If you’ve spent any time in a graduate-level statistics or mathematics program, you’ve likely encountered the name Vijay K. Rohatgi . For decades, his work—specifically An Introduction to Probability and Statistics and the specialized Statistical Inference
The book is not just a list of topics; it is packed with nearly that clarify complex concepts, and a staggering 1,450 problems , with solutions to odd-numbered problems included, making it exceptionally suitable for self-study. vk rohatgi statistical inference pdf repack
| Chapter | Title | Key Topics | |---------|-------|-------------| | 1 | Probability and Measure | Sigma-algebras, measures, Lebesgue integration, convergence theorems | | 2 | Random Variables and Distributions | Measurable functions, distribution functions, densities, multivariate extensions | | 3 | Expectation and Integration | Lebesgue integral, expectation, moments, inequalities (Jensen, Hölder, Minkowski) | | 4 | Modes of Convergence | Almost sure, in probability, in distribution, (L^p) convergence, Slutsky’s theorem | | 5 | Random Samples and Sampling Distributions | Order statistics, sample moments, chi-square, t, F distributions | | 6 | Point Estimation | Unbiasedness, efficiency, consistency, sufficiency, completeness, Rao-Blackwell, Lehmann-Scheffé, Cramér-Rao lower bound | | 7 | Methods of Estimation | MLE, method of moments, least squares, Bayes estimators | | 8 | Hypothesis Testing | Neyman-Pearson lemma, UMP tests, likelihood ratio tests, chi-square goodness-of-fit | | 9 | Interval Estimation | Confidence intervals, pivotal quantities, shortest-length intervals | | 10 | Nonparametric Inference | Sign test, Wilcoxon, runs test, Kolmogorov-Smirnov, rank correlation | | 11 | Asymptotic Theory | Consistency of MLE, asymptotic normality, Wald tests, score tests | If you’ve spent any time in a graduate-level
