Day 19 - Linen Layout
Megathread guidelines
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FAQ
- What is this?: Here is a post with a large amount of details: https://programming.dev/post/6637268
- Where do I participate?: https://adventofcode.com/
- Is there a leaderboard for the community?: We have a programming.dev leaderboard with the info on how to join in this post: https://programming.dev/post/6631465
Python
Approach: Recursive memoized backtracking with a Trie
I get to use one of my favorite data structures here, a Trie! It helps us figure out whether a prefix of the design is a valid pattern in linear time.
I use backtracking to choose potential component patterns (using the Trie), kicking off matching the rest of the design down the stack. We can continue matching longer patterns immediately after the recursion stack unwinds.
In addition, I use global memoization to keep track of the feasibility (part 1) or the number of combinations (part 2) for designs and sub-designs. This way, work done for earlier designs can help speed up later ones too.
I ended up combining part 1 and 2 solutions into a single function because part 1 is a simpler variant of part 2 where we count all designs with the number of possible pattern combinations > 0.
Reading Input
import os here = os.path.dirname(os.path.abspath(__file__)) # read input def read_data(filename: str): global here filepath = os.path.join(here, filename) with open(filepath, mode="r", encoding="utf8") as f: return f.read()Trie Implementation
class Trie: class TrieNode: def __init__(self) -> None: self.children = {} # connections to other TrieNode self.end = False # whether this node indicates an end of a pattern def __init__(self) -> None: self.root = Trie.TrieNode() def add(self, pattern: str): node = self.root # add the pattern to the trie, one character at a time for color in pattern: if color not in node.children: node.children[color] = Trie.TrieNode() node = node.children[color] # mark the node as the end of a pattern node.end = TrueSolution
def soln(filename: str): data = read_data(filename) patterns, design_data = data.split("\n\n") # build the Trie trie = Trie() for pattern in patterns.split(", "): trie.add(pattern) designs = design_data.splitlines() # saves the design / sub-design -> number of component pattern combinations memo = {} def backtrack(design: str): nonlocal trie # if design is empty, we have successfully # matched the caller design / sub-design if design == "": return 1 # use memo if available if design in memo: return memo[design] # start matching a new pattern from here node = trie.root # number of pattern combinations for this design pattern_comb_count = 0 for i in range(len(design)): # if design[0 : i+1] is not a valid pattern, # we are done matching characters if design[i] not in node.children: break # move along the pattern node = node.children[design[i]] # we reached the end of a pattern if node.end: # get the pattern combinations count for the rest of the design / sub-design # all of them count for this design / sub-design pattern_comb_count += backtrack(design[i + 1 :]) # save the pattern combinations count for this design / sub-design memo[design] = pattern_comb_count return pattern_comb_count pattern_comb_counts = [] for design in designs: pattern_comb_counts.append(backtrack(design)) return pattern_comb_counts assert sum(1 for dc in soln("sample.txt") if dc > 0) == 6 print("Part 1:", sum(1 for dc in soln("input.txt") if dc > 0)) assert sum(soln("sample.txt")) == 16 print("Part 2:", sum(soln("input.txt")))