Comments:

1. (1) For $n = 3$ , the case $\Gamma ^2 (f) \backslash E (f) = \varnothing $ was established by the third-named author in [Reference OleksikOle13, Theorem 1.8]. Namely, in this case, if we denote the variables in $\mathbb {C}^3$ by $x, y, z$ (and permute them if necessary), there is exactly one segment $S \in \Gamma ^1 (f)$ joining the monomial $xy$ with some monomial $z^k$ , where $k \geqslant 2$ , and then $\mathcal {L}_0 (f) = k - 1$ .

2. (2) The maximum in formula (2.1) may be calculated over the set of certain distinguished non-exceptional faces (see the section “Concluding Remarks”).

3. (3) Lenarcik in [Reference Lejeune-Jalabert and TeissierLen98] proved an alike formula for $n = 2$ . Precisely,

   $$\begin{align*}\mathcal{L}_0 (f) = \left\{\!\!\! \begin{array}{ll} \max_{S \in \Gamma^1 (f) \backslash E (f)} m (S) - 1, & \text{if } \Gamma^1 (f)\ \backslash\ E (f) \neq \varnothing,\\ 1, & \text{if } \Gamma^1 (f)\ \backslash\ E (f) = \varnothing. \end{array} \right. \! \end{align*}$$

4. (4) Directly from the definitions, exceptional faces are always $\mathcal {K}\!$ -nondegenerate.

Proof of Lemma 4.2

As above, we have $F = F_S$ , where $S =\mathcal {N} (F)$ . W may choose $\mathbf {u} = (u_x, u_y, u_z) \in \mathbb {N}_+^3$ perpendicular to S; then F is quasihomogeneous with respect to the weights defined by $\mathbf {u}$ . Up to renaming of the variables, we can write

$$\begin{align*}\frac{\partial F}{\partial y} = PQ_1,\ \ \frac{\partial F}{\partial z} = PQ_2 \end{align*}$$

in $\mathbb {C} [x, y, z]$ , where P is not a monomial and $P, Q_1, Q_2 \in \mathbb {C} [x, y, z]$ are quasihomogeneous with respect to the same vector of weights $\mathbf {u}$ .

We will show that F can be brought to a special form. First, we may assume F is homogeneous. In fact, if we define $\tilde {F} (x, y, z) := F (x^{u_x}, y^{u_y}, z^{u_z})$ , then $\tilde {F}$ is a homogeneous polynomial, $\dim \mathcal {N} (\tilde {F}) = 2$ , and the $\mathcal {K}\!$ -non-degeneracies of $\tilde {F}$ on $\mathcal {N} (\tilde {F})$ and F on $\mathcal {N}(F) = S$ (and on their corresponding boundary edges) are equivalent. Moreover, $\frac {\partial \tilde {F}}{\partial y}$ and $\frac {\partial \tilde {F}}{\partial z}$ still have a non-monomial factor in common, viz., $P (x^{u_x}, y^{u_y}, z^{u_z})$ .

After this simplification, we return to the original notations. Thus, F is homogeneous of a degree $\alpha> 0$ , $\frac {\partial F}{\partial y} = P Q_1$ , $\frac {\partial F}{\partial z} = PQ_2$ in $\mathbb {C} [x, y, z]$ , $P, Q_1, Q_2$ are homogeneous, and P is not a monomial. Putting $x = 1$ , we get $\frac {\partial \overline {F}}{\partial y} = \overline {P} \, \overline {Q}_1$ and $\frac {\partial \overline {F}}{\partial z} = \overline {P} \, \overline {Q}_2$ in $\mathbb {C} [y, z]$ . As P is homogeneous and not a monomial, $\overline {P}$ is not a monomial, either. Exchanging $\overline {P}$ for its irreducible, non-monomial factor, we may additionally assume that $\overline {P}$ itself is irreducible in $\mathbb {C} [y, z]$ . From the Freudenburg lemma ([Reference FreudenburgFre96] or [Reference van den Essen, Nowicki and TycvdENT03, Corollary 3.2]), then, we infer that $\overline {F} = \overline {P}^2 R_0 + c$ , where $R_0 \in \mathbb {C} [y, z]$ and $c \in \mathbb {C}$ . Hence,

$$\begin{align*}F (x, y, z) = x^{\alpha} \overline{F} (\frac{y}{x}, \frac{z}{x}) = P^2 (x, y, z) R (x, y, z) + cx^{\alpha}, \end{align*}$$

where the homogeneous $R \in \mathbb {C} [x, y, z]$ satisfies $\overline {R} = R_0$ .

Passing to the proof of the degeneracy of F, we may assume $c \neq 0$ ; for otherwise, the assertion is clear. Utilizing the form of F, we shall indicate an edge T of S for which $F_T$ has a double, non-monomial factor; then F will be $\mathcal {K}\!$ -degenerate on T. More precisely, we shall find an edge $T_0$ of $\mathcal {N} (P)$ whose supporting vector $\mathbf {v}$ defines an edge $T=T_{\mathbf {v}}$ of S not passing through the point $x^{\alpha }$ . Then $F_T = F_{\mathbf {v}} = (P^2 \cdot R)_{\mathbf {v}} = (P_{T_0})^2 \cdot R_{\mathbf {v}}$ and F is $\mathcal {K}\!$ -degenerate on $T \in \Gamma ^1 (F)$ . This goal can be achieved by projecting S to the plane $0 y z$ and finding there an edge $\tilde {T}_0$ of $\mathcal {N} (\overline {P})$ whose supporting vector $\tilde {\mathbf {v}}$ defines an edge $\tilde {T}$ of $\overline {S} := \operatorname {pr}_{y, z} (S)$ not passing through the point $(0, 0)$ . Indeed, having such a $\tilde {T}$ and $\tilde {\mathbf {v}}$ , it is enough to set $T := \operatorname {pr}_{y, z}^{- 1} (\tilde {T}) \cap S$ and $\mathbf {v} := (0, \tilde {v}_1, \tilde {v}_2)$ , and then the above calculation for $F_T$ applies.

We have $\overline {F} := \overline {P}^2 \overline {R} + c$ . As S is a two-dimensional face, $\overline {S}$ is also two-dimensional. Similarly, as P is not a monomial, $\mathcal {N} (\overline {P})$ is at least a segment. It is convenient to distinguish two possibilities on the shape of the Newton polytope $\mathcal {N} (\overline {P})$ of $\overline {P}$ :

1st case: $\mathcal {N} (\overline {P})$ is a segment. Let $\mathbf {{\textbf {w}}} \in \mathbb {Z}^2 \backslash \{ 0 \}$ be a vector perpendicular to $\overline {P}$ . If $\operatorname {ord}_{\mathbf {w}} (\overline {P}^2 \overline {R}) < 0$ , then $\overline {F}_{\mathbf {w}} = (\overline {P}^2 \overline {R})_{\mathbf {w}} = \overline {P}^2 \overline {R}_w$ . Hence, we may set $\tilde {T}_0 := \mathcal {N} (\overline {P})$ and $\tilde {\mathbf {v}} := \mathbf {w}$ in this case. If $\operatorname {ord}_{\mathbf {w}} (\overline {P}^2 \overline {R}) \geqslant 0$ , then we have $\operatorname {ord}_{- \mathbf {w}} (\overline {P}^2 \overline {R} + c) = - \deg _{\mathbf {w}} (\overline {P}^2 \overline {R} + c) \leqslant - \operatorname {ord}_{\mathbf {w}} (\overline {P}^2 \overline {R} + c) \leqslant 0$ . But then we must have $\operatorname {ord}_{- \mathbf {w}} (\overline {P}^2 \overline {R}) < 0$ for, otherwise, $\overline {S}$ would be a segment. Now, as above, we may take $\tilde {T}_0 := \mathcal {N} (\overline {P})$ and $\tilde {\mathbf {v}} := - \mathbf {w}$ .

2nd case: $\mathcal {N} (\overline {P})$ is a two-dimensional polygon. Let $T_1, \ldots , T_k$ be boundary edges of $\mathcal {N} (\overline {P})$ and $\mathbf {v}_1, \ldots , \mathbf {v}_k \in \mathbb {Z}^2 \backslash \{ 0 \}$ , respectively, their (inward-pointing) normal vectors (so that $\overline {P}_{\mathbf {v}_i} = \overline {P}_{T_i}$ ) (see Figure 2a). These vectors also define the corresponding edges of $\mathcal {N} (\overline {P}^2 \overline {R})$ , namely, $\tilde {T}_i := \mathcal {N} \left ( (\overline {P}^2 \overline {R})_{\mathbf {v}_i} \right ) \ (i = 1, \ldots , k)$ . Clearly, $\tilde {T}_1, \ldots , \tilde {T}_k$ are parallel to $T_1, \ldots , T_k$ , respectively. Since $\mathbf {v}_1, \ldots , \mathbf {v}_k$ is a collection of normal vectors of all the edges of a two-dimensional convex polygon $\mathcal {N} (\overline {P})$ and the polygon $\mathcal {N} (\overline {P}^2 \overline {R})$ is also convex, the edges $\tilde {T}_1, \ldots , \tilde {T}_k$ of $\mathcal {N} (\overline {P}^2 \overline {R})$ can be prolonged to form a convex polygon too (see Figure 2b).

Figure 2

(a) The polygon $\mathcal {N} (\overline {P})$ . (b) The polygon $\mathcal {N} (\overline {P}^2 \overline {R})$ and prolongations of $\tilde {T}_i$ .

But $\overline {S} =\mathcal {N} (\overline {P}^2 \overline {R} + c) = \operatorname {conv} (\mathcal {N}(\overline {P}^2 \overline {R}) \cup \{(0, 0)\})$ , so at least one of the edges $\tilde {T}_1, \ldots , \tilde {T}_k$ of $\mathcal {N} (\overline {P}^2 \overline {R})$ is also an edge of $\overline {S}$ , one not passing through the point $(0, 0)$ . Say it is $\tilde {T}_1$ . Then we may set $\tilde {T} := \tilde {T}_1$ and $\tilde {\mathbf {v}} := \mathbf {v}_1$ in this case.

Proof of Lemma 4.3

First, let us introduce a piece of notation: let $\mathfrak {S} := R [[X_1, \ldots , X_n]]$ and, for an ideal $\mathcal {I} \subset \mathfrak {S}$ , let $\operatorname {in}_{\mathbf {v}} \mathcal {I} := \left \{ g_{\mathbf {v}} : g \in \mathcal {I} \right \} \mathfrak {S}$ be the $\mathbf {v}$ -initial ideal of $\mathcal {I}$ .

To the contrary, say there exists a monomial $\omega \in \operatorname {in}_{\mathbf {v}} (F, G)$ . Then

(4.2) $$ \begin{align} AF + BG = \omega + \text{h.o.t.}, \end{align} $$

for some A, $B \in \mathfrak {S}$ . Here, $A \neq 0 \neq B$ by the second assumption.

As a first reduction, we may think $\operatorname {ord}_{\mathbf {v}} F = \operatorname {ord}_{\mathbf {v}} G$ . For this, it is enough to consider $X^{\alpha } F$ and $X^{\beta } G$ instead of F and G (respectively), where $X^{\alpha }$ is a monomial appearing in $G_{\mathbf {v}}$ and $X^{\beta }$ is a monomial appearing in $F_{\mathbf {v}}$ . Then, a relation of type (4.2) still holds with $\omega $ modified to $X^{\alpha + \beta } \omega $ .

Secondly, we may assume $F_{\mathbf {v}}$ and $G_{\mathbf {v}}$ to be co-prime. Indeed, write $F = F_{\mathbf {v}} + F'$ , $G = G_{\mathbf {v}} + G'$ and let $\varrho := \gcd \left ( F_{\mathbf {v}}, G_{\mathbf {v}} \right )$ be the common monomial divisor. Substituting $\varrho ^{v_i} X_i$ for $X_i$ ( $i = 1, \ldots , n$ ), where $\mathbf {v} = (v_1, \ldots , v_n)$ , from (4.2), we get $\tilde {A} \left ( F_{\mathbf {v}} + \rho \tilde {F}' \right ) + \tilde {B} \left ( G_{\mathbf {v}} + \rho \tilde {G}' \right ) = \varrho ^t \left ( \omega + \text {h.o.t.} \right )$ , where $t = \deg _{\mathbf {v}} \omega $ and $\tilde {A}, \tilde {B}, \tilde {F}', \tilde {G}' \in \mathfrak {S}$ . By assumption, there are no monomials in the ideal $\left ( F_{\mathbf {v}}, G_{\mathbf {v}} \right )$ ; thus, $t> 0$ . Hence, $\tilde {A} \left ( \frac {F_{\mathbf {v}}}{\varrho } + \tilde {F}' \right ) + \tilde {B} \left ( \frac {G_{\mathbf {v}}}{\varrho } + \tilde {G}' \right ) = \varrho ^{t - 1} \omega + \text {h.o.t.}$ Replacing F by $\frac {F_{\mathbf {v}}}{\varrho } + \tilde {F}'$ , G by $\frac {G_{\mathbf {v}}}{\varrho } + \tilde {G}'$ , and $\omega $ by $\varrho ^{t - 1} \omega $ , we easily see that, still, all the assumptions of the lemma hold for the changed F, G but now $\gcd \left ( F_{\mathbf {v}}, G_{\mathbf {v}} \right ) = 1$ ; moreover, we still have $\operatorname {ord}_{\mathbf {v}} F = \operatorname {ord}_{\mathbf {v}} G$ and relation of type (4.2).

Let $\xi := \operatorname {ord}_{\mathbf {v}} F = \operatorname {ord}_{\mathbf {v}} G$ , $t := \operatorname {ord}_{\mathbf {v}} \omega $ , and let $F = \sum _{i \geqslant \xi } F^{(i)}$ , $G = \sum _{i \geqslant \xi } G^{(i)}$ , $A = \sum _{i \geqslant \delta } A^{(i)}$ , $B = \sum _{i \geqslant \eta } B^{(i)}$ be the decompositions of the involved series into their quasihomogeneous components for the gradation defined by the weight vector $\mathbf {v}$ . Thus, $F^{(\xi )} = F_{\mathbf {v}}$ and $G^{(\xi )} = G_{\mathbf {v}}$ . Notice that $\operatorname {ord}_{\mathbf {v}} A \geqslant \xi $ and $\operatorname {ord}_{\mathbf {v}} B \geqslant \xi $ , too. Indeed, the (nonzero) components of lowest degree of $AF$ and $BG$ are, respectively, equal to $A^{(\delta )} F^{(\xi )}$ and $B^{(\eta )} G^{(\xi )}$ ; clearly, $\min (\delta + \xi , \eta + \xi ) \leqslant t$ . This inequality must be strict because of our second assumption. But then, as $A^{(\delta )} \neq 0 \neq B^{(\eta )}$ , we get $\delta = \eta $ and $A^{(\delta )} F^{(\xi )} + B^{(\eta )} G^{(\xi )} = 0$ . Since $R [X_1, \ldots , X_n]$ is a UFD and $\gcd (F^{(\xi )}, G^{(\xi )}) = 1$ , we infer that $F^{(\xi )} \mathrel {|} B^{(\eta )}$ and $G^{(\xi )} \mathrel {|} A^{(\delta )}$ ; hence, $\xi \leqslant \eta $ , $\xi \leqslant \delta $ , and $2 \xi < t$ .

Set $C^{(2 \xi + n)} := \sum _{0 \leqslant i \leqslant n} (A^{(\xi + i)} F^{(\xi + n - i)} + B^{(\xi + i)} G^{(\xi + n - i)})$ , for $n \geqslant 0$ . By the above, $C^{(2 \xi + n)}$ is the component of degree $(2 \xi + n)$ of the left-hand side of (4.2). We shall construct a sequence $(P^{(j)})_{0 \leqslant j \leqslant t - 2 \xi - 1}$ of quasihomogeneous polynomials $P^{(j)} \in R [X_1, \ldots , X_n]$ of $\mathbf {v}$ -degree j such that

(4.3) $$ \begin{align} \left\{\!\!\begin{array}{lll} A^{(\xi + n)} = \sum_{0 \leqslant j \leqslant n} P^{(j)} G^{(\xi + n - j)}\\B^{(\xi + n)} = - \sum_{0 \leqslant j \leqslant n} P^{(j)} F^{(\xi + n - j)} \end{array} \right.\!\!\!\!\!, \text{ for } 0 \leqslant n \leqslant t - 2 \xi - 1. \end{align} $$

We have $2 \xi < t$ so, as above, we get $0 = C^{(2 \xi )} = A^{(\xi )} F^{(\xi )} + B^{(\xi )} G^{(\xi )}$ . Thus, we may set $P^{(0)} := A^{(\xi )} / G^{(\xi )} = - B^{(\xi )} / F^{(\xi )} \in R [X_1, \ldots , X_n]$ . Then (4.3) holds with $n = 0$ .

Say, we have already defined $(P^{(j)})_{0 \leqslant j \leqslant N - 1}$ for some $1 \leqslant N \leqslant t - 2 \xi $ . We have

$$ \begin{align*} C^{(2 \xi + N)} &= \sum_{0 \leqslant i \leqslant N} (A^{(\xi + i)} F^{(\xi + N - i)} + B^{(\xi + i)} G^{(\xi + N - i)}) =\\ &= A^{(\xi + N)} F^{(\xi)} + B^{(\xi + N)} G^{(\xi)}+\\ &+ \sum_{0 \leqslant i \leqslant N - 1}\,\, \sum_{0 \leqslant j \leqslant i} (P^{(j)} G^{(\xi + i - j)} F^{(\xi + N - i)} - P^{(j)} F^{(\xi + i - j)} G^{(\xi + N - i)}) =\\ &= A^{(\xi + N)} F^{(\xi)} + B^{(\xi + N)} G^{(\xi)}+\\ &+ \sum_{0 \leqslant j \leqslant N - 1} P^{(j)} \sum_{j \leqslant i \leqslant N - 1} (G^{(\xi + i - j)} F^{(\xi + N - i)} - F^{(\xi + i - j)} G^{(\xi + N - i)}). \end{align*} $$

After interchanging the order of the summands, the inner sum becomes

$$ \begin{align*} \sum_{j \leqslant i \leqslant N - 1} G^{(\xi + i - j)} F^{(\xi + N - i)} - \sum_{j + 1 \leqslant i \leqslant N} F^{(\xi + N - i)} G^{(\xi + i - j)} &=\\ =G^{(\xi)} F^{(\xi + N - j)} &- F^{(\xi)} G^{(\xi + N - j)}. \end{align*} $$

Hence,

$$ \begin{align*} C^{(2 \xi + N)} & = A^{(\xi + N)} F^{(\xi)} + B^{(\xi + N)} G^{(\xi)} +\\ &+ \sum_{0 \leqslant j \leqslant N - 1} P^{(j)} (G^{(\xi)} F^{(\xi + N - j)} - F^{(\xi)} G^{(\xi + N - j)})=\\ & = F^{(\xi)} \left( A^{(\xi + N)} - \sum_{0 \leqslant j \leqslant N - 1} P^{(j)} G^{(\xi + N - j)} \right)+\\ &+{}G^{(\xi)} \left( B^{(\xi + N)} + \sum_{0 \leqslant j \leqslant N - 1} P^{(j)} F^{(\xi + N - j)} \right). \end{align*} $$

If $N \leqslant t - 2 \xi - 1$ , then $C^{(2 \xi + N)} = 0$ and, as above, using the fact that $R [X_1, \ldots , X_n]$ is a UFD and $\gcd (F^{(\xi )}, G^{(\xi )}) = 1$ , we define $P^{(N)}$ by $P^{(N)} G^{(\xi )} = A^{(\xi + N)} - \sum _{0 \leqslant j \leqslant N - 1} P^{(j)} G^{(\xi + N - j)}$ . But then, from the above equality, we get

$$ \begin{align*} 0 = P^{(N)} F^{(\xi)} + B^{(\xi + N)} + \sum_{0 \leqslant j \leqslant N - 1} P^{(j)} F^{(\xi + N - j)}. \end{align*} $$

Hence, (4.3) holds with $n = N$ . Consequently, the sequence $(P^{(j)})_{0 \leqslant j \leqslant t - 2 \xi - 1}$ is defined by induction.

If $N = t - 2 \xi $ , then $C^{(2 \xi + N)} = \omega $ . This gives $\omega \in (F^{(\xi )}, G^{(\xi )}) R [X_1, \ldots , X_n]$ ; contradiction.

Proof of Theorem 4.1

Clearly, we may assume that $\mathbf {v} = (v_x, v_y, v_z) \in \mathbb {N}_+^3$ . We have $f_S = f_{\mathbf {v}}$ . Since S is a two-dimensional face and $\mathbf {v}$ has positive coordinates, $f_S$ depends in an essential way on y and z, i.e., $\frac {\partial f_S}{\partial y} \neq 0$ and $\frac {\partial f_S}{\partial z} \neq 0$ . Hence, $\frac {\partial f_S}{\partial y} = \frac {\partial f_{\mathbf {v}}}{\partial y} = (\frac {\partial f}{\partial y})_{\mathbf {v}}$ and $\frac {\partial f_S}{\partial z} = \frac {\partial f_{\mathbf {v}}}{\partial z} = (\frac {\partial f}{\partial z})_{\mathbf {v}}$ . In view of the assumptions and the Bernstein theorem (Theorem 3.3), the pair $\{ \frac {\partial \overline {f_S}}{\partial y} = 0, \frac {\partial \overline {f_S}}{\partial z} = 0\}$ possesses $\operatorname {MV} (\frac {\partial \overline {f_S}}{\partial y}, \frac {\partial \overline {f_S}}{\partial z})> 0$ solutions in $(\mathbb {C}^{\ast })^2$ . Hence, $\{ \frac {\partial f_S}{\partial y} = 0, \frac {\partial f_S}{\partial z} = 0\}$ possesses solutions in $(\mathbb {C}^{\ast })^3$ . This means that in the ideal $((\frac {\partial f}{\partial y})_{\mathbf {v}}, (\frac {\partial f}{\partial z})_{\mathbf {v}}) \mathcal {O}_3 = (\frac {\partial f_S}{\partial y}, \frac {\partial f_S}{\partial z}) \mathcal {O}_3$ there are no monomials.

Moreover, applying Lemma 4.2 to $F = f_S$ , we infer that $\frac {\partial f_S}{\partial y}, \frac {\partial f_S}{\partial z}$ have no common factor in $\mathbb {C} [x, y, z]$ except a monomial.

Summing up, we have checked that the pair $\frac {\partial f}{\partial y}, \frac {\partial f}{\partial z}$ in $\mathcal {O}_3 =\mathbb {C} \{x, y, z\}$ , and the weight vector $\mathbf {v}$ fulfill the assumptions of Lemma 4.3. Therefore, $\frac {\partial f}{\partial y}$ and $\frac {\partial f}{\partial z}$ do not generate any element in $\mathcal {O}_3$ with initial $\mathbf {v}$ -part being a monomial. This, in turn, means we are in the position to apply the Maurer theorem (Theorem 3.4) to the curve $\{ \frac {\partial f}{\partial y} = 0, \frac {\partial f}{\partial z} = 0\}$ and the vector $\mathbf {v}$ . Thus, we are delivered the required parametrization $\Phi $ .

Proof Take any $\mathbf {w} = (w_1, w_2) \in \mathbb {Z}^2 \backslash \{0\}$ and consider the system of equations

(4.4) $$ \begin{align} \left( \frac{\partial \overline{f_S}}{\partial y} \right)_{\mathbf{w}} = \left( \frac{\partial \overline{f_S}}{\partial z} \right)_{\mathbf{w}} = 0. \end{align} $$

We must show that this system has got no solutions in $(\mathbb {C}^{\ast })^2$ . Since $\operatorname {supp}f_S$ is equal to the set of vertices of S, the polynomials $(\frac {\partial \overline {f_S}}{\partial y})_{\mathbf {w}}$ and $(\frac {\partial \overline {f_S}}{\partial z})_{\mathbf {w}}$ are monomials or binomials only. Clearly, it suffices to consider the case both of them are binomials. Then their supports define parallel segments. If these binomials are not partial derivatives of one and the same edge (or diagonal) of $\overline {f_S}$ , then, because of genericness of coefficients of $f_S$ and the parallelity of the segments, system (4.4) has got no solutions in $(\mathbb {C}^{\ast })^2$ . In the opposite case, we have $(\frac {\partial \overline {f_S}}{\partial y})_{\mathbf {w}} = \frac {\partial \overline {f_T}}{\partial y}$ , $(\frac {\partial \overline {f_S}}{\partial z})_{\mathbf {w}} = \frac {\partial \overline {f_T}}{\partial z}$ , where T is an edge or a diagonal of S (the latter may happen if some $x^i \in \operatorname {supp} f_S$ ). The polynomial $f_T$ is also a binomial. As $\frac {\partial f_T}{\partial y}$ and $\frac {\partial f_T}{\partial z}$ are binomials, the segment T is disjoint from both coordinate planes $0 x y$ , $0 x z$ . If $T \in \Gamma ^1 (f_S)$ , then, directly by the assumption, we get that the line containing T does not intersect the axis $0 x$ . If this is not the case, viz., T is a diagonal of S, the only possibility is that T connects the two vertices of $\mathcal {N} (f_S)$ joined by edges with $x^i$ (as $\operatorname {supp} f_S = \Gamma ^0 (f_S)$ ). Thus, also in this situation, the line containing T does not intersect the axis $0 x$ .

Clearly, $\overline {f_T}$ takes one of the following two forms: (1) $y^l z^m (\alpha y^a + \beta z^b)$ , with $l, m, a, b> 0$ , or (2) $y^l z^m (\alpha + \beta y^a z^b)$ , with $l, m> 0$ , $a + b> 0$ , where the coefficients $\alpha , \beta $ are generic. An easy analysis leads to the conclusion that the system $\{ \frac {\partial \overline {f_T}}{\partial y} = 0, \frac {\partial \overline {f_T}}{\partial z} = 0\}$ has got a solution in $(\mathbb {C}^{\ast })^2$ if and only if $\overline {f_T}$ is of the second form, where, moreover, $a, b> 0$ and $\frac {k}{l} = \frac {a}{b}$ . This last condition, however, means the prolongation of T intersects the axis $0 x$ ; impossible.

Proof We split the proof into two main parts, cases to be treated separately.

Part I

S is $0x$ -non-convenient. We consider two subcases:

1. a) $\operatorname {MV} (\frac {\partial \overline {f_S}}{\partial y}, \frac {\partial \overline {f_S}}{\partial z})> 0$ .

   Here, by Lemma 5.7, we may apply Theorem 4.5 to find a parametrization $0 \neq \Phi \in \mathbb {C} \{t\}^3$ satisfying (6.1), whose initial exponent vector is perpendicular to S so it supports $\Gamma _+(f)$ along S.

2. b) $\operatorname {MV} (\frac {\partial \overline {f_S}}{\partial y}, \frac {\partial \overline {f_S}}{\partial z}) = 0$ .

In this situation, by Lemma 3.2, $\mathcal {N} (\frac {\partial \overline {f_S}}{\partial y})$ and $\mathcal {N} (\frac {\partial \overline {f_S}}{\partial z})$ are either parallel segments or at least one of these polygons reduces to a point. This implies certain restrictions on the geometry of S. First, since a derivative can zero at most two vertices of S, such S cannot have more than four vertices. But “four vertices” implies that in the derivatives $\frac {\partial f_S}{\partial y}$ , $\frac {\partial f_S}{\partial z}$ there are segments at the least; and if this happens, these segments either lie in different coordinate planes (if S is non-convenient for $0 x$ ) or they are derived from a common vertex of S (if S is convenient for $0 x$ ); in either case, neither they nor their projections can be parallel. This means S has to be a triangle.

Since S is a non-convenient proximity face, the triangle S has an edge joining the monomials $x^k{}z$ , where $k \geqslant 1$ , and $x^m y^n$ , where $m \geqslant 0$ , $n \geqslant 1$ (up to permutation of the variables y and z [recall Figure 3b]).

We claim that the last vertex of S lies in the plane $0 x z$ . Indeed, it cannot lie in $0 x y$ for S is $0x$ -non-exceptional; and if it were situated outside of both planes $0 x y$ and $0 x z$ , then we would have $\operatorname {MV} (\frac {\partial \overline {f_S}}{\partial y}, \frac {\partial \overline {f_S}}{\partial z})> 0$ . Thus, $S =\mathcal {N} (x^m y^n + x^k z + x^p z^q)$ . As S is $0x$ -non-exceptional, $n \geqslant 2$ . Moreover, $q \geqslant 1$ since S is non-convenient with respect to $0 x$ . Hence, we get $p < k$ and $q \geqslant 2$ .

We may, thus, write $\frac {\partial f_S}{\partial y} = ax^m y^{n - 1}$ and $\frac {\partial f_S}{\partial z} = bx^k + cx^p z^{q - 1}$ , where $abc \neq 0$ , and

$$\begin{align*}\frac{\partial f}{\partial z} (x, 0, z) = bx^k + cx^p z^{q - 1} + \cdots. \end{align*}$$

We will show that there exists the sought $\Phi $ with the property that its initial exponent vector supports $\Gamma _+(f)$ along the edge of S lying in plane $0x z$ . To this end, let $\mathbf {w} = (w_x, w_y, w_z) \in \mathbb {N}_+^3$ be a supporting vector of $\Gamma _+(f)$ along the edge of S joining $x^k z$ and $x^p z^q$ . To find such a vector $\mathbf {w}$ , it is enough to start from a vector perpendicular to S and then increase its second coordinate (i.e., the one corresponding to y). If this increase is small enough, then we may additionally assume that $(\frac {\partial f}{\partial y})_{\mathbf {w}} = a x^m y^{n-1}$ . Thus,

$$\begin{align*}\left (\frac{\partial f}{\partial y} \right )_{\mathbf{w}} = a x^m y^{n-1}, \quad \left ( \frac{\partial f}{\partial z}\right )_{\mathbf{w}} = bx^k + cx^p z^{q - 1}.\end{align*}$$

Letting $w_y \rightarrow \infty $ (and keeping $w_x$ and $w_z$ fixed), we may arrive at two cases.

First, if $\frac {\partial f}{\partial y} (x, 0, z) \mathrel {\not \equiv } 0$ , then, since $n \geqslant 2$ , there exists a weight vector $\tilde {\mathbf {w}} = (w_x, \tilde {w}_y, w_z)$ with $\tilde {w}_y> w_y$ , for which $(\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}} = ax^m y^{n - 1} + dx^r y^s z^t + ( {\textit {other possible terms, of}}\ y {\textit {-degree}}\ {\textit {less than }} n - 1 )$ , where $d \neq 0$ and $s < n - 1$ . This restriction on the supported terms follows from the fact that any monomial from $\operatorname {supp} (\frac {\partial f}{\partial y})$ with y-degree $\geqslant n - 1$ is of weighted $\tilde {\mathbf {w}}$ -degree higher than the $\tilde {\mathbf {w}}$ -degree of $x^m y^{n - 1}$ , just as was the case with the $\mathbf {w}$ -degree. On the other hand, we still have $(\frac {\partial f}{\partial z})_{\tilde {\mathbf {w}}} = bx^k + cx^p z^{q - 1}$ . Consequently, as $s \neq n - 1$ , if $\mathcal {N} ((\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}})$ happens to be just the segment $\mathcal {N} (x^m y^{n - 1} + x^r y^s z^t)$ , then the projected segments $\mathcal {N} \left ( \overline {(\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}}} \right )$ and $\mathcal {N} \left ( \overline {(\frac {\partial f}{\partial z})_{\tilde {\mathbf {w}}}} \right )$ are not parallel and, hence, have positive mixed volume. Clearly, the same holds if $\mathcal {N} ((\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}})$ is a polygon. Moreover, the pair of polynomials $\left ( \overline {(\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}}}, \overline {(\frac {\partial f}{\partial z})_{\tilde {\mathbf {w}}}} \right )$ is $\mathcal {B}$ -nondegenerate because their coefficients originate from different vertices of $\Gamma (f)$ and, as such, may be considered generic.

By Bernstein theorem, the system $\left \{ \overline {(\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}}} = \overline {(\frac {\partial f}{\partial z})_{\tilde {\mathbf {w}}}} = 0 \right \}$ has $\operatorname {MV} \left ( \overline {(\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}}}, \overline {(\frac {\partial f}{\partial z})_{\tilde {\mathbf {w}}}} \right ) > 0$ solutions in $(\mathbb {C}^{\ast })^2$ . Hence, $\left \{ (\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}} = (\frac {\partial f}{\partial z})_{\tilde {\mathbf {w}}} = 0 \right \}$ possesses solutions in $(\mathbb {C}^{\ast })^3$ . This means that in the ideal $((\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}}, (\frac {\partial f}{\partial z})_{\tilde {\mathbf {w}}}) \mathcal {O}_3$ there are no monomials. What is more, using—again—the relative genericness of coefficients of the polynomials $(\frac {\partial f}{\partial y})_{\tilde {\mathbf {w}}}$ , $(\frac {\partial f}{\partial z})_{\tilde {\mathbf {w}}}$ , we infer that these polynomials do not have any common factor except, possibly, a monomial. Consequently, Lemma 4.3 implies there is no element $H \in (\frac {\partial f}{\partial y}, \frac {\partial f}{\partial z}) \mathcal {O}_3$ such that $H_{\tilde {\mathbf {w}}}$ is a monomial. Thus, we may apply Maurer theorem (Theorem 3.4) to find a parametrization $\Phi (t) = (\varphi _1 (t), \varphi _2 (t), \varphi _3 (t))$ of the curve $\{ \frac {\partial f^{^{^{}}}}{\partial y} = \frac {\partial f}{\partial z} = 0\}$ whose initial exponent vector is a multiple of $\tilde {\mathbf {w}}$ (hence, $\varphi _1 \neq 0$ ). But, by its construction, $\tilde {\mathbf {w}}$ supports $\Gamma _+(f)$ along the edge of S lying in plane $0xz$ .

Second, if $\frac {\partial f}{\partial y} (x, 0, z) \equiv 0$ , then let $\Psi (t) = (\psi _1 (t), \psi _2 (t))$ be a parametrization of a branch of the curve $\{ \frac {\partial f}{\partial z} (x, 0, z) = 0\}$ corresponding to the edge $T := \mathcal {N} (x^k + x^p z^{q - 1})$ of its Newton polyhedron $\Gamma _+ (\frac {\partial f}{\partial z} (x, 0, z))$ in $\mathbb {C}^2$ . Put $\Phi (t) = (\psi _1 (t), 0, \psi _2 (t))$ . Then $\psi _1(t) \neq 0$ and the initial exponent vector of $\Phi $ supports $\Gamma _+(f)$ along the edge of S lying in plane $0xz$ . This ends the proof of subcase b).

Part II

S is $0x$ -convenient. In this case, we search for $\Phi $ whose initial exponent vector supports $\Gamma _+(f)$ along a subface of S having $x^k$ as a vertex. We will analyze the behavior of the series $f^{\ast } := f - e x^k$ , $e \neq 0$ , that arises from f by removing the monomial $x^k$ from its support.

First, let $f^{\ast }$ be non-isolated. If $f^{\ast }$ is not nearly convenient with respect to $0x$ , then we put $\Phi = (t,0,0)$ and its initial exponent vector $(1,+\infty ,+\infty )$ supports $\Gamma _+(f)$ along the vertex $x^k$ . Otherwise, there exists a vertex realizing the nearly convenience, say $x^lz$ , where $l \geqslant 1$ . But then, from Proposition 3.5, we infer that necessarily $\Gamma _+(f^{\ast })\cap 0xy = \varnothing $ . We shall indicate the suitable $\Phi $ in the form $\Phi =(\varphi _1,\varphi _2,0)$ . Clearly, $\varphi _3=0$ already gives $\frac {\partial f}{\partial y}\circ \Phi = 0$ . Now, we shall choose $(\varphi _1,\varphi _2)$ for which $\frac {\partial f}{\partial z}\circ \Phi = 0$ . From the above analysis, it follows that we may write $f(x,y,z)=zg(x,y) + z^2h(x,y,z) + e x^k$ , where $g(0,0)=0$ . Thus, $\frac {\partial f}{\partial z}\circ \Phi = g(\varphi _1,\varphi _2)$ . But $g(x,y) =\theta _1 x^l +\theta _2 y^m +\ldots $ , where $\theta _1, \theta _2 \neq 0$ , $m \geqslant 1$ , because f is nearly convenient with respect to the axis $0y$ . By the Newton–Puiseux theorem, we may find $(\varphi _1,\varphi _2)$ with $\varphi _1 \neq 0$ , $\varphi _1(0)=\varphi _2(0)=0$ and $g(\varphi _1,\varphi _2)=0$ . Then $\frac {\partial f}{\partial z}\circ \Phi = 0$ and the initial exponent vector $(\mathrm {ord}\, \varphi _1,\mathrm {ord}\, \varphi _2,+\infty )$ of $\Phi $ supports $\Gamma _+(f)$ along the vertex $x^k$ .

Now, let $f^{\ast }$ be an isolated singularity. Suppose that $\Gamma ^2 (f^{\ast })\backslash E_x(f^{\ast }) = \varnothing $ . Then, using Proposition 5.3, we infer that $f^{\ast }$ has an edge $\mathcal {N}(x^{}y + z^{\alpha })$ (up to permutation of $(y,z)$ only), for some $\alpha \geqslant 2$ , and $E_x(f^{\ast })=E(f^{\ast })$ . Hence, this edge is also an edge of a non-compact, parallel to $0y$ , face of $f^{\ast }$ . Therefore, it is an edge of f, too, and $\varnothing \neq E_x(f)=E(f)$ . Then, again by Proposition 5.3, we get there is no $0x$ -non-exceptional face of f, a contradiction. Hence, $\Gamma ^2 (f^{\ast })\backslash E_x(f^{\ast }) \neq \varnothing $ . By Proposition 5.2, there exists an $0x$ -proximate face T of $f^{\ast }$ , non-convenient with respect to this axis. Clearly, we are in the position to apply Part I of the proof to $f^{\ast }$ and T. This way, we find a parametrization satisfying (6.1) such that its initial exponent vector $\mathbf {v}$ supports $\Gamma _+(f^{\ast })$ along N, where either $N=T$ or N is an edge of T lying in one of the planes $0xy$ , $0xz$ . Take the supporting plane $\Pi =\Pi _{\mathbf {v}}$ of $\Gamma _+ (f^{\ast })$ along N. If $x^k$ lies above $\Pi $ , then $x^k$ also lies above the plane spanned by T (because the affine hulls of T and N both intersect $0 x$ in the same single point); thus, T happens to be an $0 x$ -proximate face of f. But then, by Lemma 5.5, T is the unique $0 x$ -proximate face of f so $S=T$ . As S is $0x$ -convenient while T is not, this is a contradiction.

Hence, $x^k$ lies on $\Pi $ or under it. If $x^k$ lies on $\Pi $ and $N=T$ , then, by Lemma 5.5, we get that T and $x^k$ make the unique $0 x$ -proximate face of f. Therefore, $\operatorname {conv} (T \cup x^k) = S$ and, by Part I of the proof, the vector $\mathbf {v}$ supports $\Gamma _+(f)$ along S in this case. If $x^k$ lies on $\Pi $ and N were an edge of T lying in one of the planes $0xy$ or $0xz$ , then N and $x^k$ would make an edge of f containing three points of $\operatorname {supp} f$ ; contradiction with the assumption $\operatorname {supp} f = \Gamma ^0(f)$ . Finally, if $x^k$ lies under $\Pi $ , then $\mathbf {v}$ supports $\Gamma _+(f)$ along the vertex $x^k$ .

Proof Using Lemma 5.6 and formula (2.1), we get the assertion.