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- Cyclically_ordered_group abstract "In mathematics, a cyclically ordered group is a set with both a group structure and a cyclic order, such that left and right multiplication both preserve the cyclic order.Cyclically ordered groups were first studied in depth by Ladislav Rieger in 1947. They are a generalization of cyclic groups: the infinite cyclic group Z and the finite cyclic groups Z/n. Since a linear order induces a cyclic order, cyclically ordered groups are also a generalization of linearly ordered groups: the rational numbers Q, the real numbers R, and so on. Some of the most important cyclically ordered groups fall into neither previous category: the circle group T and its subgroups, such as the subgroup of rational points.".
- Cyclically_ordered_group wikiPageExternalLink download?doi=10.1.1.90.2398&type=pdf.
- Cyclically_ordered_group wikiPageExternalLink CzechMathJ_41-1991-1_21.pdf.
- Cyclically_ordered_group wikiPageExternalLink ArchMath_025-1989-1_3.pdf.
- Cyclically_ordered_group wikiPageExternalLink CasPestMat_113-1988-2_6.pdf.
- Cyclically_ordered_group wikiPageExternalLink CzechMathJ_48-1998-2_3.pdf.
- Cyclically_ordered_group wikiPageExternalLink CzechMathJ_52-2002-2_4.pdf.
- Cyclically_ordered_group wikiPageExternalLink CzechMathJ_43-1993-2_6.pdf.
- Cyclically_ordered_group wikiPageExternalLink CzechMathJ_43-1993-3_8.pdf.
- Cyclically_ordered_group wikiPageExternalLink CzechMathJ_44-1994-2_3.pdf.
- Cyclically_ordered_group wikiPageExternalLink MathSlov_38-1988-3_8.pdf.
- Cyclically_ordered_group wikiPageExternalLink MathSlov_38-1988-3_9.pdf.
- Cyclically_ordered_group wikiPageExternalLink MathSlov_45-1995-1_4.pdf.
- Cyclically_ordered_group wikiPageExternalLink 400757.
- Cyclically_ordered_group wikiPageExternalLink CzechMathJ_37-1987-1_16.pdf.
- Cyclically_ordered_group wikiPageExternalLink CzechMathJ_40-1990-3_19.pdf.
- Cyclically_ordered_group wikiPageExternalLink bibwww.pdf?nIdA=11146.
- Cyclically_ordered_group wikiPageExternalLink bibwww.pdf?nIdA=4493.
- Cyclically_ordered_group wikiPageExternalLink cmb1980v23.0067-0070.pdf.
- Cyclically_ordered_group wikiPageExternalLink gklcor.pdf.
- Cyclically_ordered_group wikiPageExternalLink fm4718.pdf.
- Cyclically_ordered_group wikiPageExternalLink mz6156.
- Cyclically_ordered_group wikiPageExternalLink MathSlov_39-1989-1_6.pdf.
- Cyclically_ordered_group wikiPageExternalLink MathSlov_41-1991-1_7.pdf.
- Cyclically_ordered_group wikiPageExternalLink item?id=AMBP_2007__14_1_37_0.
- Cyclically_ordered_group wikiPageExternalLink item?id=CM_1971__23_2_189_0.
- Cyclically_ordered_group wikiPageID "32131620".
- Cyclically_ordered_group wikiPageRevisionID "557634021".
- Cyclically_ordered_group hasPhotoCollection Cyclically_ordered_group.
- Cyclically_ordered_group last "Rieger".
- Cyclically_ordered_group year "1946".
- Cyclically_ordered_group year "1947".
- Cyclically_ordered_group year "1948".
- Cyclically_ordered_group subject Category:Circles.
- Cyclically_ordered_group subject Category:Ordered_groups.
- Cyclically_ordered_group type Abstraction100002137.
- Cyclically_ordered_group type Attribute100024264.
- Cyclically_ordered_group type Circle113873502.
- Cyclically_ordered_group type Circles.
- Cyclically_ordered_group type ConicSection113872975.
- Cyclically_ordered_group type Ellipse113878306.
- Cyclically_ordered_group type Figure113862780.
- Cyclically_ordered_group type Group100031264.
- Cyclically_ordered_group type OrderedGroups.
- Cyclically_ordered_group type PlaneFigure113863186.
- Cyclically_ordered_group type Shape100027807.
- Cyclically_ordered_group comment "In mathematics, a cyclically ordered group is a set with both a group structure and a cyclic order, such that left and right multiplication both preserve the cyclic order.Cyclically ordered groups were first studied in depth by Ladislav Rieger in 1947. They are a generalization of cyclic groups: the infinite cyclic group Z and the finite cyclic groups Z/n.".
- Cyclically_ordered_group label "Cyclically ordered group".
- Cyclically_ordered_group sameAs m.0gx1c48.
- Cyclically_ordered_group sameAs Q5198242.
- Cyclically_ordered_group sameAs Q5198242.
- Cyclically_ordered_group sameAs Cyclically_ordered_group.
- Cyclically_ordered_group wasDerivedFrom Cyclically_ordered_group?oldid=557634021.
- Cyclically_ordered_group isPrimaryTopicOf Cyclically_ordered_group.