Note 2: CF1903F

Правка en2, от NeoYL, 2023-12-13 12:51:33

This is my personal note and might be some kind of user editorial/learning material for some people. This is the second episode of this "note" series. I will write notes on problems (normally around 2400-ish problems), which are completely solved by myself without looking at the editorial, that are both interesting and educational. If you want to motivate me to write a continuation (aka note 3), a significant upvote from you would be well appreciated!

Problem link

Prerequisites for this problem: Binary search, standard 2-SAT, segment tree

Wow, this problem took me around 4 hours. Thinking about the solution took me 1 hour and coding it out took 1.5 hour. You wonder where is the other 1.5 hour? Well, I knew 2-SAT was a thing but I didn't really know the concept behind it (I only knew it works in a choosing "this" and cannot choose "that" scenario from CPH).

A good blog in Chinese: link. I read like 4-5 blogs and websites to learn about it but still don't get how the graph is built. The blog provides an excellent description, "A directed edge from A to B means that if we choose A then we must choose B, but when we choose B, we don't necessary choose A."

Lets get back to the problem. A wise man once said: "When you see a problem that maximize minimum ... or minimize maximum ... , it's $$$99.999\%$$$ binary search."

By observation this problem has a : $$$true, ..., true, false, ..., false$$$ scenario. I think this is quite easy to find out this pattern. If you can't see this pattern, try learning binary search problems from Um_nik first XD.

Now we need to write a check function to check if the graph satisfies a value $$$k$$$ to have $$$min$$$ $$$\geq$$$ $$$k?$$$

From here onwards we will let $$$A$$$ $$$=$$$ we choose node $$$A$$$, $$$A'$$$ $$$=$$$ we don't choose A.

Then, we can observe that we have 2 cases:

$$$1st$$$ case : each edge must have one end chosen.

To solve this we build an edge from $$$u'$$$ -> $$$v$$$ for each $$$u$$$ and all $$$v \in neighbours(u)$$$. When we choose to not take $$$u$$$, we must take $$$v$$$.

$$$2nd$$$ case (harder) : $$$min \geq k$$$

If we took some node $$$i$$$, then we cannot take $$$\forall j \in [i-k+1,i+k-1]\backslash{i}$$$. This is because if we took any $$$j$$$ in that range, $$$abs(i-j)<k$$$ so $$$min\geq k$$$ will not be satisfied.

Hence we need to build an edge from $$$i$$$ -> $$$j'$$$ for $$$\forall j \in [i-k+1,i+k-1]\backslash{i}$$$. Then we just run a standard 2-SAT program with tarjan to make sure $$$\forall i \in [1,N], i$$$ and $$$i'$$$ don't belong to the same strongly connected component (or called $$$SCC$$$).

This reduces the problem to $$$O(N^2logN)$$$. Not good enough to pass this task.

We notice that the bottleneck of this solution would be on the $$$2nd$$$ case. What should we do to optimize it? What if we took ranges to represent them into nodes? Then, what is the trick to make as few ranges we can? Then we can notice that we can use ranges in segment tree to represent a node!

Ok, let us define $$$tr_{L,R}$$$ to be the node that represents range $$$[L,R]$$$.

Let us redo $$$2nd$$$ case. We need to build an edge from $$$i$$$ -> $$$tr_{i-k+1,i-1}'$$$ and $$$i$$$ -> $$$tr_{i+1,i+k-1}'$$$. We also need to add edges from $$$tr_{L,R}$$$, $$$tr_{L,R}'$$$ -> $$$tr_{L,mid}'$$$ and $$$tr_{L,R}'$$$ -> $$$tr_{mid+1, R}'$$$. This is because if we don't want to take $$$[L,R]$$$, we also must not take $$$[L,mid]$$$ and $$$[mid+1, R]$$$. If we want to take $$$tr'_{i,i}$$$, we must also satisfy $$$i'$$$, meaning we also need to add edge from every $$$tr'_{i,i}$$$ to $$$i'$$$.

After we did this, just run tarjan and compute all SCCs. If an $$$i$$$ and $$$i'$$$ belongs to the same SCC, answer will be NO because how can you take $$$i$$$ and not take $$$i$$$ at the same time?

Otherwise, the answer is YES.

(AC code)[]

Comment on this problem and my feelings:

This is the first time I saw a 2-SAT problem. Bruh I literally spent 1.5 hours to just read on 2-SAT. But the problem is amazing and interesting. Mixture of ideas (2-SAT, binary search and segment tree) was insane. Also, I submitted like 7 times like a dumbass before ACing.

Tips for implementation:

We can represent $$$i'$$$ as node with id $$$i + N$$$, also $$$tr_{L,R}$$$ with index $$$p$$$ in the segment tree with node with id $$$p+2*N$$$ for simpler implementation. Remember to clear all edges and the edges created from the previous check function (got like 4 WAs for this).

Теги segment tree, 2-sat, binary search, optimization

История

 
 
 
 
Правки
 
 
  Rev. Язык Кто Когда Δ Комментарий
en37 Английский NeoYL 2024-11-03 19:14:49 9 Tiny change: ' two nodes, we must t' -> ' two nodes each, and we must t'
en36 Английский NeoYL 2024-11-03 19:13:25 8
en35 Английский NeoYL 2023-12-31 12:36:56 75
en34 Английский NeoYL 2023-12-17 09:21:24 1 Tiny change: 'ng it). \n\nIf you w' -> 'ng it). \n \nIf you w'
en33 Английский NeoYL 2023-12-15 06:13:39 83
en32 Английский NeoYL 2023-12-14 19:33:45 18
en31 Английский NeoYL 2023-12-14 19:32:47 112
en30 Английский NeoYL 2023-12-14 19:29:59 258
en29 Английский NeoYL 2023-12-14 13:27:43 4
en28 Английский NeoYL 2023-12-14 12:50:28 9 Tiny change: 'ry search problems from [use' -> 'ry search from [use'
en27 Английский NeoYL 2023-12-14 09:02:38 12
en26 Английский NeoYL 2023-12-14 09:02:07 11
en25 Английский NeoYL 2023-12-14 09:01:38 153
en24 Английский NeoYL 2023-12-13 20:10:47 3 Tiny change: 's to just read on 2' -> 's to just to read on 2'
en23 Английский NeoYL 2023-12-13 20:09:51 4
en22 Английский NeoYL 2023-12-13 15:42:51 42
en21 Английский NeoYL 2023-12-13 14:58:05 8
en20 Английский NeoYL 2023-12-13 14:36:33 67
en19 Английский NeoYL 2023-12-13 14:25:57 144
en18 Английский NeoYL 2023-12-13 14:01:23 75
en17 Английский NeoYL 2023-12-13 13:27:24 0 (published)
en16 Английский NeoYL 2023-12-13 13:27:15 12
en15 Английский NeoYL 2023-12-13 13:23:28 19
en14 Английский NeoYL 2023-12-13 13:23:03 6
en13 Английский NeoYL 2023-12-13 13:22:08 8 Tiny change: 'e r = mid &mdash; 1;\n }' -> 'e r = mid - 1;\n }'
en12 Английский NeoYL 2023-12-13 13:21:20 1
en11 Английский NeoYL 2023-12-13 13:21:09 672
en10 Английский NeoYL 2023-12-13 13:18:40 283
en9 Английский NeoYL 2023-12-13 13:09:12 13
en8 Английский NeoYL 2023-12-13 13:08:27 18
en7 Английский NeoYL 2023-12-13 13:07:55 72
en6 Английский NeoYL 2023-12-13 13:06:49 32
en5 Английский NeoYL 2023-12-13 13:05:56 58
en4 Английский NeoYL 2023-12-13 13:03:49 0
en3 Английский NeoYL 2023-12-13 13:03:47 4697
en2 Английский NeoYL 2023-12-13 12:51:33 24
en1 Английский NeoYL 2023-12-13 12:50:50 4437 Initial revision (saved to drafts)