GAP 4.8.9 installation with standard packages -- copy to your CoCalc project to get it

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Let $G$ be a finite group and $N\subseteq G$. The set $R\subseteq G$
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with $|R|=k$ is called a ``relative difference set of order
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$k-\lambda$ relative to the forbidden set $N$'' if the following
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properties hold:
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\beginlist%ordered{(a)}
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\item{(a)} The multiset $\{ a.b^{-1}\colon a,b\in R\}$ contains
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  every nontrivial ($\neq 1$) element of $G-N$ exactly $\lambda$
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  times.  
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\item{(b)} $\{ a.b^{-1}\colon a,b\in R\}$ does not contain
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  any non-trivial element of $N$.
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\endlist
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Relative difference sets with $N=1$ are called (ordinary) difference
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sets. As a special case, difference sets with $N=1$ and $\lambda=1$
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correspond to projective planes of order $k-1$.  Here the blocks are
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the translates of $R$ and the points are the elements of $G$.
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In group ring notation a relative difference set satisfies
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$$
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RR^{-1}=k+\lambda(G-N).
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$$
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The set $D\subseteq G$ is called *partial relative difference set*
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with forbidden set $N$, if
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$$
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    DD^{-1}=\kappa+\sum_{g\in G-N}v_gg   
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$$ 
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holds for some $1\leq\kappa\leq k$ and $0\leq v_g \leq \lambda$ for
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all $g\in G-N$.  If $D$ is a relative difference set then ,obviously,
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$D$ is also a partial relative difference set.
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Two relative difference sets $D,D'\subseteq G$ are called *strongly
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equivalent* if they have the same forbidden set $N\subseteq G$ and if
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there is $g\in G$ and an automorphism $\alpha$ of $G$ such that
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$D'g^{-1}=D^\alpha$. The same term is applied to partial relative
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difference sets.
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Let $D\subseteq G$ be a difference set, then the incidence structure
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with points $G$ and blocks $\{Dg\;|\;g\in G\}$ is called the
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*development* of $D$. In short:  ${\rm dev} D$. Obviously, $G$ acts on
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${\rm dev}D$ by multiplication from the right.
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If $D$ is a difference set, then $D^{-1}$ is also a difference set.
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And ${\rm dev} D^{-1}$ is the dual of ${\rm dev} D$. So a group
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admitting an operation some structure defined by a difference set does
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also admit an operation on the dual structure. We may therefore change
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the notion of equivalence and take $\phi$ to be an automorphism or an
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anti-automorphism. Forbidden sets are closed under inversion, so this
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gives a ``weak'' sort of strong equivalence.
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%E ENDE 
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