Details

<b>CHAPTER 1 INTRODUCTION 1</b> <p>1.1 Introductory remarks and outline 1</p> <p>1.2 Some mathematical prerequisites 2</p> <p>1.3 Parametric models 7</p> <p><b>Part I Lods functions and inferential separation</b></p> <p><b>CHAPTER 2 LIKELIHOOD AND PLAUSIBILITY 11</b></p> <p>2.1 Universality 11</p> <p>2.2 Likelihood functions and plausibility functions 12</p> <p>2.3 Complements 16</p> <p>2.4 Notes 16</p> <p><b>CHAPTER 3 SAMPLE-HYPOTHESIS DUALITY AND LODS FUNCTIONS 19</b></p> <p>3.1 Lods functions 20</p> <p>3.2 Prediction functions 23</p> <p>3.3 Independence 26</p> <p>3.4 Complements 30</p> <p>3.5 Notes 31</p> <p><b>CHAPTER 4 LOGIC OF INFERENTIAL SEPARATION. ANCILLARITY AND SUFFICIENCY 33</b></p> <p>4.1 On inferential separation. Ancillarity and sufficiency 33</p> <p>4.2 B-sufficiency and B-ancillarity 38</p> <p>4.3 Nonformation 46</p> <p>4.4 S-, G-, and M-ancillarity and -sufficiency 49</p> <p>4.5 Quasi-ancillarity and Quasi-sufficiency 57</p> <p>4.6 Conditional and unconditional plausibility functions 58</p> <p>4.7 Complements 62</p> <p>4.8 Notes 68</p> <p><b>Part II Convex analysis, unimodality, and Laplace transforms</b></p> <p><b>CHAPTER 5 CONVEX ANALYSIS 73</b></p> <p>5.1 Convex sets 73</p> <p>5.2 Convex functions 76</p> <p>5.3 Conjugate convex functions 80</p> <p>5.4 Differential theory 84</p> <p>5.5 Complements 89</p> <p><b>CHAPTER 6 LOG-CONCAVITY AND UNIMODALITY 93</b></p> <p>6.1 Log-concavity 93</p> <p>6.2 Unimodality of continuous-type distributions 96</p> <p>6.3 Unimodality of discrete-type distributions 98</p> <p>6.4 Complements 100</p> <p><b>CHAPTER 7 LAPLACE TRANSFORMS 103</b></p> <p>7.1 The Laplace transform 103</p> <p>7.2 Complements 107</p> <p><b>Part III Exponential families</b></p> <p><b>CHAPTER 8 INTRODUCTORY THEORY OF EXPONENTIAL FAMILIES 111</b></p> <p>8.1 First properties 111</p> <p>8.2 Derived families 125</p> <p>8.3 Complements 133</p> <p>8.4 Notes 136</p> <p><b>CHAPTER 9 DUALITY AND EXPONENTIAL FAMILIES 139</b></p> <p>9.1 Convex duality and exponential families 140</p> <p>9.2 Independence and exponential families 147</p> <p>9.3 Likelihood functions for full exponential families 150</p> <p>9.4 Likelihood functions for convex exponential families 158</p> <p>9.5 Probability functions for exponential families 164</p> <p>9.6 Plausibility functions for full exponential families 168</p> <p>9.7 Prediction functions for full exponential families 170</p> <p>9.8 Complements 173</p> <p>9.9 Notes 190</p> <p><b>CHAPTER 10 INFERENTIAL SEPARATION AND EXPONENTIAL FAMILIES 191</b></p> <p>10.1 Quasi-ancillarity and exponential families 191</p> <p>10.2 Cuts in general exponential families 196</p> <p>10.3 Cuts in discrete-type exponential families 202</p> <p>10.4 S-ancillarity and exponential families 208</p> <p>10.5 M-ancillarity and exponential families 211</p> <p>10.6 Complement 218</p> <p>10.7 Notes 219</p> <p>References 221</p> <p>Author index 231</p> <p>Subject index 233</p>

<b>Ole Barndorff-Nielsen</b> is a renowned Danish statistician, Professor Emeritus at Aarhus University at the Thiele Centre for Applied Mathematics in Natural Science and affiliated with the <i>Center for Research in Econometric Analysis of Time Series</i> (CREATES).  Since 2008 he has also been affiliated to Institute of Advanced Studies, Technical University Munich.

GB