Tekijä: Caroline S. Rupp; Jennifer Antomo; Konrad Duden; Malte Friedrich Kramme; Tobias Lutzi; Martina Melcher; Friederi Pförtner Kustantaja: Mohr Siebeck (2020) Saatavuus: Ei tiedossa
Tekijä: Jürgen Müller; Klaus-Jürgen Richtsteiger; Martin Rupp; Johannes Krohn; Stefan Kurtenbach; Raimund Frühbauer; Stefa Felsch Kustantaja: Europa Lehrmittel Verlag (2010) Saatavuus: Selvityksessä
Tekijä: Stefan Felsch; Raimund Frühbauer; Johannes Krohn; Stefan Kurtenbach; Jürgen Müller; Klaus-Jürgen Richtsteiger; Marti Rupp Kustantaja: Europa Lehrmittel Verlag (2012) Saatavuus: Ei tiedossa
Tekijä: Stefan Felsch; Raimund Frühbauer; Johannes Krohn; Stefan Kurtenbach; Jürgen Müller; Martin Rupp; Rolf Schmalohr Kustantaja: Europa Lehrmittel Verlag (2013) Saatavuus: Ei tiedossa
Tekijä: Dorothea Bartnik; Stefan Felsch; Raimund Frühbauer; Johannes Krohn; Stefan Kurtenbach; Jürgen Müller; Martin Rupp Kustantaja: Europa Lehrmittel Verlag (2014) Saatavuus: Ei tiedossa
Tekijä: Gerhard Keiper; Martin Kroeger; Peter Grupp; Rolf Messerschmidt; Johannes Kunisch; Johannes Hurter; Christian Scheidemann Kustantaja: Brill Schoningh (2000) Saatavuus: Ei tiedossa
Springer Sivumäärä: 802 sivua Asu: Kovakantinen kirja Painos: 2013 Julkaisuvuosi: 2013, 28.05.2013 (lisätietoa) Kieli: Englanti
Volumes I through V of Theorems and Problems in Functional Analysis: The Answer Book present different techniques for solving the 828 Exercises found in the A.A. Kirillov and Gvichiani book, entitled Theorems and Problems in Functional Analysis. The original book by Kirillov and Gvichiani was in the Problem Book in Mathematics Series, published by Springer.
This is the most important and rich volume as it focuses on topological vector space and linear operators. This volume covers: convexity, seminorms and Minkowski functions, duality, weak and strong topology, the Hahn Banach theorem and Banach spaces, the Helly theorem, compact sets theory, the Krein-Milman theorem, Fredholm operators, cohomology, Hilbert-Schmidt operators, distributions, functional spaces, the Stone-Weierstrass theorem, smooth functions, locally convex spaces, the dirac distribution, the (Schwarz) kernel theorem, distrbutional derivative, Hilbert Spaces, Rademacher functions, Walsh functions, Haar functions, between principle in Hilbert spaces, and much more.
Supplementing the book, Theorems and Problems in Functional Analysis, these volumes may be used by graduate students taking a course in functional analysis. In order to understand this text, the reader must be familiar with mathematical analysis and real analysis.