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is there an intermediate functional space Y$Y$ such that the Sobolev space W^1,N$W^{1,N}$ compactly embeds in Y$Y$ and Y$Y$ continuously embeds in L^N$L^N$, where N$N$ is the ambient space dimension?
Thank you
is there an intermediate functional space Y such that the Sobolev space W^1,N compactly embeds in Y and Y continuously embeds in L^N, where N is the ambient space dimension?
Thank you
is there an intermediate functional space $Y$ such that the Sobolev space $W^{1,N}$ compactly embeds in $Y$ and $Y$ continuously embeds in $L^N$, where $N$ is the ambient space dimension?
Thank you
is there an intermediate functional space Y such that the Sobolev space W^1,N compactly embeds in Y and Y continuously embeds in L^N, where N is the ambient space dimension?
Thank you
