Find all tuple $(x,y)$ such that $x,y$ are integers and $(x^2-y^2)^2=20y+1$. First i see that $x^2-y^2$ is odd and from the fact that a difference between square of two odd is multiple of $8$ and thus $y$ is a multiple of $2$. Moreover, we have $(x^2-y^2+1)(x^2-y^2-1)=20y$. Somebody can give so...

Hi I cant seem to find anything about this, I'm sure I am just missing something simple but it is driving me crazy! From my textbook, the definition of a prime in $\mathbb{Z}$ is: If $a \in \mathbb{Z}$ is neither $0$ nor a unit (only $1$ and $-1$ in $\mathbb{Z}$) we say that $a$ is prime iff, whe...

Can we find all $n$ such that there exists a prime number $p$ s.t. $1+p+p^2+\cdots+p^n$ is a perfect square, where $n$ is a natural number? For $n=1$, when $p=3$, $1+p=4$, which fits our standards. For $n=2$, we can know that $p^2<1+p+p^2<1+2p+p^2=(1+p)^2$, so $1+p+p^2$ cannot be a perfect squ...

Let A be a finite dimensional symmetric k-algebra over some field k. The set of units of A is denoted by U(A). Suppose G is a cyclic group of prime order which acts via inner algebra automorphism on A, say, there is a homomorphism $\phi : G \rightarrow U(A)$ such that $a\cdot g:= a ^{\phi(g)}$ fo...

I have the fraction $\frac{z+4}{(z+1+2i)(z+1-2i)}$. I want to partial decompose this fraction, but I am not seeing how to do it. I know that the answer is a=$\frac{1}{2}$+$\frac{3i}{4}$ and b=$\frac{1}{2}$-$\frac{3i}{4}$, where $$\frac{z+4}{(z+1+2i)(z+1-2i)}= \frac{a}{z+1+2i}+\frac{b}{z+1-2i},\qu...

Let $G$ be a finite group and $KG$ its group algebra over some field $K$ with $\mathrm{char}\ K$ dividing the order of $G$. It's well-known that the Green correspondence is compatible with the Brauer correspondence. Suppose we are dealing with Green correpondence between indecomposable modules of...