I'm looking for some free resources online (books, courses, text, sites and so on) on how to solve these two particullar problems and understand the material behind them. There isn't any material on this in my native language and it seems quite hard to find any info when the I don't know the exact terminology in english.
Any help with these problems will be helpful :)
1)
Prove that the set of made of the following formulas is satisfiable ( realizable / I don't know the exact terminology in english)
$ \forall x \neg p(x,x)$
$ \forall x \forall y ( p(x,y) \Rightarrow \neg p(y,x))$
$\exists x \forall y (x \neq y \Rightarrow p(x,y))$
$\exists x \exists y ( x \neq y \Rightarrow p(x,y))$
2)
The structure $A$ has a bearer $N$ (the set of natural numbers) and it is for a language with only one non-logical symbol $p$, which is a predicate interpreted like : $<n,k,m> \in p^A \leftrightarrow n^2 = km + 1$ . Prove that $\{0\}$, $\{ 1 \}$ and $\{ <n,n> : n \in N \}$ are definable.
Agian any help on finding material on how to solve these and understand them is of great help. Thanks :)
