Henri Johnston scite author profile

To each finitely presented module M over a commutative ring R one can associate an R-ideal Fit R (M ) which is called the (zeroth) Fitting ideal of M over R and which is always contained in the R-annihilator of M . In an earlier article, the second named author generalised this notion by replacing R with a (not necessarily commutative) o-order Λ in a finite dimensional separable algebra, where o is an integrally closed complete commutative noetherian local domain. To obtain annihilators, one has to multiply the Fitting invariant of a (left) Λ-module M by a certain ideal H(Λ) of the centre of Λ. In contrast to the commutative case, this ideal can be properly contained in the centre of Λ. In the present article, we determine explicit lower bounds for H(Λ) in many cases. Furthermore, we define a class of 'nice' orders Λ over which Fitting invariants have several useful properties such as good behaviour with respect to direct sums of modules, computability in a certain sense, and H(Λ) being the best possible.

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Computing generators of free modules over orders in group algebras

Bley

Johnston²

2008

Journal of Algebra

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Let E be a number field and G be a finite group. Let A be any O E -order of full rank in the group algebra E[G] and X be a (left) A-lattice. We give a necessary and sufficient condition for X to be free of given rank d over A. In the case that the Wedderburn decomposition E[G] ∼ = χ M χ is explicitly computable and each M χ is in fact a matrix ring over a field, this leads to an algorithm that either gives elements α 1 , . . . , α d ∈ X such that X = Aα 1 ⊕ · · · ⊕ Aα d or determines that no such elements exist.Let L/K be a finite Galois extension of number fields with Galois group G such that E is a subfield of K and put d = [K : E]. The algorithm can be applied to certain Galois modules that arise naturally in this situation. For example, one can take X to be O L , the ring of algebraic integers of L, and A to be the associated order A(E [G]; O L ) ⊆ E [G]. The application of the algorithm to this special situation is implemented in Magma under certain extra hypotheses when K = E = Q.

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On the equivariant Tamagawa number conjecture for Tate motives and unconditional annihilation results

Johnston

Nickel

2015

Trans. Amer. Math. Soc.

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Abstract. Let L/K be a finite Galois extension of number fields with Galois group G. Let p be a prime and let r ≤ 0 be an integer. By examining the structure of the p-adic group ring Z p [G], we prove many new cases of the p-part of the equivariant Tamagawa number conjecture (ETNC) for the pair (h 0 (Spec(L))(r), Z[G]). The same methods can also be applied to other conjectures concerning the vanishing of certain elements in relative algebraic K-groups. We then prove a conjecture of Burns concerning the annihilation of class groups as Galois modules for a large class of interesting extensions, including cases in which the full ETNC is not known. Similarly, we construct annihilators of higher dimensional algebraic K-groups of the ring of integers in L.

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Hybrid Iwasawa algebras and the equivariant Iwasawa main conjecture

Johnston¹,

Nickel²

2018

American Journal of Mathematics

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Henri Johnston

Metabolism of 3-chlorobenzoic acid by a pseudomonad

Noncommutative Fitting invariants and improved annihilation results

Computing generators of free modules over orders in group algebras

On the equivariant Tamagawa number conjecture for Tate motives and unconditional annihilation results

Hybrid Iwasawa algebras and the equivariant Iwasawa main conjecture

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