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Introduction to Probabilities Fall 2010 Dept. Electrical Engineering National Tsing Hua University 劉奕汶 What is probability? • Literally, how probable an event is to occur. – We live in a random world – Relative-frequency interpretation • 機率/概率/或然率 – This interpretation is problematic • Involved law of large number • Not all experiments could be repeated • Not all repeating processes have convergent frequency – Axiomatic approach 2 A bit of History • 3500 B.C., Egyptians used bones to gamble – Since then, dice, playing cards, mahjong, etc. • 15-16th centuries: Italy (Galilei et al.) • 17-18th centuries: Western-central Europe – Pascal, Fermat, Laplace, Poisson, Gauss – Huygens (1629-1695) On Calculations in Games of Chance • 19-20th : Russia – 1900: Hilbert’s 23 problems – 1933: Kolmogorov: probability theory axiomatized 3 Probability in EE/CS • Signal processing – “Signal” = Random Process – Random because of noise and uncertainty • Machine learning – Natural language processing – Pattern recognition • Communication – Source coding – Channel coding – Modulation and estimation 4 Probability in Finance/Economics • Investment / Gambling – Portfolio theory • Advertisement / Pricing 5 6 Probability in Physics (i) • Statistical mechanics – Equilibrium – Entropy and 2nd law of thermodynamics – Definition of temperature 7 Probability in Physics (ii) • Quantum mechanics – Schrödinger’s wave function – “Measurement makes reality” • The paradox of Schrödinger’s cat • Einstein’s famous comment 8 Probability in Biomedicine • • • • • Genomics Proteomics Neuroscience Ecology Epidemiology 9 Probability and Statistics • Law of Large Number • Central Limit Theorem – Why Gaussian distribution is “Normal” • Counter-example: stock market 10 Syllabus • Textbook: S. Ghahramani, Fundamentals of Probability: with stochastic processes, 3rd Edition – Chapters 1-3: probability space – Chapters 4-5: discrete random variables – Chapter 6: Continuous random variables – Midterm exam (35%) – – – – Chapters 7: continuous random variables II Chapters 8: bivariate distributions Chapter 10-11: advanced topics (Correlations, LLN, CLT, etc) * Measure theory and axioms of probability – Final exam (35%) • A4 double-side cheat sheet permitted for both exams – 6 homework assignments (30%) • Office hours: Monday 5-6 pm, Rm 704B • Website: http://www.ee.nthu.edu.tw/ywliu/ee3060/ 11 Statistics of last semester’s grades (N = 37) • 期中考: M = 51.4, SD = 7.9 • 期末考: M = 49.3, SD = 10.8 • 總成績: M = 78, SD = 11 – 36 passed, 1 failed. – 4 scored 90 or above (A+) 12
