Find Solutions for A Comprehensive Introduction to Differential Geometry

ForMyThunder
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This is not homework:

I was wondering if there was a website that gave the solutions to A Comprehensive Introduction to Differential Geometry by Michael Spivak.

I was learning this on my own. NOT homework.
 
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Well as long as you emphasize that it's NOT homework...

In all seriousness, the closest I've seen to what you are asking about is a class that used the book and the written up solutions for selected exercises by the professor.
 
You an always ask your questions on this forum, as many here are familiar with Spivak's books, and differential geometry in general.
 

Thread 'Injective immersion and embedding'

Hello! There is a simple line in the textbook. If ##S## is a manifold, an injectively immersed submanifold ##M## of ##S## is embedded if and only if ##M## is locally closed in ##S##. Recall the definition. M is locally closed if for each point ##x\in M## there open ##U\subset S## such that ##M\cap U## is closed in ##U##. Embedding to injective immesion is simple. The opposite direction is hard. Suppose I have ##N## as source manifold and ##f:N\rightarrow S## is the injective...
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