?url_ver=Z39.88-2004&rft_val_fmt=info%3Aofi%2Ffmt%3Akev%3Amtx%3Adc&rft.relation=https%3A%2F%2Fpublications.ut-capitole.fr%2Fid%2Feprint%2F3252%2F&rft.title=Consistent+Density+Deconvolution+under+Partially+Known+Error+Distribution&rft.creator=Schwarz%2C+Maik&rft.creator=Van+Bellegem%2C+S%C3%A9bastien&rft.subject=B-+ECONOMIE+ET+FINANCE&rft.description=We+estimate+the+distribution+of+a+real-valued+random+variable+from+contaminated+observations.+The+additive+error+is+supposed+to+be+normally+distributed%2C+but+with+unknown+variance.+The+distribution+is+identifiable+from+the+observations+if+we+restrict+the+class+of+considered+distributions+by+a+simple+condition+in+the+time+domain.+A+minimum+distance+estimator+is+shown+to+be+consistent+imposing+only+a+slightly+stronger+assumption+than+the+identification+condition.&rft.publisher=TSE+Working+Paper&rft.date=2009-10-06&rft.type=Monograph&rft.type=NonPeerReviewed&rft.format=text&rft.language=en&rft.identifier=https%3A%2F%2Fpublications.ut-capitole.fr%2Fid%2Feprint%2F3252%2F1%2Fwp_etrie_97_2009.pdf&rft.identifier=++Schwarz%2C+Maik+and+Van+Bellegem%2C+S%C3%A9bastien+%3Chttps%3A%2F%2Fwww.idref.fr%2F12139171X%3E++(2009)+Consistent+Density+Deconvolution+under+Partially+Known+Error+Distribution.++TSE+Working+Paper%2C+n.+09-097+++++&rft.relation=http%3A%2F%2Ftse-fr.eu%2Fpub%2F22200&rft.language=en