Principles of Random Walk
By
Frank Spitzer
Frank Spitzer
1976 • 408 pages

This book is devoted exclusively to a very special class of random processes, namely, to random walk on the lattice points of ordinary Euclidian space. The author considers this high degree of specialization worthwhile because the theory of such random walks is far more complete than that of any larger class of Markov chains. Almost 100 pages of examples and problems are included.

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152 primary books

#34 in Graduate Texts in Mathematics

Graduate Texts in Mathematics is a 152-book series with 154 primary works first released in 1899 with contributions by G. Takeuti, W M Zaring, and John C. Oxtoby.

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Introduction to Axiomatic Set Theory
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Measure and Category: A Survey of the Analogies between Topological and Measure Spaces
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A Course in Homological Algebra
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Category Theory
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A Course in Arithmetic
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Introduction to Lie Algebras and Representation Theory
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Functions of One Complex Variable
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Rings and Categories of Modules
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Measure theory
#19
A Hilbert Space Problem Book
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Fibre Bundles
#21
Linear Algebraic Groups

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