I'm Looking for a book, that can serve as a "compilation" sort of "table book" of typical spaces, ex. Projective Spaces, Torus, Steiner's Roman, and stuff like that... i know where to find references and do figure out some proprieties but for some things, would be more confortable to have a "fix" reference for this things and not necessarily go book by book...
Any Ideas?
In analogy kind of Abramowitz but for Geometry/Topology
The book Counterexamples in Topology would seem to fit your description, though it doesn't seem to contain the specific examples you've listed. The link is to the Wikipedia page; here is the book on Amazon.