Proof. Since the singularities of $(Z, B_Z,\mathbf {{M}}^Z)/U$ are independent of the choice of U, we may assume that $U=Z$ . Shrinking Z around z, by Lemma 2.7, we may assume that $(X,B,\mathbf {{M}})$ is glc. Let D be a prime divisor on some high resolution $Z'\rightarrow Z$ with ${\operatorname {\mathrm {center}}_Z D=\overline {z}}$ . Let $\pi :X'\rightarrow X$ be a high enough resolution such that $\mathbf {{M}}$ descends to $X'$ and the induced map $f':X'\dashrightarrow Z'$ is a morphism. Write $K_{X'}+B'+\mathbf {{M}}_{X'}$ for the pullback of $K_X+B+\mathbf {{M}}_{X}$ . Then, $(X',B')$ is sub-lc and $\operatorname {\mathrm {mld}}(X'/Z\ni z, B')\geq \epsilon $ . Denote by t the lc threshold of $f^{\prime *} D$ with respect to $(X',B')$ over the generic point of D. It suffices to show that t is bounded from below by $\epsilon ^2/2$ .

We may assume that X is $\mathbb Q$ -factorial. Since X is of Fano type over Z, X is klt and $-K_X$ is big over Z. So we can write

$$ \begin{align*}\pi^*(-K_X)\sim_{\mathbb Q} H'+C'/Z,\end{align*} $$

where $H'$ is ample over Z and $C'\geq 0$ . We can also write $\pi ^*K_X=K_{X'}+E'$ . Then, $E'\leq B'$ and $(X',E')$ is sub-klt. For each sufficiently small real number $u>0$ , let

$$ \begin{align*}B^{\prime}_u=(1-u)B'+uE',\end{align*} $$

then we have $(X',B^{\prime }_u)$ is sub-klt and $\operatorname {\mathrm {mld}}(X'/Z\ni z, B^{\prime }_u)\geq \epsilon $ . So we can find a general

$$ \begin{align*}0\leq L'\sim_{\mathbb R} (1-u)\mathbf{{M}}_{X'}+uH'/Z\end{align*} $$

(note that $H'$ is ample $/Z$ and $\mathbf {{M}}_{X'}$ is nef $/Z$ ) such that letting

$$ \begin{align*}\Delta'=B^{\prime}_u+uC'+L',\end{align*} $$

we have $\operatorname {\mathrm {mld}}(X'/Z\in z,\Delta ')\geq \epsilon '$ where $\epsilon -\epsilon '>0$ is sufficiently small. Moreover, over Z we have

$$ \begin{align*} K_{X'}+\Delta'&\sim_{\mathbb R} K_{X'}+(1-u)B'+uE'+uC'+(1-u)\mathbf{{M}}_{X'}+uH'\\ &=(1-u)(K_{X'}+B'+\mathbf{{M}}_{X'})+u(K_{X'}+E')+u(H'+C')\\ &\sim_{\mathbb R} (1-u)(K_{X'}+B'+\mathbf{{M}}_{X'}) \sim_{\mathbb R} 0. \end{align*} $$

Therefore, letting $\Delta =\pi _*\Delta '$ , we deduce that $K_{X'}+\Delta '$ is the pullback of $K_X+\Delta $ .

Now, if we choose $u>0$ to be sufficiently small, the lc threshold s of $f^{\prime *} D$ with respect to $(X',\Delta ')$ over the generic point of D is sufficiently close to t. Applying [Reference Chen14, Theorem 1.4] to $(X,\Delta )\to Z$ , we deduce that $s\geq \epsilon ^{\prime 2} /2$ , where $\epsilon -\epsilon '>0$ is sufficiently small. Hence, $t\geq \epsilon ^2/2$ .

Proof. By assumption, Theorem 3.1 holds for both h and g in the following sense. Let

$$ \begin{align*}\Gamma^{\lambda}=\lambda B+(1-\lambda) \Delta ~\text{ and } ~\mathbf{{N}}^{\lambda}=\lambda \mathbf{{M,}} \quad \text{ where } \lambda=1/s!\end{align*} $$

and let $(Y,\Gamma ^{\lambda }_Y,\mathbf {{N}}^{\lambda ,Y})/U$ be the g-pair given by adjunction for $g:(X,\Gamma ^{\lambda },\mathbf {{N}}^{\lambda })\rightarrow Y$ . Then,

$$ \begin{align*}\operatorname{\mathrm{mld}}(Y/Z\ni z,\Gamma^{\lambda}_Y,\mathbf{{N}}^{\lambda,Y})\geq \delta(s,\epsilon).\end{align*} $$

On the other hand, let

$$ \begin{align*}\Omega_{Y}^\gamma=\gamma \Gamma^{\lambda}_Y+(1-\gamma)\Delta_Y ~\text{and}~ \mathbf{{L}}^{\gamma,Y}=\gamma \mathbf{{N}}^{\lambda,Y},\quad \text{where }\gamma=1/t!\end{align*} $$

and $\Delta _Y$ is the toric boundary divisor of Y. Let $(Z,\Omega _{Z}^\gamma ,\mathbf {{L}}^{\gamma ,Z})/U$ be the g-pair given by the adjunction for $h:(Y,\Omega _Y^{\gamma },\mathbf {{L}}^{\gamma ,Y})\rightarrow Z$ . Then,

(3.1) $$ \begin{align} \operatorname{\mathrm{mld}}(Z\ni z,\Omega_{Z}^\gamma,\mathbf{{L}}^{\gamma,Z})\geq \delta\big(t,\delta(s,\epsilon)\big). \end{align} $$

Now, let

$$ \begin{align*}\Gamma^{\beta}=\beta B+(1-\beta)\Delta ~ \text{ and } ~\mathbf{{N}}^{\beta}=\beta \mathbf{{M,}} \quad \text{ where } \beta=\lambda\gamma=1/(s!t!). \end{align*} $$

By construction, we have

$$ \begin{align*}\Gamma^{\beta}=\gamma\Gamma^{\lambda}+(1-\gamma)\Delta ~ \text{ and } ~ \mathbf{{N}}^{\beta}=\gamma \mathbf{{N}}^{\lambda}.\end{align*} $$

Let $(Y, \Gamma ^{\beta }_Y,\mathbf {{N}}^{\beta ,Y})/U$ be the g-pair given by adjunction for $g:(X,\Gamma ^{\beta },\mathbf {{N}}^{\beta })\rightarrow Y$ . and let $(Z, \Gamma ^{\beta }_Z,\mathbf {{N}}^{\beta ,Z})$ be the g-pair given by adjunction for $f:(X,\Gamma ^{\beta }+\mathbf {{N}}^{\beta })\rightarrow Z$ . By Lemma 2.8, $(Z, \Gamma ^{\beta }_Z,\mathbf {{N}}^{\beta ,Z})$ is also the g-pair given by adjunction for $h:(Y, \Gamma ^{\beta }_Y,\mathbf {{N}}^{\beta ,Y})\rightarrow Z$ .

Since

$$ \begin{align*}\Gamma^{\beta}=\gamma\Gamma^{\lambda}+(1-\gamma)\Delta,~\mathbf{{N}}^{\beta}=\gamma \mathbf{{N}}^{\lambda}\end{align*} $$

and

$$ \begin{align*}\Omega_{Y}^\gamma=\gamma \Gamma^{\lambda}_Y+(1-\gamma)\Delta_Y, ~ \mathbf{{L}}^{\gamma,Y}=\gamma \mathbf{{N}}^{\lambda,Y},\end{align*} $$

by Lemmas 2.10 and 2.12, the g-pair $(Y, \Gamma ^{\beta }_Y,\mathbf {{N}}^{\beta ,Y})$ has better singularities than $(Y,\Omega _Y^{\gamma },\mathbf {{L}}^{\gamma ,Y})$ , which implies that $(Z, \Gamma ^{\beta }_Z,\mathbf {{N}}^{\beta ,Z})$ has better singularities than $(Z,\Omega _{Z}^\gamma ,\mathbf {{L}}^{\gamma ,Z})$ by Lemma 2.9. So by (3.1), we have

$$ \begin{align*}\operatorname{\mathrm{mld}}(Z\ni z, \Gamma^{\beta}_Z,\mathbf{{N}}^{\beta,Z})\geq \delta\big(t,\delta(s,\epsilon)\big).\\[-37pt] \end{align*} $$

Proof. (1) This assertion was showed in the proof of [Reference Birkar and Chen11, Lemma 3.3]. We give another proof here. By [Reference Cox, Little and Schenck16, Proposition 6.4.1], for a $\mathbb Q$ -factorial complete toric variety, the number of rays in its fan is equal to the sum of its Picard number and its dimension. As $\rho (F)=1$ and $\dim F=r$ , $\Sigma $ has $r+1$ rays, say $R_1,\ldots R_{r+1}$ . Let $v_i$ be the primitive element of the ray $R_i$ for $i=1,\ldots ,r+1$ .

As F is complete, the support of $\Sigma $ (denoted by $|\Sigma |$ ) is $N_{\mathbb R}$ , so $v_1,\ldots ,v_{r+1}$ span $N_{\mathbb R}$ . We may assume that $v_1,\ldots ,v_r$ form a basis of $N_{\mathbb Q}$ . Then, there exist rational numbers $c_1,\ldots ,c_r$ such that $v_{r+1}=\sum _{i=1}^r c_iv_i$ . We claim that all $c_i$ are negative. Indeed, if one of them (say $c_1$ ) is non-negative, the support $|\Sigma |$ is contained in the half space $\{\sum _{i=1}^r a_iv_i\mid a_1\geq 0\}$ , which leads to a contradiction. We can find a positive integer q such that all $qc_i$ are integers. Let $q_i=-qc_i$ for $i=1,\ldots r$ and let $q_{i+1}=q$ . Then, $\sum _{i=1}^{r+1} q_iv_i=0$ .

(2) Without loss of generality, we may suppose that $i=r+1$ . Let $\Delta _F$ be the toric boundary divisor of F, then $a(D,F,\Delta _F)=0$ for any toric prime divisor D over F, which implies that $a(D,F,0)$ is equal to the coefficient of D in the pullback of $\Delta _F$ (denoted by $\operatorname {\mathrm {mult}}_{D} \Delta _F$ ).

Since $-v_{r+1}$ is in the interior of the cone $\sigma $ generated by $v_1,\ldots ,v_{r}$ , the center of $E_{r+1}$ is contained in the affine chart $U_{\sigma }$ . On the chart $U_{\sigma }$ , $\Delta _F$ is determined by $m\in N^*\otimes \mathbb Q$ with $\langle m,v_i\rangle =1$ for $i=1,\ldots ,r$ . Then,

$$ \begin{align*}\operatorname{\mathrm{mult}}_{E_{r+1}} \Delta_F=\langle m,-v_{r+1}\rangle =\frac{\langle m,q_1v_1+\cdots +q_rv_r\rangle}{q_{r+1}}=\frac{q_1+\cdots +q_r}{q_{r+1}}.\end{align*} $$

(3) Without loss of generality, we may suppose that $i=r+1$ . The toric variety $F'$ is given by $(N,\Sigma ')$ , where $\Sigma '$ is the star subdivision of $\Sigma $ along $-v_{r+1}$ , more precisely,

$$ \begin{align*}\Sigma'=(\Sigma\setminus \{\sigma\})\cup \Sigma^*(\sigma),\end{align*} $$

where $\sigma $ is the cone generated by $v_1,\ldots ,v_r$ and $\Sigma ^*(\sigma )$ is the set of all cones generated by subsets of $\{-v_{r+1},v_1,\ldots ,v_r\}$ not containing $\{v_1,\ldots ,v_r\}$ .

Let $\phi :N\to N/(\mathbb Z v_{r+1}):=N_G$ be the quotient map and let

$$ \begin{align*}\Sigma_{G}=\{\phi_{\mathbb R}(\tau)\subset (N_G)_{\mathbb R}\mid \tau \in \Sigma \text{ and } -v_{r+1}\in \tau\}.\end{align*} $$

Then, $\Sigma _G$ is a fan in $(N_{G})_{\mathbb R}$ ( [Reference Cox, Little and Schenck16, Exercise 3.2.7]). Let G be the toric variety given by $(N_G,\Sigma _G)$ . We claim that $\phi $ is compatible with $\Sigma $ and $\Sigma _G$ , that is, for any $\tau \in \Sigma $ , $\phi _{\mathbb R}(\tau )$ is contained in some cone in $\Sigma _G$ . Indeed, the claim holds obviously when $-v_{r+1}\in \tau $ , so we may assume that $-v_{r+1}\notin \tau $ . Then, $\tau $ is generated by a subset S of $\{v_1,\ldots ,v_{r+1}\}$ not containing $\{v_1,\ldots ,v_r\}$ . Let $\tau '$ be the cone generated by $S',$ where

$$ \begin{align*}S' = \begin{cases} S\cup\{-v_{r+1}\}, & \text{if }v_{r+1}\notin S, \\ (S\setminus\{v_{r+1}\})\cup\{-v_{r+1}\}, & \text{if }v_{r+1}\in S. \end{cases} \end{align*} $$

Then, $\phi _{\mathbb R}(\tau ')\in \Sigma _G$ and $\phi _{\mathbb R}(\tau )=\phi _{\mathbb R}(\tau ')$ . Therefore, the claim holds and then $\phi :N\to N_G$ determines a toric contraction from F to G.

Proof. By Lemma 2.11, over the torus $T_Z$ in Z, $f^{-1}(T_Z)$ is isomorphic to $F\times T_Z$ , where F is a general fiber of f. Since $f:X\to Z$ is a Mori fiber space, F is a Fano variety with $\rho (F)=1$ . Moreover, F is $\mathbb Q$ -factorial, as by Lemma 2.11 its fan $\Sigma _F$ is a sub-fan of the fan $\Sigma _X$ of X which is simplicial. By Lemma 3.4 (1), the fan $\Sigma _F$ has exactly $r+1$ rays generated by primitive elements $v_i$ , $i=1,\ldots ,r+1$ , and there exist positive integers $q_i$ such that $\sum _{i=1}^{r+1} q_iv_i=0$ . Pick e such that $q_e\geq q_i$ for any $i=1,\ldots ,r+1$ and denote by $E_F$ the toric prime divisor over F corresponding to $-v_e$ . Extracting $E_F$ gives an extremal contraction $F'\to F$ . By Lemma 3.4 (2), there is a toric contraction $F'\to G$ with $\dim G=r-1$ .

The closure E of the exceptional divisor $E_F\times T_Z$ of $F'\times T_Z\to F\times T_Z$ is a toric divisor over X, so it determines an extremal toric divisorial contraction $\pi :W\rightarrow X$ with the exceptional divisor E. Then, $\rho (W/Z)=2$ . Over $T_Z$ , the two contractions $W\to X$ and $F'\times T_Z\to F\times T_Z$ coincides. By Lemma 3.4 (2), we have

$$ \begin{align*}a(E,X,0)=a(E_F\times T_Z,F\times T_Z,0)\leq r.\end{align*} $$

Let $g:W\to Y$ be a $(-E)$ -negative toric extremal contraction over Z. Then, $\rho (Y/Z)=1$ . Over $T_Z$ , the restriction $g|_{T_Z}:F'\times T_Z\to Y|_{T_Z}$ is either an isomorphism or a $(-E_F\times T_Z)$ -negative toric extremal contraction over $T_Z$ . But the former case is impossible because $\rho (F')=2$ and $\rho (Y/Z)=1$ . Note that $\overline {\text {NE}}(F'\times T_Z/T_Z)$ has exactly two extremal rays. One corresponds to $F'\times T_Z\to F\times T_Z,$ and the other corresponds to $F'\times T_Z\to G\times T_Z$ . So $g|_{T_Z}$ coincides with one of them. It is impossible that $g|_{T_Z}$ coincides with $F'\times T_Z\to F\times T_Z$ because $-E_F\times T_Z$ is ample over $F\times T_Z$ . So $g|_{T_Z}$ coincides with $F'\times T_Z\to G\times T_Z$ , which implies that $\dim Y=\dim W-1$ .

Proof. By Lemma 3.2, we may suppose that the relative dimension $r\geq 2$ . By taking a toric $\mathbb Q$ -factorialisation, we can assume X is $\mathbb Q$ -factorial. By Lemma 3.6, there is a commutative diagram

satisfying the properties listed in that lemma. Let $\Delta _W$ be the the toric boundary divisor of W, then $K_W+\Delta _W=\pi ^*(K_X+\Delta )$ . Write $K_W+B_W+\mathbf {{M}}_W=\pi ^*(K_X+B+\mathbf {{M}}_X)$ . Let

$$ \begin{align*}\Gamma^{\theta}_W=\theta B_W+(1-\theta) \Delta_W ~\text{ and }~ \mathbf{{N}}^{\theta}=\theta \mathbf{{M}}, \quad \text{ where } \theta=1/r.\end{align*} $$

Since $a(E,X,0)\leq r$ , the coefficient of E in $B_W$ is bounded below by $1-r$ . Then, $\Gamma ^{\theta }_W\geq 0$ since the coefficient of E in $\Delta _W$ is 1.

By construction, $\operatorname {\mathrm {mld}}(W/Z\ni z,\Gamma ^{\theta }_W, \mathbf {{N}}^{\theta })\geq \frac {\epsilon }{r}$ . Applying Lemma 3.3 to $(W,\Gamma ^{\theta }_W, \mathbf {{N}}^{\theta })$ over Z (taking $s=1$ and $t=r-1$ in the lemma), we deduce that if we let

$$ \begin{align*}\Omega_W^{\beta}=\beta \Gamma^{\theta}_W +(1-\beta)\Delta_W ~\text{ and }~ \mathbf{{L}}^{\beta}=\beta \mathbf{{N}}^{\theta}, \quad \text{ where } \beta=1/(r-1)!,\end{align*} $$

and $(Z,\Omega _Z^{\beta },\mathbf {{L}}^{\beta ,Z})/U$ be the g-pair given by adjunction for $h\circ g: (W,\Omega _W^{\beta },\mathbf {{L}}^{\beta })\rightarrow Z$ , then

$$ \begin{align*}\operatorname{\mathrm{mld}}(Z\ni z,\Omega_Z^{\beta},\mathbf{{L}}^{\beta,Z})\geq \frac{(\epsilon/r)^{2^r}}{2^{2^{r}-1}\cdot\prod\limits_{i=1}^{r-1} i^{2^i}}=\delta(r,\epsilon).\end{align*} $$

It is easy check that

$$ \begin{align*}\Omega_W^{\beta}=\alpha B_W +(1-\alpha)\Delta_W ~\text{ and }~ \mathbf{{L}}^{\beta}=\alpha \mathbf{{M,}} \quad \text{ where } \alpha=\theta\beta=1/r!.\end{align*} $$

Hence,

$$ \begin{align*}K_W+\Omega_W^{\beta}+\mathbf{{L}}^{\beta}_W=\pi^*(K_X+\Gamma^{\alpha}+\mathbf{{N}}^{\alpha}_X),\end{align*} $$

where

$$ \begin{align*}\Gamma^{\alpha}=\alpha B+(1-\alpha)\Delta ~ \text{ and } ~\mathbf{{N}}^{\alpha}=\alpha \mathbf{{M}}.\end{align*} $$

Therefore, $(Z,\Omega _Z^{\beta },\mathbf {{L}}^{\beta ,Z})/U$ is also the g-pair given by adjunction for $f:(X,\Gamma ^{\alpha },\mathbf {{N}}^{\alpha })\rightarrow Z$ . This finishes the proof of the lemma.

Proof of Theorem 3.1

By induction on relative dimension, we may assume that the theorem holds in relative dimension $\leq r-1$ . Taking a toric $\mathbb Q$ -factorization of X and running an MMP on $K_X$ over Z, we may assume that X is $\mathbb Q$ -factorial and it has a toric Mori fiber space structure $X\rightarrow Y/Z$ .

If $Y\rightarrow Z$ is birational, we can replace Z by Y, then we are done by Lemma 3.7. Otherwise $\dim Y>\dim Z$ . Denote $s=\dim X-\dim Y$ and $t=\dim Y-\dim Z$ , then $r=s+t$ . Applying Lemma 3.3, we deduce that if we let

$$ \begin{align*}\Gamma^{\beta}=\beta B+(1-\beta)\Delta ~ \text{ and } ~\mathbf{{N}}^{\beta}=\beta \mathbf{{M,}} \quad \text{ where } \beta=1/(s!t!) \end{align*} $$

and $(Z, \Gamma ^{\beta }_Z,\mathbf {{N}}^{\beta ,Z})/U$ be the g-pair given by adjunction for $f:(X,\Gamma ^{\beta },\mathbf {{N}}^{\beta })\rightarrow Z$ , then

(3.2) $$ \begin{align} \operatorname{\mathrm{mld}}(Z\ni z, \Gamma^{\beta}_Z,\mathbf{{N}}^{\beta,Z}) \geq \frac{\epsilon^{2^{r}}}{2^{2^{r}-1}\prod\limits_{i=1}^s i^{2^{i+t}}\cdot\prod\limits_{i=1}^t i^{2^i}}. \end{align} $$

Let

$$ \begin{align*}\Gamma^{\alpha}=\alpha B+(1-\alpha)\Delta ~ \text{ and } ~\mathbf{{N}}^{\alpha}=\alpha \mathbf{{M,}} \quad \text{ where } \alpha=1/r!. \end{align*} $$

Then, we have

$$ \begin{align*}\Gamma^{\alpha}=\theta \Gamma^{\beta}+(1-\theta)\Delta ~ \text{ and } ~\mathbf{{N}}^{\alpha}=\theta \mathbf{{N}}^{\beta}, \quad \text{ where } \theta=\alpha/\beta=(s!t!)/r!. \end{align*} $$

Let $(Z, \Gamma ^{\alpha }_Z,\mathbf {{N}}^{\alpha ,Z})$ be the g-pair given by adjunction for $f:(X,\Gamma ^{\alpha },\mathbf {{N}}^{\alpha })\rightarrow Z$ . By Lemmas 2.10 and 2.12, $(Z, \Gamma ^{\alpha }_Z,\mathbf {{N}}^{\alpha ,Z})$ has better singularities than

$$ \begin{align*}(Z, \theta \Gamma^{\beta}_Z +(1-\theta) \Delta_Z,\theta\mathbf{{N}}^{\beta,Z}).\end{align*} $$

Hence, by (3.2), we have

$$ \begin{align*} \operatorname{\mathrm{mld}}(Z\ni z, \Gamma^{\alpha}_Z,\mathbf{{N}}^{\alpha,Z})&\geq \frac{s!t!}{r!}\cdot\frac{\epsilon^{2^{r}}}{2^{2^{r}-1}\prod\limits_{i=1}^s i^{2^{i+t}}\cdot\prod\limits_{i=1}^t i^{2^i}}\\ & \geq \frac{\epsilon^{2^r}}{2^{2^r-1}\prod\limits_{i=1}^r i^{2^i}}=\delta(r,\epsilon).\\[-57pt] \end{align*} $$

Proof of Theorem 1.8

It is a special case of Theorem 3.1.

Proof of Theorem 1.9

By Lemma 2.7, shrinking Z around z, we may suppose that $(X,B)$ is lc. Since $(X,B)$ is a toric lc pair, we have $B\leq \Delta $ , where $\Delta $ is the toric boundary divisor of X. Let

$$ \begin{align*}\Gamma^{\alpha}=\alpha B^++(1-\alpha)\Delta, \quad \text{ where } \alpha=1/r!. \end{align*} $$

Then, $\Gamma ^{\alpha }\geq B$ . Let $(Z, \Gamma ^{\alpha }_Z,\mathbf {{N}}^{\alpha ,Z})$ be the g-pair given by adjunction for $f:(X,\Gamma ^{\alpha })\rightarrow Z$ . By Theorem 1.8, $\operatorname {\mathrm {mld}}(Z\ni z, \Gamma ^{\alpha }_Z,\mathbf {{N}}^{\alpha ,Z})\geq \delta =\delta (r,\epsilon )$ . Denote the prime divisor $\overline {z}$ by D. Then, the coefficient of D in $\Gamma _Z^{\alpha }$ is bounded from above by $1-\delta $ . This means that $(X,\Gamma ^{\alpha }+\delta f^*D)$ is lc over the generic point of D. Since $\Gamma ^{\alpha }\geq B$ , we deduce that $(X,B+\delta f^*D)$ is lc over the generic point of D.

Proof of Theorem 1.5

Let

$$ \begin{align*}\Gamma^{\alpha}=\alpha B+(1-\alpha)\Delta, \quad \text{ where } \alpha=1/r! \end{align*} $$

and let $(Z, \Gamma ^{\alpha }_Z,\mathbf {{N}}^{\alpha ,Z})$ be the g-pair given by adjunction for $f:(X,\Gamma ^{\alpha })\rightarrow Z$ . By Theorem 1.8, $\operatorname {\mathrm {mld}}(Z\ni z, \Gamma ^{\alpha }_Z,\mathbf {{N}}^{\alpha ,Z})\geq \delta (r,\epsilon )$ . Hence, $\operatorname {\mathrm {mld}}(Z\ni z, 0)\geq \delta (r,\epsilon )$ and the first assertion holds.

The second assertion is an immediate consequence of Theorem 1.9 (taking $B=0$ in Theorem 1.9).

Proof of Theorem 1.2

This is a direct consequence of Theorem 1.5.