Proof Assume the Grothendieck ring of $\mathcal {C}$ is a generalized near-group fusion ring $(R,B)$ with group of invertible elements $G:=G_R$ and fixed-point subgroup $H_R=:H\trianglelefteq G$ (see Example 2.2). Without loss of generality [Reference Schopieray29, Lemma 3.1], we may assume $\mathcal {C}$ is equipped with the unique spherical structure such that $\dim (\mathcal {C})=\mathrm {FPdim}(\mathcal {C})=|G|(2+kd)$ , where $k\in \mathbb {Z}_{>0}$ is such that every noninvertible $X\in \mathcal {O}(\mathcal {C})$ has $d:=\mathrm {FPdim}(X)=\dim (X)$ which is the largest root of $x^2-k|H|x-|H|$ (see Example 2.5). We have assumed $C_{\mathcal {C}}(\mathcal {C})=\mathcal {C}_{\mathrm {pt}}\simeq \mathrm {Rep}(G)$ is a braided equivalence for a finite group G, so we can consider the de-equivariantization $\mathcal {C}_G$ (see Section 2.2) which is a fusion category with $\dim (\mathcal {C}_G)=\mathrm {FPdim}(\mathcal {C})=2+kd$ . Let $\sigma \in \mathrm {Gal}(\overline {\mathbb {Q}}/\mathbb {Q})$ be any automorphism such that $\sigma |_{\mathbb {Q}(d)}\in \mathrm {Gal}(\mathbb {Q}(d)/\mathbb {Q})$ is nontrivial, which exists since $d\not \in \mathbb {Z}$ . Noting $d\sigma (d)=-|H|$ , and $d+\sigma (d)=k|H|$ ,

(3.1) $$ \begin{align} \dim((\mathcal{C}_G)^\sigma)=2+k\sigma(d)=2-\frac{k|H|}{d}=2-(d+\sigma(d))d=1-\frac{\sigma(d)}{d}. \end{align} $$

Thus by [Reference Ostrik26, Theorem 1.1.2], we require $ 1/3<-\sigma (d)/d=|H|/d^2=(1+kd)^{-1}$ . As ${d>1}$ , we must have $k=1$ , thus $d=(1/2)(|H|+\sqrt {|H|(|H|+4)})<2$ , which is only true for $|H|=1$ .

The dimensions of simple objects in $\mathcal {C}$ are now determined as $1$ or $d=(1/2)(1+\sqrt {5})$ . Assume $X\in \mathcal {O}(\mathcal {C})$ with $\dim (X)=d$ . Then for some noninvertible $Y\in \mathcal {O}(\mathcal {C})$ as $d^2=1+d$ is the unique decomposition of $d^2$ into a sum of $1$ and d with nonnegative integer coefficients, which implies $Y\cong Y^\ast $ . But by [Reference Schopieray29, Lemma 2.8(d)], for all noninvertible $X,X'\in \mathcal {O}(\mathcal {C})$ . As $\mathcal {C}_{\mathrm {ad}}$ is $\otimes $ -generated by $X\otimes X^\ast $ for $X\in \mathcal {O}(\mathcal {C})$ by definition, $Y \otimes $ -generates the category $\mathcal {C}_{\mathrm {ad}}=\mathcal {C}$ for which $|\mathcal {O}(\mathcal {C})|=2$ , which are classified as in the statement of the lemma (see Example 3.1).

Proof Recall that our assumptions imply $C_{\mathcal {C}}(\mathcal {C})=\mathcal {C}_{\mathrm {pt}}$ [Reference Dong and Sun6, Proposition 3.13]. Using (3.2), we compute for any noninvertible $X\in \mathcal {O}(\mathcal {C})$ and invertible $h\in H$ ,

(3.3) $$ \begin{align} \dim(X)=s_{h,X}=\theta_h^{-1}\theta_X^{-1}\theta_{h\otimes X}\dim(h\otimes X)=\theta_h^{-1}\dim(X), \end{align} $$

proving $\theta _h=1$ for all $h\in H$ . The structure of the pointed fusion subcategory of $\mathcal {C}$ corresponding to H is then dictated by the pre-metric group H with trivial quadratic form [Reference Etingof, Gelaki, Nikshych and Ostrik9, Theorem 8.4.12], which is the same pre-metric group corresponding to $\mathrm {Rep}(H)$ .

Proof Assume $\mathcal {C}$ is a K-extension of $\mathcal {C}_{\mathrm {ad}}$ for a finite group K, i.e., K is the universal grading group of $\mathcal {C}$ (see Section 2). Note that all noninvertible $X\in \mathcal {O}(\mathcal {C})$ have $\dim (X)=1+\sqrt {2}$ , and $2\cdot 1^2+2\cdot (1+\sqrt {2})^2$ is the unique decomposition of $\dim (\mathcal {C}_{\mathrm {ad}})=8+4\sqrt {2}$ into a nonnegative integer linear combination of $1^2$ and $(1+\sqrt {2})^2$ . Thus, [Reference Etingof, Gelaki, Nikshych and Ostrik9, Theorem 3.5.2] implies that each graded component of $\mathcal {C}$ contains two invertible and two noninvertible simple objects. Denote the nontrivial invertible object of $\mathcal {C}_{\mathrm {ad}}$ by $\delta $ which has order 2 and necessarily permutes the invertible objects in each graded component. We claim that $h^n\neq \delta $ for any $h\in G$ and $n>1$ which is sufficient to prove that $G\cong C_2\times L$ for some subgroup $L\subset G$ , where $\delta $ generates the $C_2$ factor. The group G is abelian so we may assume $G\cong G_0\times G_1$ is a factorization into the subgroup $G_0$ of elements whose order is a power of $2$ and subgroup $G_1$ whose elements have odd-order. Since $\delta \in G_0$ , it suffices to assume there exists $g\in K$ of order $2$ and invertible $h\in \mathcal {C}_g$ with $h^2=\delta $ , i.e., $\delta \otimes h=h^\ast =h^{-1}\neq h$ is the invertible object of $\mathcal {C}_g$ distinct from h. Direct computation gives $\theta _\delta =-1$ [Reference Schopieray28, Example 18] for any choice of primitive 16th root of unity q such that $\mathcal {C}_{\mathrm {ad}}\simeq \mathcal {C}(\mathfrak {sl}_2,8,q)_{\mathrm {ad}}$ . One consequence is that $\delta \not \in H$ by Lemma 3.3. But on one hand, $\theta _{h^\ast }=\theta _h$ from the definition of $\theta $ [Reference Etingof, Gelaki, Nikshych and Ostrik9, Definition 8.10.1] and sphericality, and on the other hand, $1=s_{\delta ,h}=-\theta _h^{-1}\theta _{h^\ast }$ by Equation (3.2) and the fact that $\mathcal {C}_{\mathrm {ad}}\subset C_{\mathcal {C}}(\mathcal {C}_{\mathrm {pt}})$ [Reference Dong, Natale and Sun5, Proposition 2.1]. These cannot occur simultaneously, so we conclude $h^2=e$ for both invertible $h\in \mathcal {C}_g$ . Moreover, $G\cong C_2\times L$ , where $\delta $ generates the $C_2$ factor. Let $\mathcal {P}\subset \mathcal {C}$ be the pointed braided fusion subcategory corresponding to $L\subset G$ . Then every $X\in \mathcal {O}(\mathcal {C})$ has a unique factorization $Y\otimes Z$ , where $Y\in \mathcal {O}(\mathcal {C}_{\mathrm {ad}})$ and $Z\in \mathcal {O}(\mathcal {P})$ . Hence, $\mathcal {C}\simeq \mathcal {C}_{\mathrm {ad}}\boxtimes \mathcal {P}$ [Reference Gelaki14, Corollary 3.9], since $\mathcal {C}$ is braided.

Proof We retain the same notation as in the proof of Lemma 3.2. Let $\mathcal {D}\subset \mathcal {C}_{\mathrm {pt}}=C_{\mathcal {C}}(\mathcal {C})$ be a maximal Tannakian subcategory with $\mathrm {FPdim}(\mathcal {C}_{\mathrm {pt}})=2\mathrm {FPdim}(\mathcal {D})$ [Reference Etingof, Gelaki, Nikshych and Ostrik9, Corollary 9.9.32(ii)]. Thus, $\mathcal {D}\simeq \mathrm {Rep}(K)$ is a braided equivalence for a finite group $K\subset G$ of index 2. There are exactly two orbits of the $\otimes $ -action of $\mathcal {O}(\mathcal {D})$ on $\mathcal {O}(\mathcal {C}_{\mathrm {pt}})$ which implies $|\mathcal {O}((\mathcal {C}_K)_{\mathrm {pt}})|=2$ . Fix a noninvertible simple object X of $\mathcal {C}_K$ which must have $\dim (X)=p_Xd$ for some $p_X\in \mathbb {Q}_{>0}$ [Reference Burciu and Natale2, Corollary 2.13] (also refer to Section 2.2). Decomposing $X\otimes X^\ast $ into simple summands and measuring its dimension implies

(3.4) $$ \begin{align} (p_Xd)^2=q_Xd+r_X \end{align} $$

for some $q_X\in \mathbb {Q}_{>0}$ , where $r_X=2$ if X is fixed by the nontrivial invertible object and $r_X=1$ ; otherwise, since this is the only nontrivial simple object of rational dimension in $\mathcal {C}_K$ . Using $d^2=k|H|d+|H|$ , we then have

(3.5) $$ \begin{align} (p_X^2k|H|-q_X)d+(p_X^2|H|-r_X)=0. \end{align} $$

As $d\not \in \mathbb {Z}$ , then $p_X^2|H|=r_X$ and $p_X^2k|H|=q_X$ ; moreover, $p_X^2=r_X/|H|$ and $q_X=kr_X$ . This implies $r_X=r_Y$ for all all noninvertible $X,Y\in \mathcal {O}(\mathcal {C}_K)$ as $1/|H|$ and $2/|H|$ cannot both be perfect squares in $\mathbb {Q}$ . Therefore, $p_X$ is determined by $|H|$ , and moreover, $q_X$ is determined by k and $|H|$ . In other words, all noninvertible simple objects of $\mathcal {C}_K$ are the same irrational dimension, i.e., $\mathcal {C}_K$ is a braided generalized near-group fusion category with a rank 2 pointed subcategory and $\mathrm {FPdim}(\mathcal {C}_K)\not \in \mathbb {Z}$ . Such a braided fusion category has $|\mathcal {O}(\mathcal {C}_K)|\leq 4$ since the invertible objects act transitively on the noninvertible simple objects. All braided fusion categories fitting this description are known [Reference Bruillard1, Reference Ostrik25]. We conclude the $\dim (\mathcal {C}_K)=(1/2)(5+\sqrt {5})$ or $\dim (\mathcal {C}_K)=4(2+\sqrt {2})$ . In either case, $r_X=1$ in Equation (3.4) and thus $q_X=k$ . But

(3.6) $$ \begin{align} \dim(\mathcal{C}_K)=\dfrac{\dim(\mathcal{C})}{\dim(\mathcal{C}_{\mathrm{pt}})/2}=2(2+kd) \end{align} $$

as well, thus $\dim (\mathcal {C}_K)\neq (1/2)(5+\sqrt {5})$ since $\dim ((\mathcal {C}_K)_{\mathrm {pt}})=2\nmid (1/2)(5+\sqrt {5})$ violating [Reference Etingof, Nikshych and Ostrik10, Proposition 8.15]. Therefore, $\mathcal {C}_K\simeq \mathcal {C}(\mathfrak {sl}_2,8,q)$ for a primitive $16$ th root of unity q and $p_Xd=1+\sqrt {2}$ . Equation (3.6) implies $2(2+2d)=2(2+kd)=4(2+\sqrt {2})$ , thus $kd=2+2\sqrt {2}$ . Noting that the algebraic norm of $2+2\sqrt {2}$ is $4$ and $k\in \mathbb {Z}_{\geq 1}$ divides it as d is an algebraic integer, then $k\in \{1,2\}$ .

Case $k=2$ : Here, we have $d=1+\sqrt {2}$ , and we note that $1\cdot 1+2\cdot (1+\sqrt {2})$ is the unique decomposition of $(1+\sqrt {2})^2$ into a nonnegative integer linear combination of $1$ and $1+\sqrt {2}$ . Therefore, for any $X\in \mathcal {O}(\mathcal {C})$ with $\dim (X)=d$ , we have for some $Y,Z\in \mathcal {O}(\mathcal {C})$ with $\dim (Y)=\dim (Z)=d$ . Hence, and as well. Note that $Y\not \cong Z$ , or else $Y \otimes $ -generates a braided near-group fusion subcategory of rank $3$ ; but this cannot occur as all such braided fusion categories have integer dimension [Reference Thornton32, Theorem III.4.6]. These fusion rules imply [Reference Etingof, Gelaki, Nikshych and Ostrik9, Proposition 2.10.8]

(3.7) $$ \begin{align} 1&=\dim_{\mathbb{C}}(\mathrm{Hom}_{\mathcal{C}}(Y\otimes Y^\ast,Z))=\dim_{\mathbb{C}}(\mathrm{Hom}_{\mathcal{C}}(Y,Y\otimes Z)),\mathrm{ and} \end{align} $$

(3.8) $$ \begin{align} 1&=\dim_{\mathbb{C}}(\mathrm{Hom}_{\mathcal{C}}(Z\otimes Z^\ast,Y))=\dim_{\mathbb{C}}(\mathrm{Hom}_{\mathcal{C}}(Z,Y\otimes Z)). \end{align} $$

Therefore, there exists a nontrivial invertible object $\delta $ of order 2 such that $Y\otimes Z\cong \delta \oplus Y\oplus Z$ . Now the left-hand side of being self-dual implies Y is self-dual, or $Y^\ast \cong Z$ . In either case, $\delta \otimes Y\cong Z^\ast $ and $\delta \otimes Z\cong Y^\ast $ are isomorphic to either Y or Z. Hence, $|\mathcal {O}(\mathcal {C})|=|\mathcal {O}(\mathcal {C}_{\mathrm {ad}})|=4$ and $\mathcal {C}$ is a braided fusion category with $\dim (\mathcal {C})=4(2+\sqrt {2})$ , which are classified as in the statement of the lemma [Reference Bruillard1, Theorem 4.11].

Case $k=1$ : Here, we have $\dim (X)=d=2+2\sqrt {2}$ (a root of $x^2-4x-4$ ) for some $X\in \mathcal {O}(\mathcal {C})$ , hence $|H|=4$ . Let $h\in H$ of order 2. Since H is Tannakian by Lemma 3.3, we can de-equivariantize by L, the order 2 subgroup generated by h. As fixed-points of elements of order $2$ , any $X\in \mathcal {O}(\mathcal {C})$ of dimension d splits into two non-isomorphic simple objects of dimension $d/2=1+\sqrt {2}$ , while the L-orbits of invertible objects remain invertible in $\mathcal {C}_L$ . Therefore, $\mathcal {C}_L$ is a braided generalized near-group fusion category with nontrivial dimension $d=1+\sqrt {2}$ . By the argument in the $k=2$ case above, $(\mathcal {C}_L)_{\mathrm {ad}}\simeq \mathcal {C}(\mathfrak {sl}_2,8,q)$ for a primitive $16$ th root of unity q, and moreover, $\mathcal {C}_L\simeq (\mathcal {C}_L)_{\mathrm {ad}}\boxtimes \mathcal {P}$ for a pointed braided fusion category $\mathcal {P}$ by Lemma 3.4. In sum, if $\mathcal {C}$ exists, then L acts nontrivially on $\mathcal {C}_L$ by tensor autoequivalences, and we may consider $\mathcal {C}$ as the equivariantization $\mathcal {C}\simeq ((\mathcal {C}_L)_{\mathrm {ad}}\boxtimes \mathcal {P})^L$ . Any such tensor autoequivalence preserves $(\mathcal {C}_L)_{\mathrm {ad}}$ , therefore there exists a braided fusion subcategory $((\mathcal {C}_L)_{\mathrm {ad}})^L\subset (\mathcal {C}_L)^L\simeq \mathcal {C}$ . The L-action restricted to $(\mathcal {C}_L)_{\mathrm {ad}}$ must permute the simple objects of dimension $d/2$ so that there exists a simple object of dimension d in $\mathcal {C}$ [Reference Burciu and Natale2, Corollary 2.13]. But there is a unique nontrivial tensor autoequivalence of $(\mathcal {C}_L)_{\mathrm {ad}}\simeq \mathcal {C}(\mathfrak {sl}_2,8,q)$ as a fusion category, and $((\mathcal {C}_L)_{\mathrm {ad}})^L$ is the near-group fusion category with Grothendieck ring $R(C_2^2,4)$ [Reference Izumi16, Example 12.11]. This cannot occur as $R(C_2^2,4)$ has no braided categorifications [Reference Thornton32, Theorem III.4.6].

Proof Let $\mathcal {C}$ be a generalized near-group fusion category such that $\mathrm {FPdim}(\mathcal {C})\not \in \mathbb {Z}$ . Then $(\mathcal {C}_{\mathrm {ad}})_{\mathrm {ad}}=\mathcal {C}_{\mathrm {ad}}$ by Lemma 2.3; and therefore, $(\mathcal {C}_{\mathrm {ad}})_{\mathrm {pt}}$ is symmetrically braided [Reference Dong and Sun6, Proposition 3.13]. If $(\mathcal {C}_{\mathrm {ad}})_{\mathrm {pt}}$ is Tannakian, then Lemma 3.2 implies $\mathcal {C}_{\mathrm {ad}}\simeq \mathcal {C}(\mathfrak {sl}_2,5,q)_{\mathrm {ad}}$ for a primitive 10th root of unity q. Each of these categories is nondegenerately braided; and therefore, $\mathcal {C}\simeq \mathcal {C}_{\mathrm {ad}}\boxtimes C_{\mathcal {C}}(\mathcal {C}_{\mathrm {ad}})$ [Reference Müger20, Theorem 4.2]. Moreover, $C_{\mathcal {C}}(\mathcal {C}_{\mathrm {ad}})$ is pointed; otherwise, $\mathcal {C}$ has simple objects with at least three distinct dimensions. If $(\mathcal {C}_{\mathrm {ad}})_{\mathrm {pt}}$ is super-Tannakian, Lemma 3.5 implies $\mathcal {C}_{\mathrm {ad}}\simeq \mathcal {C}(\mathfrak {sl}_2,8,q)_{\mathrm {ad}}$ is a braided equivalence for a primitive $16$ th root of unity q, and our result follows from Lemma 3.4.

Proof Let $G:=\mathcal {O}(\mathcal {C}_{\mathrm {pt}})$ and $H:=\mathcal {O}(\mathcal {C}_{\mathrm {ad}})\subset G$ the fixed-point subgroup of the nontrivial component. Such fusion categories $\mathcal {C}$ are characterized in [Reference Vainerman and Vallin33, Theorem 3.16], where G is denoted S, and H is denoted A. Almost all of the characterizing data is irrelevant to our argument except the symmetric nondegenerate bilinear form $\chi :H\times H\to \mathbb {C}^\times $ . This represents the associative isomorphisms $a_{g,X,h}=\chi (g,h)$ for any $g,h\in H$ and noninvertible $X\in \mathcal {O}(\mathcal {C})$ [Reference Vainerman and Vallin33, Corollary 3.11]. The associators $a_{g,X,h}$ and $a_{X,g,h}$ as well as the braiding isomorphisms $\tau _{g,h}$ and $\tau _{g,X}$ are nonzero scalars. Fix $g,h\in H$ . The (first) hexagon axiom [Reference Etingof, Gelaki, Nikshych and Ostrik9, Definition 8.1] for the triple of simple objects $g,X,h$ is

(4.1) $$ \begin{align} &&\alpha_{g,X,h}\tau_{g,X}\alpha_{X,h,g}&=\tau_{g,X}\alpha_{X,g,h}\tau_{g,h,} \end{align} $$

(4.2) $$ \begin{align} \Rightarrow&&\chi(g,h)&=\dfrac{\alpha_{X,g,h}}{\alpha_{X,h,g}}\tau_{g,h}, \end{align} $$

and the (first) hexagon axiom for $h,X,g$ is

(4.3) $$ \begin{align} &&\alpha_{h,X,g}\tau_{h,X}\alpha_{X,g,h}&=\tau_{h,X}\alpha_{X,h,g}\tau_{h,g,} \end{align} $$

(4.4) $$ \begin{align} \Rightarrow&&\chi(h,g)&=\dfrac{\alpha_{X,h,g}}{\alpha_{X,g,h}}\tau_{h,g}. \end{align} $$

Multiplying (4.2) and (4.4) and using the symmetry of $\chi $ yields

(4.5) $$ \begin{align} \chi(g,h)^2=\chi(h,g)\chi(g,h)=\dfrac{\alpha_{X,h,g}}{\alpha_{X,g,h}}\tau_{h,g}\dfrac{\alpha_{X,g,h}}{\alpha_{X,h,g}}\tau_{g,h}=\tau_{h,g}\tau_{g,h}=1, \end{align} $$

since g and h centralize one another by [Reference Dong, Natale and Sun5, Proposition 2.1]. A nondegenerate symmetric bilinear form taking only the values $\pm 1$ only exists for elementary abelian $2$ -groups (refer to [Reference Siehler31, Section 3.2], for example).