On the coefficients estimate of K-quasiconformal harmonic mappings

Recently, the Wang et al. \cite{wwrq} proposed a coefficient conjecture for the family ${\mathcal S}_H^0(K)$ of $K$-quasiconformal harmonic mappings $f = h + \overline{g}$ that are sense-preserving and univalent, where $h(z)=z+\sum_{k=2}^{\infty}a_kz^k$ and $g(z)=\sum_{k=1}^{\infty}b_kz^k$ are analytic in the unit disk $|z|<1$, and the dilatation $\omega =g'/h'$ satisfies the condition $|\omega(z)| \leq k<1$ for $\ID$, with $K=\frac{1+k}{1-k}\geq 1$. The main aim of this article is provide an affirmative answer to this conjecture by proving this conjecture for every starlike function (resp. close-to-convex function) from $\mathcal{S}^0_H(K)$. In addition, we verify this conjecture also for typically real $K$-quasiconformal harmonic mappings. Also, we establish sharp coefficients estimate of convex $K$-quasiconformal harmonic mappings. %Specially, we construct a convex $K$-quasiconformal harmonic mapping, and get sharp estimate of $|a_2|$ and $|b_2|$ of convex $K$-quasiconformal harmonic mappings. By doing so, our work provides a document in support of the main conjecture of Wang et al..