Series was designed to cover groups of books generally understood as such see Wikipedia: Book series. Like many concepts in the book world, "series" is a somewhat fluid and contested notion. A good rule of thumb is that series have a conventional name and are intentional creations , on the part of the author or publisher.
For now, avoid forcing the issue with mere "lists" of works possessing an arbitrary shared characteristic, such as relating to a particular place. Avoid series that cross authors, unless the authors were or became aware of the series identification eg. Also avoid publisher series, unless the publisher has a true monopoly over the "works" in question.
So, the Dummies guides are a series of works. But the Loeb Classical Library is a series of editions, not of works.
Cambridge studies in advanced mathematics | Awards | LibraryThing
Steele Prize. How do series work? Helpers cpg , davidgn 18 , AnnaClaire 17 , BogAl 5 , fdholt 2 , gangleri 1 , yue 1 , westher 1 , marymcl 1. Series by cover 1—8 of next show all. Algebraic Automata Theory by M. Geometric analysis by Peter Li. Period mappings and period domains by James A. Sets of finite perimeter and geometric variational problems an introduction to geometric measure theory by Francesco Maggi.
Multidimensional Real Analysis 1: Differentiation
Zeta functions of graphs : a stroll through the garden by Audrey Terras. Ergodic Theory by Karl E. Stone Spaces by Peter T.
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Commutative Ring Theory by Hideyuki Matsumura. Finite Group Theory by M. Eigenvalues and S-Numbers by Albrecht Pietsch. Algebraic Homotopy by Hans-Joachim Baues. An introduction to harmonic analysis on semisimple Lie groups by V. Groups Acting on Graphs by Warren Dicks. Part 1 : Basic Theory And Examples.
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Cellular Structures in Topology by Rudolf Fritsch. Banach Spaces for Analysts by P. Algebraic Number Theory by A. Davies Spectral theory and differential operators 43 J. Diestel, H. Tonge Absolutely summing operators 44 P. Mattila Geometry of sets and measures in euclidean spaces 45 R.
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Pinsky Positive harmonic functions and diffusion 46 G. Tenenbaum Introduction to analytic and probabilistic number theory 47 C. Peskine An algebraic introduction to complex projective geometry I 48 Y. Coifman Wavelets and operators II 49 R. Stanley Enumerative combinatorics I 50 I. Porteous Clifford algebras and the classical groups 51 M.
Audin Spinning tops 52 V. Jurdjevic Geometric control theory 53 H. Voelklein Groups as Galois groups 54 J. Le Potier Lectures on vector bundles 55 D. Bump Automorphic forms 56 G. Davey Natural dualities for the working algebraist 59 P. Taylor Practical foundations of mathematics 60 M. Sharp Local cohomology 61 J.
Dixon, M. Du Sautoy, A. Segal Analytic pro-p groups, 2nd edition 62 R. Stanley Enumerative combinatorics II 64 J. Blei Analysis in integer and fractional dimensions 72 F.
Janelidze Galois theories 73 B. Bollobs Random graphs 74 R. Dudley Real analysis and probability 75 T. Sheil-Small Complex polynomials 76 C.
Voisin Hodge theory and complex algebraic geometry I 77 C. Voisin Hodge theory and complex algebraic geometry II 78 V. Paulsen Completely bounded maps and operator algebra 79 F. Holden Soliton equations and their algebro-geometric solutions I 80 F. Subject to statutory exception and to the provision of relevant collective licensing agreements, no reproduction of any part may take place without the written permission of Cambridge University Press.
This book, which is in two parts, provides an introduction to the theory of vector- valued functions on Euclidean space. We focus on four main objects of study and in addition consider the interactions between these. Volume I is devoted to differentiation.