Let \(M^ n\) be a closed and oriented submanifold of a closed and oriented manifold \(N^ n\), \(n>m+1\), such that \([M,i]=0 \in \Omega_ m (N)\), where \(i:M \to N\) is the inclusion and \(\Omega_ m (N)\) is the \(m\)-th oriented bordism group of \(N\). If \(n=m+2\) or \(m \leq 3\) or \(m \leq 4\) and \(n \neq 7\) then \(M\) bounds in \(N\).