#jugglingtheory — Public Fediverse posts
Live and recent posts from across the Fediverse tagged #jugglingtheory, aggregated by home.social.
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@christianp The co-limit of the State Transition Graph for SiteSwaps is a labelled infinite digraph with a non-trivial automorphism whose square is the identity.
You can restrict this to a symmetrical (in the sense that the automorphism is preserved) finite graph by restricting the labels to be in the range [-n,n] for n in N.
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@christianp The co-limit of the State Transition Graph for SiteSwaps is a labelled infinite digraph with a non-trivial automorphism whose square is the identity.
You can restrict this to a symmetrical (in the sense that the automorphism is preserved) finite graph by restricting the labels to be in the range [-n,n] for n in N.
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@christianp The co-limit of the State Transition Graph for SiteSwaps is a labelled infinite digraph with a non-trivial automorphism whose square is the identity.
You can restrict this to a symmetrical (in the sense that the automorphism is preserved) finite graph by restricting the labels to be in the range [-n,n] for n in N.
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@christianp The co-limit of the State Transition Graph for SiteSwaps is a labelled infinite digraph with a non-trivial automorphism whose square is the identity.
You can restrict this to a symmetrical (in the sense that the automorphism is preserved) finite graph by restricting the labels to be in the range [-n,n] for n in N.
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@christianp The co-limit of the State Transition Graph for SiteSwaps is a labelled infinite digraph with a non-trivial automorphism whose square is the identity.
You can restrict this to a symmetrical (in the sense that the automorphism is preserved) finite graph by restricting the labels to be in the range [-n,n] for n in N.