ satisfies the extension property (That is why we need to sort `nums`), and due to the nature of add, it satisfies the dp property. Even when the abstracted graph is super large, If the degree of each vertex (which decides how many adjacent vertices we need to explore, in this problem, 2) and the calculation_limit is small enough (In this problem, $\leq 2000$), the dij is feasible even if the abstracted graph is super large, remember to use a priority queue! Below is the code written by [0x3f](https://codeforces.net/profile/0x3f):↵
↵
↵
~~~~~↵
//Original code address: https://leetcode.cn/problems/find-the-k-sum-of-an-array/solution/zhuan-huan-dui-by-endlesscheng-8yiq/↵
class Solution {↵
public:↵
long long kSum(vector<int> &nums, int k) {↵
long sum = 0L;↵
for (int &x : nums)↵
if (x >= 0) sum += x;↵
else x = -x;↵
sort(nums.begin(), nums.end());↵
priority_queue<pair<long, int>> pq;↵
pq.emplace(sum, 0);↵
while (--k) {↵
auto[sum, i] = pq.top();↵
pq.pop();↵
if (i < nums.size()) {↵
pq.emplace(sum - nums[i], i + 1); //Discard nums[i-1]↵
if (i) pq.emplace(sum - nums[i] + nums[i - 1], i + 1); //Keeps nums[i-1]↵
}↵
}↵
return pq.top().first;↵
}↵
};↵
~~~~~↵
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**Example 2:**↵
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[ABC267E Erasing Vertices 2](https://atcoder.jp/contests/abc267/tasks/abc267_e). Left as practice.↵
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**Example 3**↵
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[ARC150C Path and Subsequence](https://atcoder.jp/contests/arc150/tasks/arc150_c). This problem is super interesting, editorial: https://atcoder.jp/contests/arc150/editorial/4999. There are two sequences $A$ and $B$, and an undirected connected graph $G=(V(G), E(G))$. The problem asks: For every simple path from vertex $1$ to vertex $N$, $p = (v_1, v_2, ..., v_k);\,v_1=1,\;v_k=N$, is $B$ a (not necessarily contiguous) subsequence of $(A_{v_1}, A_{v_2}, ..., A_{v_k})$? All sequences are **1-indexed**.↵
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For every simple path $p$ (not necessarily starting from $1$ and ending at $n$), we define:↵
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`A(p) := list(map(lambda x: A_x, p))`↵
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$f(p) := \max\\{j|[B_1, B_2,\...,\,B_j] \text{is a subsequence of}\,A(p)\\}$.↵
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For example, ↵
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![ ](/predownloaded/e2/dc/e2dc666eb84faf7d0052b37ded7511944f137474.png)↵
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$A = [1, 2, 3, 5, 2], B = [1, 3, 2]$. If $p = [1, 2, 5]$, $A(p) = [A[1], A[2], A[5]] = [1, 2, 2]$, $f(p)=1$, because only the first $1$ elements of $B$ ($[1]$) is a subsequence of $A(p)$. If $p = [1, 2, 3, 4, 5]$, $A(p) = [A[1], A[2], A[3], A[4], A[5]] = [1, 2, 3, 5, 2]$ and $f(p) = 3$, because the first $3$ elements of $B$ ($[1, 3, 2]$) is a subsequence of $A(p)$. Does such $f$ satisfy the three properties? For the first property, we need to correctly initialize $f(\{1\}) := [A[1] = B[1]]$. Second, the extension property obviously holds. Third, for the dp property, if $p_1 = p + [u]$:↵
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$$↵
f(p_1)=↵
\begin{cases}↵
f(p)+1, A_u = B_{f(p)+1}\\↵
f(p), A_u \neq B_{f(p)+1}↵
\end{cases}↵
$$↵
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Therefore, if $p$ and $q$ are simple paths with same the same ending, and $f(p) > f(q)$, we must have $f(p + [u]) \geq f(q + [u])$. That is because adding one vertex could increase $f(q)$ at most $1$. If $f(p) = f(q)$, Then $f(p + [u]) = f(q + [u])$. That is because, whether $f(p_1)$ ($f(q_1)$) is $f(p)$ or $f(p)+1$ ($f(q)$ or $f(q)+1$) depends only on $A_u$ and $B_{f(p)+1}$, which are the same for $p$ and $q$. Therefore, the dp property holds.↵
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You can solve this problem using dij in $O(|V(G)| + |E(G)|)$.↵
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Update: Fix some typos. I do not intentionally occupy the "Recent actions" column.↵
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