Paul Marriott / Mark Salmon (eds.)
Applications of Differential Geometry to Econometrics
Herausgeber: Marriott, Paul; Salmon, Mark
Paul Marriott / Mark Salmon (eds.)
Applications of Differential Geometry to Econometrics
Herausgeber: Marriott, Paul; Salmon, Mark
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Originally published in 2000, this volume was an early example of the application of differential geometry to econometrics.
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Originally published in 2000, this volume was an early example of the application of differential geometry to econometrics.
Produktdetails
- Produktdetails
- Verlag: Cambridge University Press
- Seitenzahl: 336
- Erscheinungstermin: 1. November 2010
- Englisch
- Abmessung: 235mm x 157mm x 24mm
- Gewicht: 699g
- ISBN-13: 9780521651165
- ISBN-10: 0521651166
- Artikelnr.: 32732111
- Verlag: Cambridge University Press
- Seitenzahl: 336
- Erscheinungstermin: 1. November 2010
- Englisch
- Abmessung: 235mm x 157mm x 24mm
- Gewicht: 699g
- ISBN-13: 9780521651165
- ISBN-10: 0521651166
- Artikelnr.: 32732111
Introduction P. Marriott and M. Salmon; 1. An introduction to differential
geometry P. Marriott and M. Salmon; 2. Orthogonal projection, nested models
and encompassing Maozu Lu and G. Mizon; 3. Exact properties of the maximum
likelihood estimator in exponential regression models G. Hillier and R.
O'Brien; 4. Empirical likelihood estimation and inference R. Smith; 5.
Measuring earnings differentials with frontier functions and Rao distances
U. Jensen; 6. First order predictive densities J. M. Corcuera and F.
Giummole; 7. An alternative comparison of classical tests: assessing the
effects of curvature K. J. van Garderen; 8. Testing for unit roots in AR
and MA Models T. Rothenberg; 9. Efficiency and robustness in a geometrical
perspective R. Davidson; 10. Paramaterisations and transformations; An
elementary introduction to Amari's differential geometry F. Critchley, P.
Marriott and M. Salmon.
geometry P. Marriott and M. Salmon; 2. Orthogonal projection, nested models
and encompassing Maozu Lu and G. Mizon; 3. Exact properties of the maximum
likelihood estimator in exponential regression models G. Hillier and R.
O'Brien; 4. Empirical likelihood estimation and inference R. Smith; 5.
Measuring earnings differentials with frontier functions and Rao distances
U. Jensen; 6. First order predictive densities J. M. Corcuera and F.
Giummole; 7. An alternative comparison of classical tests: assessing the
effects of curvature K. J. van Garderen; 8. Testing for unit roots in AR
and MA Models T. Rothenberg; 9. Efficiency and robustness in a geometrical
perspective R. Davidson; 10. Paramaterisations and transformations; An
elementary introduction to Amari's differential geometry F. Critchley, P.
Marriott and M. Salmon.
Introduction P. Marriott and M. Salmon; 1. An introduction to differential
geometry P. Marriott and M. Salmon; 2. Orthogonal projection, nested models
and encompassing Maozu Lu and G. Mizon; 3. Exact properties of the maximum
likelihood estimator in exponential regression models G. Hillier and R.
O'Brien; 4. Empirical likelihood estimation and inference R. Smith; 5.
Measuring earnings differentials with frontier functions and Rao distances
U. Jensen; 6. First order predictive densities J. M. Corcuera and F.
Giummole; 7. An alternative comparison of classical tests: assessing the
effects of curvature K. J. van Garderen; 8. Testing for unit roots in AR
and MA Models T. Rothenberg; 9. Efficiency and robustness in a geometrical
perspective R. Davidson; 10. Paramaterisations and transformations; An
elementary introduction to Amari's differential geometry F. Critchley, P.
Marriott and M. Salmon.
geometry P. Marriott and M. Salmon; 2. Orthogonal projection, nested models
and encompassing Maozu Lu and G. Mizon; 3. Exact properties of the maximum
likelihood estimator in exponential regression models G. Hillier and R.
O'Brien; 4. Empirical likelihood estimation and inference R. Smith; 5.
Measuring earnings differentials with frontier functions and Rao distances
U. Jensen; 6. First order predictive densities J. M. Corcuera and F.
Giummole; 7. An alternative comparison of classical tests: assessing the
effects of curvature K. J. van Garderen; 8. Testing for unit roots in AR
and MA Models T. Rothenberg; 9. Efficiency and robustness in a geometrical
perspective R. Davidson; 10. Paramaterisations and transformations; An
elementary introduction to Amari's differential geometry F. Critchley, P.
Marriott and M. Salmon.