The tricorn is the connectedness locus of the family of anti-holomorphic quadratic polynomials. Hubbard and Schleicher proved that many "umbilical cords" of hyperbolic components, which seem to connect them to the main hyperbolic component in numerical pictures, do not land. This result strongly suggests that "baby tricorn-like sets" are not homeomorphic to the tricorn itself, unlike in the case of the Mandelbrot set. We apply their method to other situation, such as umbilical cords inside "baby tricorn-like sets" and external rays, and discuss existence of such wiggly features and if "baby tricorn-like sets" are (dynamically) homeomorphic to the tricorn or not.