Tower of fields

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Template:Short description In mathematics, a tower of fields is a sequence of field extensions

Template:Nowrap

The name comes from such sequences often being written in the form

\begin{matrix} ⋮ \\ | \\ F_{2} \\ | \\ F_{1} \\ | \\ F_{0} . \end{matrix}

A tower of fields may be finite or infinite.

Examples

Template:Nowrap is a finite tower with rational, real and complex numbers.
The sequence obtained by letting F₀ be the rational numbers Q, and letting

F_{n} = F_{n - 1} (2^{1 / 2^{n}}), for n \geq 1

(i.e. F_n is obtained from F_n-1 by adjoining a 2ⁿ th root of 2), is an infinite tower.

If p is a prime number the p th cyclotomic tower of Q is obtained by letting F₀ = Q and F_n be the field obtained by adjoining to Q the pⁿ th roots of unity. This tower is of fundamental importance in Iwasawa theory.
The Golod–Shafarevich theorem shows that there are infinite towers obtained by iterating the Hilbert class field construction to a number field.

References

Section 4.1.4 of Template:Citation

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Field extensions