PlanetPhysics/Algebraically Solvable Equations Definition

An equation

${\displaystyle {\begin{matrix}x^{n}+a_{1}x^{n-1}+\ldots +a_{n}=0,\end{matrix}}}$

with coefficients ${\displaystyle a_{j}}$ in a field ${\displaystyle K}$, is algebraically solvable , if some of its roots may be expressed with the elements of ${\displaystyle K}$ by using rational operations (addition, subtraction, multiplication, division) and root extractions. I.e., a root of (1) is in a field \,${\displaystyle K(\xi _{1},\,\xi _{2},\,\ldots ,\,\xi _{m})}$\, which is obtained of ${\displaystyle K}$ by adjoining to it in succession certain suitable radicals ${\displaystyle \xi _{1},\,\xi _{2},\,\ldots ,\,\xi _{m}}$.\, Each radical may be contain under the root sign one or more of the previous radicals,

${\displaystyle {\begin{matrix}{\begin{cases}\xi _{1}={\sqrt[{p_{1}}]{r_{1}}},\\\xi _{2}={\sqrt[{p_{2}}]{r_{2}(\xi _{1})}},\\\xi _{3}={\sqrt[{p_{3}}]{r_{3}(\xi _{1},\,\xi _{2})}},\\\cdots \qquad \cdots \\\xi _{m}={\sqrt[{p_{m}}]{r_{m}(\xi _{1},\,\xi _{2},\,\ldots ,\,\xi _{m-1})}},\end{cases}}\end{matrix}}}$

where generally\, ${\displaystyle r_{k}(\xi _{1},\,\xi _{2},\,\ldots ,\,\xi _{k-1})}$\, is an element of the field ${\displaystyle K(\xi _{1},\,\xi _{2},\,\ldots ,\,\xi _{k-1})}$\, but no ${\displaystyle p_{k}}$'th power of an element of this field.\, Because of the formula ${\displaystyle {\sqrt[{jk}]{r}}={\sqrt[{j}]{\sqrt[{k}]{r}}}}$ one can, without hurting the generality, suppose that the indices ${\displaystyle p_{1},\,p_{2},\,\ldots ,\,p_{m}}$ are prime numbers.\\

Example. \, Cardano's formulae show that all roots of the cubic equation\; ${\displaystyle y^{3}+py+q=0}$\; are in the algebraic number field which is obtained by adjoining to the field\, ${\displaystyle \mathbb {Q} (p,\,q)}$\, successively the radicals ${\displaystyle \xi _{1}={\sqrt {\left({\frac {q}{2}}\right)^{2}\!+\!\left({\frac {p}{3}}\right)^{3}}},\quad \xi _{2}={\sqrt[{3}]{-{\frac {q}{2}}\!+\!\xi _{1}}},\quad \xi _{3}={\sqrt {-3}}.}$ In fact, as we consider also the equation (4), the roots may be expressed as

${\displaystyle {\begin{matrix}{\begin{cases}y_{1}=\xi _{2}-{\frac {p}{3\xi _{2}}}\\y_{2}={\frac {-1\!+\!\xi _{3}}{2}}\cdot \xi _{2}-{\frac {-1\!-\!\xi _{3}}{2}}\cdot \!{\frac {p}{3\xi _{2}}}\\y_{3}={\frac {-1\!-\!\xi _{3}}{2}}\cdot \xi _{2}-{\frac {-1\!+\!\xi _{3}}{2}}\cdot \!{\frac {p}{3\xi _{2}}}\end{cases}}\end{matrix}}}$