دانلود کتاب Weak Convergence of Measures
دسته: احتمال
کتاب همگرایی ضعیف اقدامات نسخه زبان اصلی
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توضیحاتی در مورد کتاب Weak Convergence of Measures
نام کتاب : Weak Convergence of Measures
عنوان ترجمه شده به فارسی : همگرایی ضعیف اقدامات
سری : Probability and Mathematical Statistics
نویسندگان : Harald Bergström
ناشر : Academic Press
سال نشر : 1982
تعداد صفحات : 260
ISBN (شابک) : 0120910802 , 9780120910809
زبان کتاب : English
فرمت کتاب : pdf
حجم کتاب : 9 مگابایت
بعد از تکمیل فرایند پرداخت لینک دانلود کتاب ارائه خواهد شد. درصورت ثبت نام و ورود به حساب کاربری خود قادر خواهید بود لیست کتاب های خریداری شده را مشاهده فرمایید.
توضیحاتی در مورد کتاب :
همگرایی ضعیف معیارها اطلاعات مربوط به جنبه های اساسی همگرایی ضعیف در نظریه احتمال را فراهم می کند. این کتاب موضوعات مختلفی از جمله متغیرهای تصادفی، فضاهای هیلبرت، تبدیلهای گاوسی، فضاهای احتمال و متغیرهای تصادفی را پوشش میدهد. این کتاب که در شش فصل سازماندهی شده است، با مروری بر مفاهیم بنیادی اولیه، از جمله مجموعهها، کلاسهای مختلف مجموعهها، فضاهای توپولوژیکی مختلف، و کلاسهای مختلف توابع و مقیاسها آغاز میشود. این متن سپس با ارائه یک معرفی دقیق از انتگرال انتزاعی به عنوان تابعی خطی و محدود، ارتباط بین عملکردها و معیارها را فراهم می کند. فصلهای دیگر همگرایی ضعیف دنبالهای از اندازهگیریها را در نظر میگیرند، مانند همگرایی دنبالهای از تابعهای محدود و خطی. این کتاب همچنین به بحث همگرایی ضعیف در فضاهای C و D می پردازد که برای محدود کردن مشکلات کاهش می یابد. فصل آخر به همگرایی ضعیف در فضاهای هیلبرت قابل تفکیک می پردازد. این کتاب منبع ارزشمندی برای ریاضیدانان است.
فهرست مطالب :
Preface Chapter I Spaces, Mappings, and Measures 1. Classes of Sets 2. Alexandrov Spaces, Topological Spaces, and Measurable Spaces 3. Mappings 4. Classes of Bounded, Real-Valued, Continuous Functions and Measurable Functions 5. Normal Spaces and Completely Normal Spaces 6. Sequences of Sets 7. Metric Spaces 8. Mappings into Metric Spaces 9. Product Spaces 10. Product Spaces of Infinitely Many Factors 11. Some Particular Metric Spaces 12. Measures on an Algebra of Subsets 13. Measures on A-Spaces 14. Extensions of Measures 15. Measures on Infinite-Dimensional Product Spaces 16. Completion of Measures, Continuity Almost Surely and Almost Everywhere Chapter II Integrals, Bounded, Linear Functionals, and Measures 1. Integrals as Nonnegative, Bounded, Linear Functionals 2. Generalizations of the Abstract Integral 3. The Representations of Bounded, Linear Functionals by Integrals 4. Measures Belonging to a Nonnegative, Bounded, Linear Functional on a Normal A-Space 5. Transformations of Measures and Integrals 6. Constructions of Measures on Metric Spaces by Riemann-Stieltjes Integrals 7. Measures on Product Spaces 8. Convolutions of Measures 9. Probability Spaces and Random Variables 10. Expectations, Conditional Expectations, and Conditional Probabilities 11. The Jensen Inequality Chapter III Weak Convergence in Normal Spaces 1. Weak Convergence of Sequences of Measures on Normal Spaces 2. Weak Convergence of Sequences of Induced Measures and Transformed Measures 3. Uniformly s-Smooth Sequences of Measures 4. Weak Limits of s-Smooth Measures on Completely Normal A-Spaces 5. Reduction of Weak Limit Problems by Transformations 6. The Reduction Procedure for Metric Spaces 7. Weak Convergence of Tight Sequences of Measures on Metric Spaces 8. Seminorms on an Algebra 9. Some Fundamental Identities and Inequalities for Products 10. Convergence in Seminorms of Powers to Infinitely Divisible Elements 11. Convergence in Seminorms of Products Chapter IV Weak Convergence ON R(k) 1. s-Smooth Measures on R(k) 2. Gaussian Measures and Gaussian Transforms 3. Fourier Transforms and Their Relation to Gaussian Transforms 4. Gaussian Seminorms 5. The Semigroup of s-Smooth Measures 6. Stability Conditions for Convolution Products That Converge Weakly 7. The Unique Divisibility of Infinitely Divisible s-Smooth Measures 8. Lévy Measures on R(k); Gaussian Functionals 9. Weak Convergence of Convolution Powers of s-Smooth Measures 10. The Semigroup of Infinitely Divisible s-Smooth Measures 11. The Characteristic Function of an Infinitely Divisible Probability Measure on R{k) and Its Connection with the Gaussian Functional 12. Weak Convergence of Convolution Products 13. Stable Probability Measures 14. Gaussian Transforms and Gaussian Seminorms of Random Variables: A Comparison Method 15. Weak Limits of Distributions of Sums of Martingale Differences 16. Weak Limits of Distributions of Sums of Random Variables under Independence and f-Mixing Chapter V Weak Convergence on the C- and D-Spaces 1. The C- and D-Spaces 2. Projections 3. Approximations of Functions by Schauder Sequences 4. Weak Convergence 5. Fluctuations and Weak Convergence 6. Construction of Probability Measures on the C- and D-Spaces 7. Gaussian s-Smooth Measures on the C- and D-Spaces 8. Embedding of Sums of Real-Valued Random Variables in Random Functions into the D-Space 9. Empirical Distribution Functions 10. Embedding of Sequences of Martingale Differences in Random Functions Chapter VI Weak Convergence in Separable Hilbert Spaces 1. s-Smooth Measures on l2-Space 2. Weak Convergence of Convolution Products of Probability Measures on l2 3. Necessary and Sufficient Conditions for the Weak Convergence of Convolution Products of Symmetrical Probability Measures 4. Necessary and Sufficient Conditions for the Weak Convergence of Convolution Powers of Probability Measures 5. Different Forms of Necessary and Sufficient Conditions for the Weak Convergence of Convolution Powers of Probability Measures on l2 6. Invariants of Infinitely Divisible s-Smooth Measures on l2 Gaussian Functionals 7. The Characteristic Function of Probability Measures on l2 Appendix A Product-Sum Identity Notes and Comments Bibliography Index
توضیحاتی در مورد کتاب به زبان اصلی :
Weak Convergence of Measures provides information pertinent to the fundamental aspects of weak convergence in probability theory. This book covers a variety of topics, including random variables, Hilbert spaces, Gaussian transforms, probability spaces, and random variables. Organized into six chapters, this book begins with an overview of elementary fundamental notions, including sets, different classes of sets, different topological spaces, and different classes of functions and measures. This text then provides the connection between functionals and measures by providing a detailed introduction of the abstract integral as a bounded, linear functional. Other chapters consider weak convergence of sequences of measures, such as convergence of sequences of bounded, linear functionals. This book discusses as well the weak convergence in the C- and D-spaces, which is reduced to limit problems. The final chapter deals with weak convergence in separable Hilbert spaces. This book is a valuable resource for mathematicians.
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