Michael Rogelstad scite author profile

Stimulated radiative recombination has been demonstrated experimentally in e − +H + and e − + He + collisions using a merged electron-ion beams apparatus with field ionization detection of the excited neutral products. Enhancement of the recombination over spontaneous recombination to form the n = 11, 12 and 13 levels of atomic hydrogen and the n = 11 and 12 levels of atomic helium by factors of between 1000 and 3000 have been found using a CO 2 laser power of 8 W. Evidence for the resolution of fine-structure levels has been seen for the case of helium.

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Relations in the maximal pro-𝑝 quotients of absolute Galois groups

Mináč¹,

Rogelstad²,

Tân³

2020

Trans. Amer. Math. Soc.

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We observe that some fundamental constructions in Galois theory can be used to obtain some interesting restrictions on the structure of Galois groups of maximal p-extensions of fields containing a primitive pth root of unity. This is an extension of some significant ideas of Demushkin, Labute and Serre from local fields to all fields containing a primitive pth root of unity. Our techniques use certain natural simple Galois extensions together with some considerations in Galois cohomology and Massey products.Theorem 3.8 implies in particular that G cannot be isomorphic to G F (p) for any field F containing a primitive p-th root of unity. The case s = 1 has already been implied by [Ro, Theorem 5.1.2 and Theorem 5.2.1]. Observe that the relations (1) and (2) are quite similar yet they behave differently in Galois theory. We were well acquainted with [Lab, Proposition 6] and its relevance to our work. We realized that it allows a generalization to the infinite case. (See Lemma 3.2.) Throughout our paper a prominent role is played by simple Galois extensions F(a, m) = F( p m √ a, ζ p m ) of F introduced in Section 2. (See also [Ro, Chapter 5], where we introduced these extensions for m = 1 and RELATIONS IN THE MAXIMAL PRO-p QUOTIENTS OF ABSOLUTE GALOIS GROUPS 3 2 in our examples which illustrate our ideas. The general case m ∈ N is an immediate extension of these examples.)As we mentioned above, in [Lab], Labute classified all Demushkin groups and in this way all G F (p), where F is a local field. He provided explicit descriptions of relations in these groups. It is interesting to clarify to what extend we can generalize Labute's result to all fields. Our results form a contribution to this problem. We mentioned some of these ideas to C. Quadrelli in the fall of 2013 and also in later discussions. I. Efrat and C. Quadrelli developed a nice group-theoretical approach to this project. Their paper [EQ] complements well our paper, and we feel that both papers form a tribute to the remarkable thesis of John Labute.We hope that our paper will appeal to a broad audience. In particular this paper should be accessible to graduate students Organization of our paper is as follows. In Section 2 we introduce our basic extensions F(a, m) which we use substantially throughout the paper to show that some relations in G F (p) cannot occur. In Section 3 we recall and slightly generalize parts of the Proposition 6 in [Lab]. We then prove the main results, Theorem 3.5, Theorem 3.8, Theorem 3.10 and Theorem 3.11, which were previously illustrated in [Ro] in a few examples. Section 4 introduces a natural union CR(F) of all F(a, m) for all a ∈ F × and all m ∈ F, called the p-cyclotomic radical extension of F. This section is an extension and continuation of Section 3. In the last section, we consider a type of automatic Galois realization (Theorem 5.7) and use it to provide also some restrictions on the shape of relations in G F (p) (Theorem 5.9).Acknowledgements. First of all we would like to thank Professor John Labute for his remarkable ...

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Dimensions of Zassenhaus filtration subquotients of some pro-$p$-groups

Mináč¹,

Rogelstad²,

Tân³

2014

Preprint

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