Proof For $1<p< \infty $ , we could apply the result of Chen et al. from [Reference Chen, Huang, Wang and Xiao2], but here we shall give a simple proof which makes no appeal to this deeper result.

Let us write $f=h+\overline {g}$ , and let $F=h+g$ . Then,

$$ \begin{align*}{\operatorname{Re}\,} F = {\operatorname{Re}\,} f = u.\end{align*} $$

If $M_p(r,u)$ has the given order of growth, it follows from Theorem C that

$$ \begin{align*}M_p(r,F') = O \left(\frac{1}{(1-r)^{\beta+1}}\right).\end{align*} $$

Now, we observe

$$ \begin{align*}F'=h'+g'=(1+\omega)h',\end{align*} $$

so that

$$ \begin{align*}|F'|\ge (1-|\omega|)|h'| \ge (1-k)|h'|,\end{align*} $$

as $|\omega | \le k$ . This readily implies

$$ \begin{align*}M_p(r,h')\le \frac{1}{1-k}M_p(r,F') = O \left(\frac{1}{(1-r)^{\beta+1}}\right). \end{align*} $$

Since $|g'|\le k|h'|$ , we also have

$$ \begin{align*}M_p(r,g') = O \left(\frac{1}{(1-r)^{\beta+1}}\right).\end{align*} $$

Therefore, the converse part of Theorem C shows that

$$ \begin{align*}M_p(r,h) = O \left(\frac{1}{(1-r)^{\beta}}\right)=M_p(r,g).\end{align*} $$

For $1 \le p \le \infty $ , Minkowski’s inequality gives

$$ \begin{align*}M_p(r,f) \le M_p(r,h)+M_p(r, g),\end{align*} $$

while for $0<p<1$ , we have

$$ \begin{align*}M_p^p(r,f) \le M_p^p(r,h)+M_p^p(r, g).\end{align*} $$

In either case, we find that

$$ \begin{align*}M_p(r,f) = O \left(\frac{1}{(1-r)^{\beta}}\right),\end{align*} $$

which, in turn, implies

$$ \begin{align*}M_p(r,v) = O \left(\frac{1}{(1-r)^{\beta}}\right).\end{align*} $$

This completes the proof.

Proof As before, we write $f=h+\overline {g}$ and $F=h+g$ . Since $M_p(r,u)$ is bounded, an appeal to Theorem C, for $\beta =0$ , shows that

$$ \begin{align*}M_p(r,F') = O \left(\frac{1}{1-r}\right).\end{align*} $$

The quasiregularity of f, like in the previous proof, then implies

$$ \begin{align*}M_p(r,h') = O \left(\frac{1}{1-r}\right).\end{align*} $$

Without any loss of generality, we assume that $f(0)=0$ . For $0<r<1$ , let $f_r(z)=f(rz)$ . Applying Lemma A for the function $f_r$ , we find

$$ \begin{align*} M_p^p(r,f) & \le C\int_{0}^1 (1-t)^{p-1}M_p^p(rt,h')\, dt \le C\int_{0}^1 \frac{(1-t)^{p-1}}{(1-rt)^p}\, dt\\ & = C\left[\int_{0}^r \frac{(1-t)^{p-1}}{(1-rt)^p}\, dt+\int_{r}^1 \frac{(1-t)^{p-1}}{(1-rt)^p}\, dt\right]\\ & \le C \left[\int_{0}^r \frac{1}{1-t}\, dt+\frac{1}{(1-r)^p}\int_{r}^1 (1-t)^{p-1}\, dt \right]\\&= O\left(\log \frac{1}{1-r}\right). \end{align*} $$

Therefore, it follows that

$$ \begin{align*}M_p(r,v) \le M_p(r,f) = O\left(\left(\log \frac{1}{1-r}\right)^{1/p}\right).\end{align*} $$

The proof is thus complete.

Proof First, we note that if v is continuous on ${\mathbb T}$ , then $v(r{e^{i\theta }})$ is the Poisson integral of $v({e^{i\theta }})$ . Hence, the continuity of $v({e^{i\theta }})$ would imply the continuity of v in $\overline {{\mathbb D}}$ . Therefore, it is enough to show that $v({e^{i\theta }}) \in \Lambda _{\alpha }$ .

Now, suppose $u({e^{i\theta }})\in \Lambda _{\alpha }$ and $f=h+\overline {g}$ . As before, we write $F=h+g$ so that

$$ \begin{align*}{\operatorname{Re}\,} F = {\operatorname{Re}\,} f=u.\end{align*} $$

Since u is continuous in $\overline {{\mathbb D}}$ , we can represent F by the Poisson integral formula

$$ \begin{align*}F(z) = \frac{1}{2\pi}\int_{0}^{2\pi} \frac{e^{it}+z}{e^{it}-z}\, u(e^{it})\, dt+i{\operatorname{Im}\,} F(0).\end{align*} $$

This implies

$$ \begin{align*} F'(z) &= \frac{1}{2\pi}\int_{0}^{2\pi}\frac{\partial}{\partial z} \left(\frac{e^{it}+z}{e^{it}-z}\right)\, u(e^{it})\, dt\\ & = \frac{1}{\pi}\int_{0}^{2\pi} \frac{e^{it}}{(e^{it}-z)^2}\, u(e^{it})\, dt. \end{align*} $$

Therefore, for $z=r{e^{i\theta }}$ , we have

(2.1) $$ \begin{align} F'(r{e^{i\theta}}) = \frac{1}{\pi}\int_{0}^{2\pi} \frac{e^{it}}{(e^{it}-r{e^{i\theta}})^2}\, u(e^{it})\, dt. \end{align} $$

Also, from the Cauchy integral formula, it is easy to see

$$ \begin{align*}0= \frac{1}{2\pi i}\int_{{\mathbb T}} \frac{d\zeta}{(\zeta-z)^2} = \frac{1}{2\pi}\int_{0}^{2\pi} \frac{e^{it}}{(e^{it}-r{e^{i\theta}})^2}\, dt,\end{align*} $$

so that

(2.2) $$ \begin{align} 0=\frac{1}{\pi} \int_{0}^{2\pi} \frac{e^{it}}{(e^{it}-r{e^{i\theta}})^2}\, u({e^{i\theta}})\, dt. \end{align} $$

Subtracting (2.2) from (2.1), and taking absolute value, we find

(2.3) $$ \begin{align}|F'(r{e^{i\theta}})| \le \frac{1}{\pi} \int_{0}^{2\pi} \frac{\left|u(e^{i(\theta+t)})-u({e^{i\theta}})\right|}{1-2r\cos t +r^2} \, dt.\end{align} $$

Since $u({e^{i\theta }})\in \Lambda _{\alpha }$ , we have

$$ \begin{align*}\left|u(e^{i(\theta+t)})-u({e^{i\theta}})\right| \le A|t|^\alpha,\end{align*} $$

for some constant $A>0$ . Therefore, it follows from (2.3) that

$$ \begin{align*}|F'(r{e^{i\theta}})| \le \frac{A}{\pi} \int_{0}^{2\pi} \frac{|t|^\alpha}{1-2r\cos t +r^2} \, dt = \frac{2A}{\pi} \int_{0}^{\pi} \frac{t^\alpha}{1-2r\cos t +r^2} \, dt. \end{align*} $$

For $0\le t \le \pi $ , we can estimate the denominator as

$$ \begin{align*}1-2r\cos t +r^2=(1-r)^2+4r\sin^2 \frac{t}{2} \ge (1-r)^2+\frac{4r}{\pi^2}\,t^2,\end{align*} $$

which implies

$$ \begin{align*}|F'(r{e^{i\theta}})| \le \frac{2A}{\pi} \int_{0}^{\pi} \frac{t^\alpha}{(1-r)^2+(4r/\pi^2)t^2} \, dt.\end{align*} $$

Now, we substitute $u=t/(1-r)$ to obtain

$$ \begin{align*} |F'(r{e^{i\theta}})| & \le \frac{2A}{\pi} \frac{1}{(1-r)^{1-\alpha}}\int_{0}^{\pi/(1-r)} \frac{u^\alpha}{1+(4r/\pi^2)u^2} \, dt\\ & \le \frac{2A}{\pi} \frac{1}{(1-r)^{1-\alpha}}\int_{0}^{\infty} \frac{u^\alpha}{1+(4r/\pi^2)u^2} \, dt\\ & = O\left(\frac{1}{(1-r)^{1-\alpha}}\right),\end{align*} $$

because the last integral converges for $\alpha < 1$ . As in the proof of Theorem 1, we have

$$ \begin{align*}|h'| \le \frac{1}{1-k}\, |F'|, \quad |g'| \le \frac{k}{1-k}\, |F'|,\end{align*} $$

and therefore,

$$ \begin{align*}|h'(r{e^{i\theta}})|=O\left(\frac{1}{(1-r)^{1-\alpha}}\right)=|g'(r{e^{i\theta}})|.\end{align*} $$

Then, an appeal to Theorem E implies

$$ \begin{align*}h({e^{i\theta}}) \in \Lambda_{\alpha} \quad \text{and} \quad g({e^{i\theta}}) \in \Lambda_{\alpha}.\end{align*} $$

It follows that $f({e^{i\theta }}) \in \Lambda _{\alpha }$ , and consequently, $v({e^{i\theta }}) \in \Lambda _{\alpha }$ , as desired. This completes the proof.