ASK NOT WHAT THE BUTLER DID, BUT WHAT HE CAN DO FOR YOUWe all know the cliche from the movies and board games about the butler doing it, but what was it the butler did? In the hotel environment, the b
Mayordomos, Profesionales del Siglo XXI, ha sido creado para ayudar tanto a aquellos en busca de una agradecida carrera laboral como a aquellos que buscan contratarlos, ya sea en una inmensa propiedad
The Novikov Conjecture is the single most important unsolved problem in the topology of high-dimensional non-simply connected manifolds. These two volumes are the outgrowth of a conference held at the Mathematisches Forschungsinstitut Oberwolfach (Germany) in September, 1993, on the subject of `Novikov Conjectures, Index Theorems and Rigidity'. They are intended to give a snapshot of the status of work on the Novikov Conjecture and related topics from many points of view: geometric topology, homotopy theory, algebra, geometry, analysis.
The Novikov Conjecture is the single most important unsolved problem in the topology of high-dimensional non-simply connected manifolds. These two volumes are the outgrowth of a conference held at the Mathematisches Forschungsinstitut Oberwolfach (Germany) in September 1993, on the subject of 'Novikov Conjectures, Index Theorems and Rigidity'. They are intended to give a snapshot of the status of work on the Novikov Conjecture and related topics from many points of view: geometric topology, homotopy theory, algebra, geometry and analysis. Volume 1 contains: • A detailed historical survey and bibliography of the Novikov Conjecture and of related subsequent developments, including an annotated reprint (both in the original Russian and in English translation) of Novikov's original 1970 statement of his conjecture • An annotated problem list • The texts of several important unpublished classic papers by Milnor, Browder, and Kasparov • Research/survey papers on the Novikov Conjecture by Fer
Can tennis really be this simple?Just ask the dozens of world-class players who have made it to the top using Oscar Wegner’s groundbreaking approach. But if playing tennis isn’t so easy f
