id	author	title	date	pages	extension	mime	words	sentences	flesch	summary	cache	txt
work_b3fp2y4xdfeqjjanl2aoycnixu	John Douglas Moore	On equivariant isometric embeddings	1980	15	.pdf	application/pdf	8078	1460	99	isometric embedding in any finite-dimensional Euclidean space. equivariant isometric embedding, and Step 1 is finished. equivariant isometric embedding theorem may be chosen to be real-analytic. space ~ and an isometric embedding from M into H which is equivariant with n o t have an equivariant isometric embedding into Euclidean space. does have an equivariant isometric embedding into the pseudo-Euclidean space compact then M has an equivariant isometric embedding into some pseudoEuclidean space, N o w suppose we h a d an isometric embedding f : M-ME N which is equivariant with respect to p: G ~ O ( N ) . group) require arbitrarily m a n y dimensions for an equivariant isometric embedding into Euclidean space. These manifolds do not even have equivariant embeddings into Euclidean space. Then M has no equivariant embedding into any Euclidean space. Then M has no equivariant embedding into any Euclidean space.	./cache/work_b3fp2y4xdfeqjjanl2aoycnixu.pdf	./txt/work_b3fp2y4xdfeqjjanl2aoycnixu.txt