Topological Classification and Finite Determinacy of knotted maps

Abstract

We show that the knot type of the link of a real analytic map germ with isolated singularity f(R2,0)(R4,0) is a complete invariant for C0- A-equivalence. Moreover, we also prove that isolated instability implies C0-finite determinacy, giving an explicit estimate for its degree. For the general case of real analytic map germs, f (Rn,0) → (Rp,0) (n ≤ p), we use the Lojasiewicz exponent associated to the Mond's double point ideal I2(f) to obtain some criteria of Lipschitz and analytic regularity.