Letter Coverage: Difference between revisions
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==Problem Description== | |||
The letter/word coverage problem is the problem of finding the minimum number of words from the five-letter-words set (see [[Five Letter Words]]) to cover X letters of the alphabet. | The letter/word coverage problem is the problem of finding the minimum number of words from the five-letter-words set (see [[Five Letter Words]]) to cover X letters of the alphabet. | ||
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We may also wish to restrict our search to the first M words of the 5757 total five letter words. | We may also wish to restrict our search to the first M words of the 5757 total five letter words. | ||
For the sake of simplicity, we will start with the problem of considering the first N letters of the alphabet, and the shortest sequence of words that will provide coverage of those first N letters of the alphabet. | |||
==Solution== | |||
===Definitions=== | |||
Consider the ith sequence <math>S_i</math> of p words: | |||
<math> | |||
S_i = \{ W_1, W_2, W_3, \dots, W_j, \dots, W_p \} | |||
</math> | |||
Now, the jth word is composed of a set of letters (up to five), denoted <math>L_j</math>: | |||
<math> | |||
L_j = \{ L_1, L_2, \dots \} | |||
</math> | |||
===Solution Procedure=== | |||
To solve dynamic programming problems, apply these three steps: | |||
1. Formulate answer as recurrence relation/recursive algorithm | |||
2. Show that the number of parameters taken on by the recurrence is bounded by a polynomial | |||
3. Specify the order of evaluation for the recurrence so that partial results that are needed are always available | |||
Revision as of 01:40, 16 August 2017
Problem Description
The letter/word coverage problem is the problem of finding the minimum number of words from the five-letter-words set (see Five Letter Words) to cover X letters of the alphabet.
The problem has a couple of variations: we might provide a set of letters, and search for the smallest number of words that can cover those particular letters. Or we might give an integer N <= 26, and search for the smallest number of words that can cover the first N letters of the alphabet.
We may also wish to restrict our search to the first M words of the 5757 total five letter words.
For the sake of simplicity, we will start with the problem of considering the first N letters of the alphabet, and the shortest sequence of words that will provide coverage of those first N letters of the alphabet.
Solution
Definitions
Consider the ith sequence $ S_i $ of p words:
$ S_i = \{ W_1, W_2, W_3, \dots, W_j, \dots, W_p \} $
Now, the jth word is composed of a set of letters (up to five), denoted $ L_j $:
$ L_j = \{ L_1, L_2, \dots \} $
Solution Procedure
To solve dynamic programming problems, apply these three steps:
1. Formulate answer as recurrence relation/recursive algorithm
2. Show that the number of parameters taken on by the recurrence is bounded by a polynomial
3. Specify the order of evaluation for the recurrence so that partial results that are needed are always available