Poland in a Colonial World Order is a study of the interwar Polish state and empire building project in a changing world of empires, nation-states, dominions, protectorates, mandates, and colonies. Drawing from a wide range of sources spanning two continents and five countries, Piotr Puchalski examines how Polish elites looked to expansion in South America and Africa as a solution to both real problems, such as industrial backwardness, and perceived issues, such as the supposed overrepresentation of Jews in "liberal professions." He charts how, in partnership with other European powers and international institutions such as the League of Nations, Polish leaders made attempts to channel emigration to South America, to establish direct trade with Africa, to expedite national minorities to far-away places, and to tap into colonial resources around the globe. Puchalski demonstrates the intersection between such national policies and larger processes taking place at the time, including the internationalist turn of colonialism and the global fascination with technocratic solutions. Carefully researched, the volume is key reading for scholars and advanced students of twentieth-century European history.
Cross-border Water Trade: Legal and Interdisciplinary Perspectives is a critical assessment of one of the growing problems faced by the international community - the global water deficit.Apart from theoretical considerations it has very practical consequences, as cross-border water trade appears to constitute one of the most effective ways of balancing water deficits worldwide.
The aim of this work is to attempt to verify the theoretical concepts associated with the idea of trade and merchants activities in the 10th - 12th century within the extensive body of written sources available. The main case study is trading within the range of the influence of the Ottonian Empire and Byzantium.
In 1807 Napoleon Bonaparte created the Duchy of Warsaw from the Polish lands that had been ceded to France by Prussia. His Civil Code was enforced in the new Duchy too and, unlike the Catholic Church, it allowed the dissolution of marriage by divorce. This book sheds new light on the application of Napoleonic divorce regulations in the Polish lands between 1808-1852. Unlike what has been argued so far, this book demonstrates that divorces were happening frequently in 19th century Poland and even with the same rate as in France. In addition to the analysis of the Napoleonic divorce law, the reader is provided with a fully comprehensive description of parties as well as courts and officials involved in divorce proceedings, their course and the grounds for divorce.
This book presents original problems from graduate courses in pure and applied mathematics and even small research topics, significant theorems and information on recent results. It is helpful for specialists working in differential equations.
Proceedings of the Algebraic Geometry Conference in Honor of F. Hirzebruch's 70th Birthday, May 11-16, 1998, Stefan Banach International Mathematical Center, Warszawa, Poland
Proceedings of the Algebraic Geometry Conference in Honor of F. Hirzebruch's 70th Birthday, May 11-16, 1998, Stefan Banach International Mathematical Center, Warszawa, Poland
This book presents the proceedings from the conference on algebraic geometry in honor of Professor Friedrich Hirzebruch's 70th Birthday. The event was held at the Stefan Banach International Mathematical Center in Warsaw (Poland). Topics covered in the book include intersection theory, singularities, low-dimensional manifolds, moduli spaces, number theory, and interactions between mathematical physics and geometry. Also included are articles from notes of two special lectures. The first, by Professor M. Atiyah, describes the important contributions to the field of geometry by Professor Hirzebruch. The second article contains notes from the talk delivered at the conference by Professor Hirzebruch. Contributors to the volume are leading researchers in the field.
There are several generalizations of the classical theory of Sobolev spaces as they are necessary for the applications to Carnot-Caratheodory spaces, subelliptic equations, quasiconformal mappings on Carnot groups and more general Loewner spaces, analysis on topological manifolds, potential theory on infinite graphs, analysis on fractals and the theory of Dirichlet forms. The aim of this paper is to present a unified approach to the theory of Sobolev spaces that covers applications to many of those areas. The variety of different areas of applications forces a very general setting. We are given a metric space $X$ equipped with a doubling measure $\mu$. A generalization of a Sobolev function and its gradient is a pair $u\in L^{1}_{\rm loc}(X)$, $0\leq g\in L^{p}(X)$ such that for every ball $B\subset X$ the Poincare-type inequality $ \intbar_{B} u-u_{B} \, d\mu \leq C r ( \intbar_{\sigma B} g^{p}\, d\mu)^{1/p}\,$ holds, where $r$ is the radius of $B$ and $\sigma\geq 1$, $C>0$ are fixed constants. Working in the above setting we show that basically all relevant results from the classical theory have their counterparts in our general setting. These include Sobolev-Poincare type embeddings, Rellich-Kondrachov compact embedding theorem, and even a version of the Sobolev embedding theorem on spheres. The second part of the paper is devoted to examples and applications in the above mentioned areas.
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