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Raw data [ X ] 
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    <SEQUENTIAL>
      <record key="001" att1="001" value="LIB909999600" att2="LIB909999600">001   LIB909999600</record>
      <field key="037" subkey="x">englisch</field>
      <field key="050" subkey="x">Forschungsbericht</field>
      <field key="076" subkey="">Ökonomie</field>
      <field key="079" subkey="y">http://www.ihs.ac.at/publications/eco/east/ro-41.pdf</field>
      <field key="079" subkey="z">Turnovec, Frantisek, Monotonicity of Power Indices (pdf)</field>
      <field key="079" subkey="y">http://ideas.repec.org/p/ihs/ihsrop/41.html</field>
      <field key="079" subkey="z">Institute for Advanced Studies. East European Series; 41 (RePEc)</field>
      <field key="100" subkey="">Turnovec, Frantisek</field>
      <field key="103" subkey="">CERGE-EI, Economic Institute, Charles University and Academy of Sciences of the Czech Republic</field>
      <field key="331" subkey="">Monotonicity of Power Indices</field>
      <field key="403" subkey="">1. Ed.</field>
      <field key="410" subkey="">Wien</field>
      <field key="412" subkey="">Institut für Höhere Studien</field>
      <field key="425" subkey="">1997, February</field>
      <field key="433" subkey="">20 pp.</field>
      <field key="451" subkey="">Institut für Höhere Studien; Reihe Osteuropa; 41</field>
      <field key="461" subkey="">East European Series</field>
      <field key="544" subkey="">IHSRO 41</field>
      <field key="700" subkey="">D71</field>
      <field key="700" subkey="">D72</field>
      <field key="700" subkey="">K40</field>
      <field key="720" subkey="">Committee</field>
      <field key="720" subkey="">Monotonicity</field>
      <field key="720" subkey="">Power Index</field>
      <field key="720" subkey="">Power Axioms</field>
      <field key="720" subkey="">Voting</field>
      <field key="753" subkey="">Abstract: The paper investigates general properties of power indices, measuring the voting power in committees. Concepts of local</field>
      <field key="and" subkey="">global monotonicity of power indices are introduced. Shapley-Shubik, Banzhaf-Coleman, and Holler-Packel indices areanalyzed</field>
      <field key="and" subkey="">it is proved that while Shapley-Shubik index satisfies both local and global monotonicity property, Banzhaf-Coleman satisfies</field>
      <field key="onl" subkey="y">local monotonicity without being globally monotonic and Holler-Packel index satisfies neither local nor global monotonicity</field>
      <unknown>.;</unknown>
    </SEQUENTIAL>
  </section>
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