106,969 research outputs found
Replication code for the paper "Trendy Business Cycles and Asset Prices"
Replication package for: Davis, J. and Segal, G. Trendy Business Cycles and Asset Prices, Review of Financial Studies, forthcoming (DOI: 10.1093/rfs/hhac084). The compressed archive includes a README file, describing the code modules
Replication code and pseudodata for the paper "Counterparty Risk: Implications for Network Linkages and Asset Prices"
Replication package for: Grigoris, F., Hu, Y. and Segal, G. Counterparty Risk: Implications for Network Linkages and Asset Prices, Review of Financial Studies, forthcoming (DOI: 10.1093/rfs/hhac044). The compressed archive includes a README file, describing all pseudo data and code modules
Multipliers of Segal algebras
We show that there exists a noncompact locally compact abelian group
G
G
and a Segal algebra
S
(
G
)
S(G)
on
G
G
whose multiplier algebra properly contains the measure algebra.</p
Modeling Supreme Court Strategic Decision Making: Congressional Constraint
This paper addresses the contradictory results obtained in Segal (1997) and Spiller and Gely (1992) concerning the impact of institutional constraints on the US Supreme Court decisionmaking. by adapting the Spiller and Gely model to the data set utilized by Segal. The major findings are as follows: first, by adapting the Spiller and Gely (1992) maximum likelihood model to the Segal (1997) dataset, we find support for the hypothesis that the Court adjusts its decisions to Presidential and congressional preferences. Second, data from 1947-92 indicate that the average probability of the Court being constrained has been approximately one third. Third, we show that the results obtained in Segal (1997) are the product of biases introduced by a misspecified econometric model. Finally, the estimation highlights the usefulness of Krehbiel’s model of legislative decision-making.
Weak amenability of Segal algebras
Let be a locally compact abelian group, and let . We show that the Segal algebra is always weakly amenable, but that it is amenable only if is discrete
VIII. Les interférences induites par des stimuli intermittents dans l'électrencéphalogramme de l'homme
Goldman G., Segal J. VIII. Les interférences induites par des stimuli intermittents dans l'électrencéphalogramme de l'homme. In: L'année psychologique. 1937 vol. 38. pp. 178-185
Quasi-2-Segal sets
We show that the 2-Segal spaces (also called decomposition spaces) of
Dyckerhoff-Kapranov and G\'alvez-Kock-Tonks have a natural analogue within
simplicial sets, which we call quasi-2-Segal sets, and that the two ideas enjoy
a similar relationship as the one Segal spaces have with quasi-categories. In
particular, we construct a model structure on the category of simplicial sets
whose fibrant objects are the quasi-2-Segal sets which is Quillen equivalent to
a model structure for complete 2-Segal spaces (where our notion of completeness
comes from one of the equivalent characterizations of completeness for Segal
spaces). We also prove a path space criterion, which says that a simplicial set
is a quasi-2-Segal set if and only if its path spaces (also called d\'ecalage)
are quasi-categories, as well as an edgewise subdivision criterion.Comment: 35 pages. v3: Accepted for publication. Corollary 7.9 and Subsection
7.1 added, discussion of Tau_2 moved to short appendix, and various other
edits based on referee feedbac
The association of IS1133 with an aminoglycoside resistance gene, aacC2a, in Acinetobacter baumannii isolates
Includes bibliographical references (leaves 93-103)
El teorema de completación de Atiyah-Segal
This dissertation is about Atiyah-Segal's theorem of completion. The first part studies the basic concepts of vector bundles and representation theory. Then we study K-theory and equivariant K-theory. Lastly, we construct and prove Atiyah-Segal's theorem with emphasis on inverse systems.Esta tesis es sobre el teorema de completación de Atiyah-Segal. La primera parte estudia los conceptos básicos de fibrados vectoriales y teoría de representación. Luego, se estudia la K-teoría y la K-teoría equivariante. Finalmente, se construye y prueba el teorema de Atiyah-Segal, con énfasis en sistemas inversos.Línea de Investigación: Topología AlgebraicaMaestrí
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