Martha Rzedowski‐Calderón scite author profile

Martha Rzedowski‐Calderón

5Publications

101Citation Statements Received

67Citation Statements Given

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Affiliations

Centro de Investigación en Materiales Avanzados, Center for Research and Advanced Studies of the National Polytechnic Institute, Instituto de Estudios Avanzados

Publications

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Galois module structure of holomorphic differentials

Rzedowski‐Calderón¹,

Villa‐Salvador²,

Madan³

2000

Bull. Austral. Math. Soc.

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For a finite cyclic p-extension L/K of a rational function field K = k(x) over an algebraically closed field k of characteristic p > 0 such that every ramified prime divisor is fully ramified, we find a basis of the fc[G]-module CIL(0) of holomorphic differentials of L. We use this basis, which is similar to the Boseck-Garcia basis in the elementary abelian case, to find the fc[G]-module structure of ^£,(0) in terms of indecomposable modules.

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Genus fields of abelian extensions of rational congruence function fields

Maldonado-Ramírez¹,

Rzedowski‐Calderón

Villa‐Salvador

2013

Finite Fields and Their Applications

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In the published version of this paper [Finite Fields and Their Applications 20 (2013) 40-54], there is an error in the proof of Theorem 4.2 of the paper. Here we correct the error and give the right statments for Theorems 4.2, 4.5 and 5.2We give a construction of genus fields for congruence function fields. First we consider the cyclotomic function field case following the ideas of Leopoldt and then the general case. As applications we give explicitly the genus fields of Kummer, Artin-Schreier and cyclic p-extensions. Kummer extensions were obtained previously by G. Peng and Artin-Schreier extensions were obtained

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Automorphisms of congruence function fields

Rzedowski‐Calderón¹,

Villa‐Salvador²

1991

Pacific J. Math.

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Let k be a finite field. For a function field K over k and m > 3, it is proven that there are infinitely many non-isomorphic function fields L such that L/K is a separable extension of degree m and Aut£ L -{Id}. It is also shown that for a finite group G, there are infinitely many non-isomorphic function fields L/k such that Aut* L = G. Finally, given any finite nilpotent group G such that |G| > 1 and (|<7|, \k\ -1) = 1 and any function field K over k 9 there are infinitely many non-isomorphic function fields L over k with Gal(L/K) = Aut* L £* G.

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Genus fields of abelian extensions of rational congruence function fields, II

Barreto-Castañeda¹,

Montelongo-Vázquez²,

Reyes-Morales³

et al. 2018

Rocky Mountain J. Math.

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Genus fields of congruence function fields

Maldonado-Ramírez

Rzedowski‐Calderón

Villa‐Salvador

2017

Finite Fields and Their Applications

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