Difference between revisions of "Known Picard groups"
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== Blocks with normal defect groups == | == Blocks with normal defect groups == | ||
− | In [[References#L|[Liv19]]] it is shown that if <math>D \triangleleft G</math> and <math>E</math> is abelian, then <math>{\rm Pic}(B) = \mathcal{L}(B)</math> and <math>{\rm Picent}(B)=1</math>. | + | In [[References#L|[Liv19]]] it is shown that if <math>D \triangleleft G</math> and <math>E</math> is abelian, then <math>{\rm Pic}(B) = \mathcal{L}(B)</math> and <math>{\rm Picent}(B)=1</math>. In [[References#L|[LiMa20b]]], it was shown that for odd primes <math>{\rm Pic}(B) = \mathcal{L}(B)</math> whenever <math>D \triangleleft G</math>, and that this result holds for <math>p=2</math> if we further assume that <math>D/[D,D]</math> has no direct factor isomorphic to <math>C_2</math>. |
== Abelian defect groups of <math>2</math>-rank at most three for <math>p=2</math> == | == Abelian defect groups of <math>2</math>-rank at most three for <math>p=2</math> == |
Latest revision as of 11:04, 25 May 2021
Unless stated otherwise, [math]{\rm Pic}[/math] will always mean [math]{\rm Pic}_{\mathcal{O}}[/math].
Let [math]B[/math] be a block of [math]\mathcal{O}G[/math] for a finite group [math]G[/math]. Let [math]D[/math] be a defect group and let [math]E[/math] be the inertial quotient.
Contents
Blocks with cyclic groups
Suppose that [math]D[/math] is cyclic.
If [math]E=1[/math], then [math]B[/math] is nilpotent and so [math]{\rm Pic}(B)\cong D:{\rm Aut}(D)[/math].
If [math]E \neq 1[/math], then [math]{\rm Pic}(B) \cong {\rm Out}_D(A) \times {\rm Aut}(D)/E[/math], where [math]A[/math] is a source algebra for [math]B[/math].[1] Note that while [math]{\rm Out}_D(A)[/math] is isomorphic to a subgroup of [math]E[/math] and [BKL18, Theorem 1.4] gives a generator of this subgroup, it still needs to be computed on a case-by-case basis.
If follows from [BKL18, Theorem 1.4] that [math]{\rm Picent(B)}=1[/math].
Blocks with Klein four defect groups
Suppose that [math]D \cong C_2 \times C_2[/math].
Then [math]B[/math] is Morita equivalent to [math]\mathcal{O}D[/math], [math]\mathcal{O}A_4[/math] or [math]B_0(\mathcal{O}A_5)[/math]. The Picard groups are known by [BKL18].
[math]{\rm Pic}(\mathcal{O}D) = \mathcal{L}(B) \cong D:{\rm Aut(D)} \cong D:S_3[/math].
[math]{\rm Pic}(\mathcal{O}A_4) = \mathcal{T}(B) \cong S_3[/math].
[math]{\rm Pic}(B_0(\mathcal{O}A_5)) = \mathcal{T}(B) \cong C_2[/math].
Note that since any block with this defect group is source algebra equivalent to one of these three blocks[2], it follows that every Morita self-equivalence is given by a linear source bimodule since the same is true for the three blocks.
Unpublished elementary calculations give that
[math]{\rm Pic}_k(kD) \cong (k \times k):GL_2(k)[/math].
[math]{\rm Pic}_k(kA_4) \cong (k^* \times k^* \times C_3):C_2[/math].
[math]{\rm Pic}_k(B_0(kA_5)) = (k^* \times k^*):C_2[/math].
Blocks with normal defect groups
In [Liv19] it is shown that if [math]D \triangleleft G[/math] and [math]E[/math] is abelian, then [math]{\rm Pic}(B) = \mathcal{L}(B)[/math] and [math]{\rm Picent}(B)=1[/math]. In [LiMa20b], it was shown that for odd primes [math]{\rm Pic}(B) = \mathcal{L}(B)[/math] whenever [math]D \triangleleft G[/math], and that this result holds for [math]p=2[/math] if we further assume that [math]D/[D,D][/math] has no direct factor isomorphic to [math]C_2[/math].
Abelian defect groups of [math]2[/math]-rank at most three for [math]p=2[/math]
In [EL18c] the isomorphism type of the Picard groups is calculated for every [math]2[/math]-block with abelian defect groups of [math]2[/math]-rank at most three, with the exception of the principal block of the sporadic group [math]J_1[/math]. This final case has been calculated by Eisele. In every case [math]{\rm Picent}(B)=1[/math].
Miscallaneous other cases
[math]{\rm Pic}(B_0(\mathcal{O}(A_5 \times A_4))) \cong C_2 \times S_3[/math][3]
[math]{\rm Pic}(B_0(\mathcal{O} SL_2(2^n))) \cong C_n[/math] when [math]n \geq 2[/math][4]