Is $\{ WxW^{\mathrm{R}} \mid W,x\in\{0,1\}^+\}$ a regular language? If so, why?
The notation $W^{\mathrm{R}}$ means the reverse string of $W$?
If we consider the best answer in this solution, if the language is regular, then its FA should reject all strings not in the language. However, a string such as 0110100 would also be accepted by the FA, since it compares only the starting and end characters! Please explain.
$W^R$ means the reverse string of $W$.
You are right about the DFA. If a DFA $A$ accepts the language $L$ then it rejects all the words that are not in $L$. But the word $\sigma = 0110100$ is in the language!. Consider $W=0$ and $x=11010$.
As G.Bach eloquently stated in his comment(a very interesting property of the language):
$$\{WxW^R : W,x\in \{0,1\}^+\} = \{WxW : W\in\{0,1\} , x\in \{0,1\}^+\}$$
¿Why?
Because there is little restriction to $x$. We can consider that $x$ is almost the whole word with the exception of the first and the last symbol(because in the original language $|W|>0$). The reverse string of any word with unitary size is the same word. So words like:
$$\sigma_1 = 01110000$$ $$\sigma_2 = 11111101$$
Are in the language. All that matter is the first and the last symbol. This language is very interesting because it appears to be irregular at the first sight.
Sure !! this is a Regular Language
Language : Start & End with same Symbol.
eg; W: 000111 WR : 111000
WxWR : 0 0011111100 0
First & Last symbol of language is W & WR respectively & remaining is in x. You can check any input for W, the language hold the properties Start & End with same Symbol.
it's a tricky question but quite simpe one when you know the logic...
say w = 100, x= 101 => wr= 001
the complete string wxwr will be 100101001
now what we can do here is extend x in both direction so it consumes parts of w and wr leaving only the starting and ending symbol now x = 0010100 and w,wr = 1;
so simply the problem is reduced to string starting and ending with same symbol, now a DFA can be constructed.
so yes this is a regular language.
