This book can serve as a first course on measure theory and measure theoretic probability for upper undergraduate and graduate students of mathematics, statistics and probability. Starting from the basics, the measure theory part covers Caratheodoryâs theorem, LebesgueâStieltjes measures, integration theory, Fatouâs lemma, dominated convergence theorem, basics of Lp spaces, transition and product measures, Fubiniâs theorem, construction of the Lebesgue measure in Rd, convergence of finite measures, JordanâHahn decomposition of signed measures, RadonâNikodym theorem and the fundamental theorem of calculus. The material on probability covers standard topics such as BorelâCantelli lemmas, behaviour of sums of independent random variables, 0-1 laws, weak convergence of probability distributions, in particular via moments and cumulants, and the central limit theorem (via characteristic function, and also via cumulants), and ends with conditional expectation as a natural application of the RadonâNikodym theorem. A unique feature is the discussion of the relation between moments and cumulants, leading to Isserlisâ formula for moments of products of Gaussian variables and a proof of the central limit theorem avoiding the use of characteristic functions. For clarity, the material is divided into 23 (mostly) short chapters. At the appearance of any new concept, adequate exercises are provided to strengthen it. Additional exercises are provided at the end of almost every chapter. A few results have been stated due to their importance, but their proofs do not belong to a first course. A reasonable familiarity with real analysis is needed, especially for the measure theory part. Having a background in basic probability would be helpful, but we do not assume a prior exposure to probability.
