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Mathematicians under the Nazis
Contrary to popular belief--and despite the expulsion, emigration, or death of many German mathematicians--substantial mathematics was produced in Germany during 1933-1945. In this landmark social history of the mathematics community in Nazi Germany, Sanford Segal examines how the Nazi years affected the personal and academic lives of those German mathematicians who continued to work in Germany. The effects of the Nazi regime on the lives of mathematicians ranged from limitations on foreign contact to power struggles that rattled entire institutions, from changed work patterns to military draft, deportation, and death. Based on extensive archival research, Mathematicians under the Nazis show...
Collected Papers of Hans Rademacher
These two volumes contain all the papers published by Hans Rademacher, either alone or as joint author, essentially in chronological order. Included also are a collection of published abstracts, a number of papers that appeared in institutes and seminars but are only now being formally published, and several problems posed and/or solved by Rademacher. The editor has provided notes for each paper, offering comments and making corrections. He has also contributed a biographical sketch. The earlier papers are on real variables, measurability, convergence factors, and Euler summability of series. This phase of Rademacher's work culminates in a paper of 1922, in which he introduced the systems of...
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Encyclopedia of Nordic Crime Fiction
Since the late 1960s, the novels of Sjowall and Wahloo's Martin Beck detective series, along with the works of Henning Mankell, Hakan Nesser and Stieg Larsson, have sparked an explosion of Nordic crime fiction--grim police procedurals treating urgent sociopolitical issues affecting the contemporary world. Steeped in noir techniques and viewpoints, many of these novels are reaching international audiences through film and television adaptations. This reference guide introduces the world of Nordic crime fiction to English-speaking readers. Caught between the demands of conscience and societal strictures, the detectives in these stories--like the heroes of Norse mythology--know that they and their world must perish, but fight on regardless of cost. At a time of bleak eventualities, Nordic crime fiction interprets the bitter end as a celebration of the indomitable human spirit.
A Century of Mathematical Meetings
This features contributions by and about some of the luminaries of American mathematics. Included here are essays based on presentations made during the symposium Celebration of 100 Years of Annual Meetings, held at the AMS meeting in Cincinnati in 1994. The papers in this collection form a vibrant collage of mathematical personalities. This book weaves a tapestry of mathematical life in the United States, with emphasis on the past seventy years. Photographs, old and recent, further decorate that tapestry. There are many stories to be told about the making of mathematics and the personalities of those who meet to share it. This collection offers a celebration in words and pictures of a century of American mathematical life.
The Nordic Languages
The handbook is not tied to a particular methodology but keeps in principle to a pronounced methodological pluralism, encompassing all aspects of actual methodology. Moreover it combines diachronic with synchronic-systematic aspects, longitudinal sections with cross-sections (periods such as Old Norse, transition from Old Norse to Early Modern Nordic, Early Modern Nordic 1550-1800 and so on). The description of Nordic language history is built upon a comprehensive collection of linguistic data; it consists of more than 200 articles written by a multitude of authors from Scandinavian and German and English speaking countries. The organization of the book combines a central part on the detailed chronological developments and some chapters of a more general character: chapters on theory and methodology in the beginning and on overlapping spatio-temporal topics in the end.
The Mathematical Legacy of Srinivasa Ramanujan
Srinivasa Ramanujan was a mathematician brilliant beyond comparison who inspired many great mathematicians. There is extensive literature available on the work of Ramanujan. But what is missing in the literature is an analysis that would place his mathematics in context and interpret it in terms of modern developments. The 12 lectures by Hardy, delivered in 1936, served this purpose at the time they were given. This book presents Ramanujan’s essential mathematical contributions and gives an informal account of some of the major developments that emanated from his work in the 20th and 21st centuries. It contends that his work still has an impact on many different fields of mathematical research. This book examines some of these themes in the landscape of 21st-century mathematics. These essays, based on the lectures given by the authors focus on a subset of Ramanujan’s significant papers and show how these papers shaped the course of modern mathematics.
Planning for Death
The volume Planning for Death: Wills and Death-Related Property Arrangements in Europe, 1200-1600 analyses death-related property transfers in several European regions (England, Poland, Italy, South Tirol, and Sweden). Laws and customary practice provided a legal framework for all post-mortem property devolution. However, personal preference and varied succession strategies meant that individuals could plan for death by various legal means. These individual legal acts could include matrimonial property arrangements (marriage contracts, morning gifts) and legal means of altering heirship by subtracting or adding heirs. Wills and testamentary practice are given special attention, while the volume also discusses the timing of the legal acts, suggesting that while some people made careful and timely arrangements, others only reacted to sudden events. Contributors are Christian Hagen, R.H. Helmholz, Mia Korpiola, Anu Lahtinen, Marko Lamberg, Margareth Lanzinger, Janine Maegraith, Federica Masè, Anthony Musson, Tuula Rantala, Elsa Trolle Önnerfors, and Jakub Wysmułek.
Analysis, Geometry, Number Theory: The Mathematics of Leon Ehrenpreis
This book presents the proceedings from the conference honoring the work of Leon Ehrenpreis. Professor Ehrenpreis worked in many different areas of mathematics and found connections among all of them. For example, one can find his analytic ideas in the context of number theory, geometric thinking within analysis, transcendental number theory applied to partial differential equations, and more. The conference brought together the communities of mathematicians working in the areas of interest to Professor Ehrenpreis and allowed them to share the research inspired by his work. The collection of articles here presents current research on PDEs, several complex variables, analytic number theory, integral geometry, and tomography. The work of Professor Ehrenpreis has contributed to basic definitions in these areas and has motivated a wealth of research results. This volume offers a survey of the fundamental principles that unified the conference and influenced the mathematics of Leon Ehrenpreis.
