data:image/jpg;base64,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

A proposta de emenda à Constituição (PEC) que prevê o fim das coligações partidárias recebeu, hoje (5), novo aval da Comissão de Constituição e Justiça (CCJ) do Senado. O texto, que já estava no plenário da Casa, tinha retornado à comissão para que fossem analisadas três emendas de autoria do senador Antônio Carlos Valadares (PSB-SE).
As emendas, todas rejeitadas, tratavam de um mesmo assunto. O senador propunha que, diante da proposta de fim das coligações para eleições proporcionais, os partidos passassem a poder se reunir em federações. Após se unirem, as agremiações passariam então a atuar como um único partido.

A sugestão foi rejeitada pelos senadores da CCJ que consideraram que a finalidade seria a mesma das coligações eleitorais. “Temos que fazer uma opção com clareza: queremos construir partidos políticos ou queremos sustentar promiscuidades partidárias existentes na política brasileira?”, indagou o líder do PSDB, senador Álvaro Dias (PR).
O líder do PCdoB, senador Inácio Arruda (CE), chegou a defender a manutenção das coligações como única forma de sobrevida para os pequenos partidos. “O caminho não é o da restrição”, sustentou. Mas o pleito dos pequenos partidos não foi atendido pelo relator da matéria, senador Valdir Raupp (PMDB-RO). Na opinião dele, o fim das coligações partidárias para eleições proporcionais – de deputados e vereadores – irá fortalecer as agremiações, que passarão a manter seus programas partidários.
A PEC, que faz parte do conjunto de propostas da reforma política no Senado, voltará agora para ser apreciada pelo plenário, onde precisará passar por cinco sessões de discussão antes de ser votada em dois turnos. Para ser aprovada, ela precisa receber voto favorável de 49 senadores. O texto mantém a possibilidade de coligações para eleições majoritárias – para chefes do Poder Executivo e senadores.

 

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