The monogenicity and Galois groups of certain reciprocal quintinomials

Abstract: We say that a monic polynomial $f(x)\in {\mathbb Z}[x]$ of degree $N$ is monogenic if $f(x)$ is irreducible over ${\mathbb Q}$ and ${1,\theta,\theta^2,\ldots ,\theta^{N-1}}$ is a basis for ${\mathbb Z}K$, the ring of integers of $K={\mathbb Q}(\theta)$, where $f(\theta)=0$. For $n\ge 2$, we define the reciprocal quintinomial [{\mathcal F}{n,A,B}(x):=x^{2^n}+Ax^{3\cdot 2^{n-2}}+Bx^{2^{n-1}}+Ax^{2^{n-2}}+1\in {\mathbb Z}[x].] In this article, we extend our previous work on the monogenicity of ${\mathcal F}{n,A,B}(x)$ to treat the specific previously-unaddressed situation of $A\equiv B\equiv 1\pmod{4}$. Moreover, we determine the Galois group over ${\mathbb Q}$ of ${\mathcal F}{n,A,B}(x)$ in special cases.