In the paper https://arxiv.org/pdf/0907.0454.pdf on page 5 there is the remark "One should note that the coned-off E8-plumbing manifold admits a circle action that does have more than four orbit types in a neighbourhood of the cone point."

I guess this answers my previous question "https://mathoverflow.net/questions/403581/non-smooth-manifold-with-circle-action-with-fixed-points" but I am not sure since I guess it is possible that the fixed point set it not a submanifold (I only know how to prove this for smooth $S^1$-actions). Could somebody explain how this circle action is constructed? what is the fixed point set? is it a submanifold?

In the paper "A survey of group actions on 4-manifolds" by Allan L. Edmonds on page 5 there is the remark "One should note that the coned-off E8-plumbing manifold admits a circle action that does have more than four orbit types in a neighbourhood of the cone point."

I guess this answers my previous question, but I am not sure since I guess it is possible that the fixed point set it not a submanifold (I only know how to prove this for smooth $S^1$-actions). Could somebody explain how this circle action is constructed? what is the fixed point set? is it a submanifold?