Circle embeddings with restrictions on Fourier coefficients (Q2173783)

Let \({\mathbb T}\) be the unit circle in the complex plane \({\mathbb C}\) and let \(f:{\mathbb T}\to {\mathbb C}\) be an injective continuous mapping. The authors study the relations between the geometry of \(f({\mathbb T})\) and the Fourier coefficients of \(f\). One of their results is that if \(f\) is star-like then \(|\hat{f}(1)|+|\hat{f}(-1)|>0\). Another result is that the set of \(f:{\mathbb T}\to {\mathbb T}\) of the form \(B_1/B_2\), where \(B_1, B_2\) are finite Blaschke products, is connected in the uniform topology.