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Global Analysis: Differential Forms in Analysis, Geometry and Physics
Ilka Agricola and Thomas Friedrich
Publication Year: 2002
ISBN-10: 0-8218-2951-3
ISBN-13: 978-0-8218-2951-3
Graduate Studies in Mathematics, vol. 52

This page is maintained by the authors.

Contact information:

• Ilka Agricola and Thomas Friedrich
• Institut für Mathematik
• Humbolt Universität zu Berlin
• Unter den Linden 6
• D-10099 Berlin
• Germany
• agricola@mathematik.hu-berlin.de

Errata

We thank all colleagues who pointed out mistakes and misprints. Any more hints are welcome !

Known mistakes so far:

p. 6, l. -4: The volume form should be defined as $\sigma_1\wedge\ldots\wedge\sigma_n$, independent of the signature, i.e. the factor $(-1)^q$ should be discarded.

p. 127, l. 13-15: in a), there is a typo, the equation should read $(e^{2t} - x^2) + x dx/dt =0$.

    b) is ok,

    c) should be deleted (not integrable by any elementary means).

p. 127, l. -3: Add the initial condition that $A$ should coincide with a given matrix $A_0$ for $t=0$, $A(0)=A_0$.

p. 178, l. 7/9: replace "meridian" by "parallel circle" (translation mistake).

p.223, l. 16: "and equality holds if $G$ is connected" (translation mistake).