M. Bierlaire, Mathematical models for transportation demand analysis, Ph.D. dissertation, Facults Universitaires Notre Dame de la Paix, Namur, Belgium, 1995. Home/Search Document Details and Download
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On the Overspecification of Multinomial and Nested Logit.. - Bierlaire, Lotan, Toint (1996) Self-citation (Bierlaire) (Correct)
....spanfv r ; fv k g k2S g def = fff r v r X k2S ff k v k j ff r ; ff k 2 IR; 8k 2 Sg; 16) containing all linear combinations of fv r ; fv k g k2S g. Proof. The desired result immediately follows from the definition of M and from the linear independency of the family fv r ; fv k g k2S g. See Bierlaire (1996) for additional details. 2 We next prove that M completely characterizes the overall invariant subspace, that is it accounts for all the overspecification of the nested model due to the ASCs. Theorem 5 The subspace M defined by (16) is the overall invariant subspace for the likelihood function ....
Bierlaire, M. (1996). Mathematical models for transportation demand analysis, PhD thesis, Department of Mathematics, FUNDP.
Fast of 3D non-rigid registration and model-based segmentation .. - Thiran, Butz (2000) (Correct)
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M. Bierlaire, Mathematical models for transportation demand analysis, Ph.D. dissertation, Facults Universitaires Notre Dame de la Paix, Namur, Belgium, 1995.
Fast non-rigid registration and model-based segmentation of 3D .. - Thiran, Butz (2000) (1 citation) (Correct)
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M. Bierlaire, Mathematical models for transportation demand analysis, Ph.D. dissertation, Facults Universitaires Notre Dame de la Paix, Namur, Belgium, 1995.
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