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Statements

Subject Item
n2:RIV%2F47813059%3A19520%2F13%3A%230002270%21RIV14-MSM-19520___
rdf:type
skos:Concept n10:Vysledek
rdfs:seeAlso
https://mme2013.vspj.cz/about-conference/conference-proceedings
dcterms:description
Decision-making process of parliamentary voting has long attracted attention of political scientists, as well as economists and mathematicians. In general, taking into account game-theoretical approach, any parliamentary voting can be described as a cooperative game with transferable utility function. Moreover, in real world, agents of the game - usually political parties - act not strictly as predicted in theory. As all real systems are full of an uncertainty, also parliamentary voting can be described up to some degree of freedom. The concept of Shapley value, first introduced by L.S.Shapley in 1953, was the first attempt to evaluate players of these game types. Since then, many adjustments to the basic theory were done in order to improve real data results. One of such a transformation, the Owen and Shapley spatial index, took into account both the effect of agenda and the distribution of power. Adjustments of the index were done by Barr, Pasarelli and Benatiand, Marzetti, who teste d the theory on the decision-making process in the European Union. To incorporate the coalition-forming influence, Bilal, Albuquerque and Hosli proposed to consider additional weights to possible coalitions into power indices. This article applies the concept of additional weights to calculate power in a real voting, namely the data from the Lower House of the Czech Parliament with the emphasis on the State Budget voting issues. Decision-making process of parliamentary voting has long attracted attention of political scientists, as well as economists and mathematicians. In general, taking into account game-theoretical approach, any parliamentary voting can be described as a cooperative game with transferable utility function. Moreover, in real world, agents of the game - usually political parties - act not strictly as predicted in theory. As all real systems are full of an uncertainty, also parliamentary voting can be described up to some degree of freedom. The concept of Shapley value, first introduced by L.S.Shapley in 1953, was the first attempt to evaluate players of these game types. Since then, many adjustments to the basic theory were done in order to improve real data results. One of such a transformation, the Owen and Shapley spatial index, took into account both the effect of agenda and the distribution of power. Adjustments of the index were done by Barr, Pasarelli and Benatiand, Marzetti, who teste d the theory on the decision-making process in the European Union. To incorporate the coalition-forming influence, Bilal, Albuquerque and Hosli proposed to consider additional weights to possible coalitions into power indices. This article applies the concept of additional weights to calculate power in a real voting, namely the data from the Lower House of the Czech Parliament with the emphasis on the State Budget voting issues.
dcterms:title
Concept of spatial power indices with applications on real voting data from the Lower House of the Czech Parliament Concept of spatial power indices with applications on real voting data from the Lower House of the Czech Parliament
skos:prefLabel
Concept of spatial power indices with applications on real voting data from the Lower House of the Czech Parliament Concept of spatial power indices with applications on real voting data from the Lower House of the Czech Parliament
skos:notation
RIV/47813059:19520/13:#0002270!RIV14-MSM-19520___
n10:predkladatel
n11:orjk%3A19520
n5:aktivita
n13:I
n5:aktivity
I
n5:dodaniDat
n7:2014
n5:domaciTvurceVysledku
n20:7342497
n5:druhVysledku
n6:D
n5:duvernostUdaju
n16:S
n5:entitaPredkladatele
n18:predkladatel
n5:idSjednocenehoVysledku
66647
n5:idVysledku
RIV/47813059:19520/13:#0002270
n5:jazykVysledku
n22:eng
n5:klicovaSlova
Shapley-Shubik power index; power distribution; Czech Parliament
n5:klicoveSlovo
n12:Shapley-Shubik%20power%20index n12:power%20distribution n12:Czech%20Parliament
n5:kontrolniKodProRIV
[6F760AC8C067]
n5:mistoKonaniAkce
College of Polytechnics Jihlava
n5:mistoVydani
Jihlava
n5:nazevZdroje
Proceedings of the 31st International Conference Mathematical Methods in Economics 2013
n5:obor
n21:BB
n5:pocetDomacichTvurcuVysledku
1
n5:pocetTvurcuVysledku
1
n5:rokUplatneniVysledku
n7:2013
n5:tvurceVysledku
MIELCOVÁ, Elena
n5:typAkce
n14:WRD
n5:zahajeniAkce
2013-09-11+02:00
s:numberOfPages
6
n17:hasPublisher
College of Polytechnics Jihlava, Tolstého 16, Jihlava, Czech Republic
n15:isbn
978-80-87035-76-4
n19:organizacniJednotka
19520