3.1. Algebras presented by double quivers

Recall that the double quiver $\overline{Q}$ of $Q$ is the quiver constructed by $\overline{Q}_0\,:\!=Q_0$ and $\overline{Q}_1\,:\!=Q_1\sqcup \{a^*\ |\ a\in Q_1 \}$ , where $a^*$ is obtained by swapping the source and target of $a$ . Clearly, the assignments $v\mapsto v\ (v\in Q_0)$ , $a^*\mapsto a^*$ and $(a^*)^*\mapsto a\ (a\in Q_1)$ make an isomorphism $\iota \,:\, \overline{Q}^{\textrm{op}}\to \overline{Q}$ of quivers; note that $\iota$ fixes all vertices.

Let us give examples of algebras presented by a double quiver.

Now, an application of Proposition 2.2 is obtained.

Proof. We can easily check the equality $\overline{I}^{\textrm{op}}=\iota ^{-1}(\overline{I})$ holds, and apply Proposition 2.2.

3.2. Cellular algebras

Cellular algebras were introduced by Graham and Lehrer [Reference Graham and Lehrer10]. An algebra $\Lambda$ is called cellular if it admits a cellular basis; that is, a basis with certain nice multiplicative properties. We refer to [Reference Konig and Xi14] for more details. By the definition, each cellular basis of $\Lambda$ admits an involution $\sigma$ ; i.e., an anti-automorphism $\sigma$ of $\Lambda$ with $\sigma ^2=1$ . It is shown in [Reference Konig and Xi14, Proposition 5.1] that the involution $\sigma$ fixes all simples of a cellular algebra. Hence, we have the following result.

Nowadays, a lot of interesting algebras have been found to be cellular, for example, Ariki–Koike algebras, ( $q$ -)Schur algebras as well as various generalizations, block algebras of category $\mathcal{O}$ , and various diagram algebras. We hope that Theorem 2.6 will be useful to verify the finiteness of $|\operatorname{\mathsf{2silt}}\Lambda |$ for the aforementioned algebras, especially for Hecke algebras [Reference Xi18], Schur algebras [Reference Wang17], etc.

3.3. Symmetric algebras with radical cube zero

We get the following result.

Proof. By [Reference Adachi and Aoki2, Proposition 3.3], it turns out that the Gabriel quiver of $\Lambda$ is given by adding loops to the double quiver of a quiver $Q$ ; denote by $\widehat{Q}$ the quiver of $\Lambda$ . We also observe that $aa^*\neq 0\neq a^*a$ for any arrow $a$ of $\widehat{Q}$ and $ab=0$ unless $b=a^*$ and $a=b^*$ ; if $a$ is an added loop, write $a^*=a$ . Thus, we get an isomorphism $\iota \,:\,\widehat{Q}^{\textrm{op}}\to \widehat{Q}$ of quivers which fixes all vertices.

Let $i$ be a vertex of $\widehat{Q}$ and $a$ an arrow starting at $i$ . Since $\Lambda$ is symmetric, it is seen that $aa^*$ spans the socle of $P_i\,:\!=e_i\Lambda$ as a vector space. Applying changes of basis, we have $aa^*=bb^*$ for every arrow $b$ of $\widehat{Q}$ starting from $i$ . Let $I$ denote the ideal of $K\widehat{Q}$ consisting of such relations; so $\Lambda \simeq K\widehat{Q}/I$ . Then, we obtain the equality $I^{\textrm{op}}=\iota ^{-1}(I)$ , whence the assertion follows from Proposition 2.2.

3.4. Selfinjective Nakayama algebras

It is well known that a self-injective Nakayama algebra is presented by a cycle quiver with relations $x^r=0$ for some $r\gt 0$ . Here is an easy application of Proposition 2.2.

3.5. Group algebras

Let $G$ be a finite group and $p$ the characteristic of $K$ . While the group algebra $KG$ is, in general, neither basic nor ring-indecomposable,Footnote ¹ it admits an anti-automorphism by $g\mapsto g^{-1}$ ; we can then apply Theorem 1.2 to $KG$ .

The following situation enables us to apply Theorem 1.4.

Proof. As the argument above, we know that $\Lambda$ admits an anti-automorphism $\sigma \ (g\mapsto g^{-1})$ . Since $|E|$ is invertible in $K$ , we put $e\,:\!=\dfrac{1}{|E|}\sum _{g\in E}g$ ; clearly, it is an idempotent fixed by $\sigma$ . It is seen that $e\Lambda =eKG=eKD\simeq KD$ (as $KD$ -modules), which implies that $e$ is primitive. Thus, we deduce the assertion from Theorem 1.4.

We obtain an interesting observation.

Proof. Thanks to Külshammer’s theorem [Reference Kulshammer13, Theorem A], we see that $\Lambda$ is Morita equivalent to the twisted group algebra $K^\alpha [E\ltimes D]$ for some 2-cocycle $\alpha$ , which is just $K[E\ltimes D]$ by assumption. Thus, we find out that $|\operatorname{\mathsf{2silt}}\Lambda |$ is even by Theorem 2.10.

It is known that groups of deficiency zero have the trivial Schur multiplier; see [Reference Johnson12]. Here, the deficiency of a group $G$ is defined to be the maximum of the integers $|X|-|R|$ for all presentations $G=\langle X\ |\ R \rangle$ of $G$ , which is nonpositive if $G$ is a finite group. Typical examples of deficiency-zero finite groups are cyclic groups $\langle g\ |\ g^n=1 \rangle$ and quaternion groups $\langle a,b\ |\ a^{2n}=1, a^n=b^2, ba=a^{-1}b \rangle =\langle a,b\ |\ bab=a^{n-1}, aba=b \rangle$ . Thus, the first example of Corollary 2.11 should be the case that $D$ is cyclic; then, $E$ is automatically cyclic, $\Lambda$ is a symmetric Nakayama algebra [Reference Alperin6, Theorem 17.2], and so $|\operatorname{\mathsf{2silt}}\Lambda |=\binom{2n}{n}$ (even), where $n\,:\!=|E|$ [Reference Adachi1, Corollary 2.29]. Moreover, the equality $|\operatorname{\mathsf{2silt}}\Lambda |=\binom{2n}{n}$ holds even if we drop the assumption of $D$ being normal in $G$ ; then, $\Lambda$ is still a Brauer tree algebra [Reference Alperin6, Theorem 17.1], whence the equality is obtained from [Reference Asashiba, Mizuno and Nakashima7, Theorem 5.1].

3.6. Trivial extension algebras

The trivial extension $T(\Lambda )$ of an algebra $\Lambda$ (by its minimal cogenerator $D\Lambda$ ) is defined to be $\Lambda \oplus D\Lambda$ as a $K$ -vector space with multiplication given by $(a,f)\cdot (b,g)\,:\!=(ab,ag+fb)$ . Here, $D$ denotes the $K$ -dual. We can easily verify that there is a one-to-one correspondence between simple modules of $\Lambda$ and $T(\Lambda )$ ; so we use the same symbol $e$ as a primitive idempotent of $\Lambda$ and $T(\Lambda )$ (via the correspondence).

We state that a bisection of $\operatorname{\mathsf{2silt}}\Lambda$ can be extended to that of $\operatorname{\mathsf{2silt}} T(\Lambda )$ .

Proof. Note that $T(\Lambda )^{\textrm{op}}=T(\Lambda ^{\textrm{op}})$ . Since $\sigma ^{-1}\,:\,\Lambda \to \Lambda ^{\textrm{op}}$ is an algebra isomorphism, we have a $K$ -linear automorphism $t_\sigma \,:\!=\operatorname{Hom}_K(\sigma ^{-1}, K)\,:\,D(\Lambda ^{\textrm{op}})\to D\Lambda$ of $D\Lambda$ . For any $a, b\in \Lambda ^{\textrm{op}}$ and $f\in D(\Lambda ^{\textrm{op}})$ , we get equalities

\begin{equation*}\def \arraystretch {1.5} \begin {array}{rl} t_\sigma (a\bullet f\bullet b)(x) &= (a\bullet f\bullet b)(\sigma ^{-1}(x))=f(b\bullet \sigma ^{-1}(x)\bullet a) = f(\sigma ^{-1}(\sigma (b) x\sigma (a))) \\ &= t_\sigma (f)(\sigma (b)x\sigma (a))=(\sigma (a) t_\sigma (f)\sigma (b))(x). \end {array}\end{equation*}

Here, $\bullet$ stands for the multiplication or the action of $\Lambda ^{\textrm{op}}$ . It turns out that

\begin{equation*} t_\sigma (a\bullet f\bullet b)=\sigma (a)t_\sigma (f)\sigma (b). \end{equation*}

Now, we define a $K$ -linear automorphism $\overline{\sigma }\,:\, T(\Lambda ^{\textrm{op}})\to T(\Lambda )$ by $(a, f)\mapsto (\sigma (a), t_\sigma (f))$ . Let us check that $\overline{\sigma }$ is an anti-automorphism of $T(\Lambda )$ ; for any $a, b\in \Lambda ^{\textrm{op}}$ and $f, g\in D(\Lambda ^{\textrm{op}})$ ,

\begin{equation*} \def \arraystretch {1.5} \begin {array}{rl} \overline {\sigma }((a, f)\bullet (b,g)) &= \overline {\sigma }(a\bullet b, a\bullet g+f\bullet b) =(\sigma (a\bullet b), t_\sigma (a\bullet g+f\bullet b)) \\ &= (\sigma (a)\sigma (b), \sigma (a)t_\sigma (g)+t_\sigma (f)\sigma (b)) \\ &= (\sigma (a), t_\sigma (f))\cdot (\sigma (b), t_\sigma (g))\\ &= \overline {\sigma }(a, f)\cdot \overline {\sigma }(b, g). \end {array}\end{equation*}

Thus, the first assertion holds. As the second assertion is clear, the last one immediately follows from Theorem 1.4.

3.7. Applying the main theorem twice

In this subsection, we try applying Theorem 1.4 twice in a row. Let us show the following.

Proof. As $\mu _P^-(\Lambda )$ is tilting, we identify $\operatorname{\mathsf{2silt}}\Gamma$ with $\{T\in \operatorname{\mathsf{silt}}\Lambda \ |\ \mu _P^-(\Lambda )\geq T\geq \mu _P^-(\Lambda )[1] \}$ . By Lemma 1.3, we have an equality:

\begin{equation*}\def \arraystretch {1.3} \begin {array}{l} \{T\in \operatorname {\mathsf {silt}}\Lambda \ |\ \mu _P^-(\Lambda )\geq T\geq \mu _P^-(\Lambda )[1] \} \\ =\{T\in \operatorname {\mathsf {silt}}\Lambda \ |\ \mu _{P^{\prime}}^-\mu _P^-(\Lambda )\geq T\geq \mu _P^-(\Lambda )[1] \}\sqcup \{T\in \operatorname {\mathsf {silt}}\Lambda \ |\ \mu _P^-(\Lambda )\geq T\geq \Lambda [1]\}, \end {array}\end{equation*}

in which the components of RHS have the same cardinality by Theorem 1.4. Thus, the cardinality of LHS in the equality is the double of that of $\mathcal{T}_P^-$ , which is equal to the cardinality of $\operatorname{\mathsf{2silt}}\Lambda$ .

We give two examples; one illustrates Theorem 2.14, and the other explains that a derived equivalence does not necessarily preserve the cardinality of the poset $\operatorname{\mathsf{2silt}}(\!-\!)$ even if a given algebra is a symmetric algebra which admits an anti-automorphism fixing a primitive idempotent.

Example 2.15. Let $\Lambda$ be the algebra presented by the quiver with relations as follows:

Note that $\Lambda$ is symmetric and admits an anti-automorphism which fixes the vertex 1 and switches the vertices 2 and 3. Set $P_i\,:\!=e_i\Lambda$ .

1. 1. Let $T_1$ be the left mutation of $\Lambda$ with respect to $P_1$ . By hand, we can check that the endomorphism algebra $\Gamma _1$ of $T_1$ is given by the quiver with relations:

   

   It is obtained that $\Gamma _1$ has an anti-automorphism fixing the vertex 1. Thus, we derive from Theorem 2.14 that $\operatorname{\mathsf{2silt}}\Lambda$ and $\operatorname{\mathsf{2silt}}\Gamma _1$ has the same cardinality; it is illustrated by (anti-) isomorphisms $\mathcal{T}_{(P_1)_\Lambda }^+\stackrel{\textrm{anti}}{\simeq }\mathcal{T}_{(P_1)_\Lambda }^-\simeq \mathcal{T}_{(P_1)_{\Gamma _1}}^+\stackrel{\textrm{anti}}{\simeq }\mathcal{T}_{(P_1)_{\Gamma _1}}^-$ . Actually, $\operatorname{\mathsf{2silt}}\Lambda$ and $\operatorname{\mathsf{2silt}}\Gamma _1$ are finite sets and the numbers are 32 [Reference Aihara, Honma, Miyamoto and Wang4, Theorem 2].

2. 2. Let $T_2$ be the left mutation of $\Lambda$ with respect to $P_2$ . We have the endomorphism algebra $\Gamma _2$ presented by the quiver with relations:

   

   Unfortunately, the cardinality of $\operatorname{\mathsf{2silt}}\Gamma _2$ is 28 by [Reference Aihara, Honma, Miyamoto and Wang4, Theorem 2]. Since $\Gamma _2$ admits an anti-automorphism fixing the vertex 2, a similar argument as the proof of Theorem 2.14 explains that $\mathcal{T}_{(P_2)_\Lambda }^-\simeq \mathcal{T}_{(P_2)_{\Gamma _2}}^+\stackrel{\textrm{anti}}{\simeq }\mathcal{T}_{(P_2)_{\Gamma _2}}^-$ , and so we obtain $|\mathcal{T}_{(P_2)_\Lambda }^-|=14$ and $|\mathcal{T}_{(P_2)_\Lambda }^+|=18$ . (Note that $\mathcal{T}_{(P_2)_\Lambda }^-\stackrel{\textrm{anti}}{\simeq }\mathcal{T}_{(P_3)_\Lambda }^+$ ; so, $|\mathcal{T}_{(P_3)_\Lambda }^-|=18$ and $|\mathcal{T}_{(P_3)_\Lambda }^+|=14$ .) When $U_3$ is the left mutation of $\Gamma _2$ with respect to $P_3$ , the endomorphism algebra of $U_3$ is isomorphic to $\Lambda$ . This says that a derived equivalence does not necessarily preserve the number of $\operatorname{\mathsf{2silt}}(\!-\!)$ , although $\Gamma _2$ is symmetric and admits an anti-automorphism fixing all vertices.

There are some special derived equivalence classes of algebras for which the cardinalities of $2\operatorname{\mathsf{silt}}(\!-\!)$ are constant, but the proofs are case by case for each algebra. Using Theorem 2.14, we may give an explicit example of such classes.

Example 2.16. Let $\Lambda$ be the multiplicity-free Brauer triangle algebra; that is, it is given by the quiver with relations as follows.

We see that $\Lambda$ admits an anti-automorphism fixing every vertex; cf. Theorem 2.7.

Let $P\,:\!=e_1\Lambda$ and $\Gamma$ denote the endomorphism algebra of the left mutation $\mu _P^-(\Lambda )$ ; note that $\mu _P^-(\Lambda )$ is a tilting object in $\mathcal{K}_\Lambda$ , and so $\Lambda$ and $\Gamma$ are derived equivalent. By hand, we obtain that $\Gamma$ is presented by the quiver with relations:

Observe that $\Gamma$ admits an anti-automorphism fixing all vertices.

Thus, it turns out by Theorem 2.14 that $\operatorname{\mathsf{2silt}}\Lambda$ and $\operatorname{\mathsf{2silt}}\Gamma$ have the same cardinality; actually, they are finite sets and the numbers are 32. See $D(3K)$ and $D(3A)_1$ in Table 1 of [Reference Eisele, Janssens and Raedschelders9]. Moreover, the class $\{\Lambda, \Gamma \}$ forms a derived equivalence class.