A generalization of Thom's transversality theorem
Abstract: We prove a generalization of Thom's transversality theorem. It gives conditions under which the jet map $f_*|Y:Y\subseteq Jr(D,M)\ra Jr(D,N)$ is generically (for $f:M\ra N$) transverse to a submanifold $Z\subseteq Jr(D,N)$. We apply this to study transversality properties of a restriction of a fixed map $g:M\ra P$ to the preimage $(jsf){-1}(A)$ of a submanifold $A\subseteq Js(M,N)$ in terms of transversality properties of the original map $f$. Our main result is that for a reasonable class of submanifolds $A$ and a generic map $f$ the restriction $g|{(jsf){-1}(A)}$ is also generic. We also present an example of $A$ where the theorem fails.
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