Pop, Florian Embedding problems over large fields. (English) Zbl 0862.12003 Ann. Math. (2) 144, No. 1, 1-34 (1996). A field \(K\) is defined to be large if it has the property that every smooth curve over \(K\) has infinitely many \(K\)-rational points, provided that it has at least one rational point. Such fields include the PAC, PRC, and \(\text{P}_p \text{C}\) fields. This article is concerned with Galois theoretic properties of such fields. The first main theorem in this paper proves that every finite, split embedding problem for a large field \(K\) has proper, regular solutions. In particular, this means that every finite group \(G\) is realizable as a Galois group over the field \(K(t)\). This is then used to give a positive answer to a conjecture of Roquette, that the absolute Galois group of a countable, PAC, hilbertian field is profinite free. The proof of the first main theorem relies on the \({1\over 2}\) Riemann existence theorem with Galois action [the author, in Algebra and number theory, Proc. Conf. Essen 1992, 193-218 (1994; Zbl 0840.14012)] and uses the fact that a large field is existentially closed in the field of Laurent series over it.The second main result is derived from the first and shows that every finite split embedding problem for a large hilbertian field has proper solutions. This is then used to give a positive answer to a semi-local version of Shafarevich’s conjecture, namely that for \({\mathcal P}\) a finite set of places of the global field \(K\), and \(K^{{\mathcal P}, cycl}\) the maximal cyclotomic extension of \(K^{\mathcal P}\), the absolute Galois group of \(K^{{\mathcal P}, cycl}\) is free. (The Shafarevich conjecture asserts that \(K^{cycl}\) is profinite free, and would imply the semilocal version.) Finally, the second main result is used to determine the Galois structure of the field \(K^{\mathcal P}\) of totally \({\mathcal P}\)-adic elements over a global field \(K\). Reviewer: Tara L.Smith (Cincinnati) Cited in 19 ReviewsCited in 97 Documents MSC: 12F10 Separable extensions, Galois theory 12F12 Inverse Galois theory Keywords:inverse Galois theory; finite, split embedding problem for a large field; Galois group; large hilbertian field; semi-local version of Shafarevich’s conjecture Citations:Zbl 0840.14012 × Cite Format Result Cite Review PDF Full Text: DOI