Notes/UNB/Year 4/Semester 2/CS2333/2024-01-15.md
2024-01-22 10:12:48 -04:00

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Strings and languages:

  • An alphabet is a finite set of symbols, such as {1,2,3} or {0,1}
  • A string is an alphabet \sum is a finite sequence of symblols from \sum, for example 010010 and 10010101 are strings over the alphabet {0,1}
  • A languge is a set of strings
    • L1 = {00, 01, 10, 11}
    • L2 = {a^n | n is an integer non-negative} Notation: a to the power of n just means a repeated n times

Examples L_8 = \{a^m b^n | m,n \in \mathbb{z}^{nonneg}\}

So valid strings would be aaabbb, aaabbbb, ab, abb

L_9 = \{a^n b^n | n \in \mathbb{z}^{nonneg}\}

So valid strings would be aabb, ab, aaaabbbb, aaaaaabbbbbb

$L_{11} = {w \in {a, b}^* | \text{The number of "a"s is equal to the number of "b"s}}$ This would include everything that L9 includes, but allows for the alphabet can be out of order

You can also written this as L_{11} = \{w \in \{a, b\}^* | n_a(w) = n_b(w)\}

You can extend the repetition notation (exponent) to include multiple symbols by wrapping it in parentheses

Example: L_{12} = \{(ab)^n | n \in \mathbb{z}^{nonneg}\}

This means we need to be careful as $L_{13} = {ab^n | n \in \mathbb{z}^{nonneg}}$ is different, as L12 is asking for repetition of ab, while L13 is assigning a prefix of a and repetition of b

L_{14} = \{a^i b^j c^k | i,j,k \in \mathbb{z}^{nonneg}, j = 2i + 3k\}

So this means that for any number of "a"s and "c"s, the number of "b"s is predetermined if you have selected your "a"s and "c"s

Intro to functions and relations

Informally, a function (f) descrives an input output situation (A -> B) For every input element a in A, there is exactly one ouput element b in B

f maps a to b

A is the domain of f B is the co-domain of f