1883 ; Cantor ; G. ; Continuum is a compact playground for any small ant. 1887 ; Jordan ; C. ; Each simple closed planar curve surrounds its inside and outside. 1890 ; Peano ; G. ; Drawing a full square with a segment. 1900 ; Hilbert ; D. ; Hilbert cube containing a copy of any continuum. 1902 ; Painleve ; P. ; A decreasing sequence of continua forms a continuum. 1910 ; Brouwer ; L.E.J. ; Buckethandle as the simplest indecomposable continuum. 1912 ; Janiszewski ; Z. ; Arc-less continuum. 1912 ; Janiszewski ; Z. ; Buckethandle in an angular shape. 1912 ; Wada ; T. ; Lakes of Wada (three disjoint connected open sets of the plane with the same boundary). 1914 ; Hahn ; H. ; Locally connected continuum is a continuous image of [0,1]. 1914 ; Mazurkiewicz ; S. ; Sierpinski carpet contains only ramification points of infinite order. 1915 ; Sierpinski ; W. ; Half homogeneous Sierpinski carpet containing a copy of every planar curve. 1915 ; Sierpinski ; W. ; Sierpinski triangle with only ramification points. 1916 ; Moore ; R.L. ; Chainable continuum. 1918 ; Sierpinski ; W. ; Any continuum is sigma connected, not a countable union of disjoint closed sets. 1918 ; Janiszewski ; Z. ; Foundation of Fundamenta Mathematicae journal (with W. Sierpinski and S. Mazurkiewicz). 1920 ; Antoine ; L. ; Antoine's necklace (wild embedding of the Cantor set). 1920 ; Mazurkiewicz ; S. ; Locally connected continuum is a continuous image of [0,1]. 1920 ; Moore ; R.L. ; Two non-cut points in any continuum. 1922 ; Antoine ; L. ; Antoine's arc (wild embedding of the arc). 1922 ; Knaster ; B. ; Buckethandle in a round shape. 1922 ; Knaster ; B. ; Pseudo-arc, the nondegenerate hereditarily indecomposable continuum. 1923 ; Wazewski ; T. ; Wazewski universal dendrite containing a copy of any dendrite. 1924 ; Alexander ; J.W. ; Alexander horned sphere, a wild embedding of a sphere into space. 1924 ; Mazurkiewicz ; S. ; Each locally connected homogeneous plane continuum is a simple closed curve. 1925 ; Gehman ; H.M. ; Dendrite with ramification points of order 3 and end points forming the Cantor set. 1926 ; Menger ; K. ; Homogeneous Menger sponge containing a copy of every curve. 1927 ; Kuratowski ; K. ; A point of irreducibility in a continuum is not contained in two proper subcontinua (a characterization). 1927 ; Vietoris ; L. ; Solenoid (in a sequence folding tube in a previous tube twice). 1929 ; Roberts ; J.H. ; Upper semicontinuous decomposition of the plane into nonseparating locally connected subcontinua. 1930 ; Mazurkiewicz ; S. ; A typical continuum is hereditarily indecomposable. 1930 ; Dantzig ; D. von ; Homogeneity of a solenoid. 1930 ; Kurtowski ; K. ; Planability test for local dendrites (cannot contain two special continua). 1930 ; Whyburn ; G.T. ; Whyburn's curve, a continuum every subcontinuum of which separates the plane. 1931 ; Keller ; O.H. ; Hilbert cube is homogeneous. 1932 ; Miller ; E.W. ; A dendrite not containing its proper copy. 1932 ; Waraszkiewicz ; Z. ; Waraszkiewicz's spirals ( an uncountable family of continuously incomparable planar curves). 1934 ; Borsuk ; K. ; The dunce hat (Borsuk's tube, acyclic polyhedron which is not the union of two acyclic polyhedra). 1935 ; Mazurkiewicz ; S. ; Any compact metric space of dimension 2 contains a nondegenerate indecomposable continuum. 1936 ; Whyburn ; G.T. ; Decomposition of 3-space into 3-space using Antoine's arc and points. 1937 ; Sierpinski ; W. ; Arc mapped onto Hilbert cube. 1937 ; Freudenthal ; H. ; Solenoid as an inverse limit. 1937 ; Claytor ; S. ; Two Claytor continua block planarity of a Peano continuum. 1944 ; Sorgenfrey ; R.H. ; Every nondegenerate unicoherent continuum which is not a triod is irreducible. 1945 ; Besicovitch ; A.S. ; A dendrite such that no two of its open sets are homeomorphic. 1947 ; Borsuk ; K. ; An example of a simple arc in space whose projection in every plane has interior points. 1948 ; Bing ; R.H. ; Homogeneity of the pseudo-arc. 1948 ; Moise ; E.E. ; Indecomposable planar continuum homeomorphic to each of its nondegenerate subcontinua (the pseudo-arc). 1948 ; Jones ; F. B. ; T function (the complement of T(A) contains the interior points of subcontinua not meeting A). 1951 ; Hamilton ; O.H. ; Each chainable continuum has the fixed-point property. 1951 ; Bing ; R.H. ; Planar non-chainable circularly chainable hereditarily indecomposable continuum (a pseudo-circle). 1952 ; Anderson ; R.D. ; A continuous decomposition of the plane into nonseparating subcontinua. 1958 ; Anderson ; R.D. ; Menger universal curve is homogeneous. 1959 ; Anderson ; R.D. ; A plane continuum no two of whose nendegenerate subcontinua are homeomorphic. 1959 ; Choquet ; G. ; A plane continuum no two of whose nendegenerate subcontinua are homeomorphic. 1959 ; Isbell ; J.R. ; Chainable continuum is an inverse limit of an inverse sequence of arcs. 1959 ; Bing ; R.H. ; The circle of pseudo-arcs. 1959 ; Jones ; F. B. ; The circle of pseudo-arcs. 1961 ; Lelek ; A. ; The Lelek fan (a smooth fan with a dense set of endpoints). 1962 ; Lelek ; A. ; Weakly chainable continua are exactly continuous images of the pseudo-arc. 1963 ; Borsuk ; K. ; Borsuk nonplanar fan. 1964 ; Henderson ; G. ; Arc is the only decomposable hereditarily equivalent continuum. 1964 ; Lelek ; A. ; Span zero (no two points can change the position on a continuum). 1964 ; Henderson ; G. ; The pseudo-arc is an inverse limit using only one binding map. 1964 ; Charatonik ; J.J. ; Unicoherence of locally connected continua is an invariant under confluent mappings. 1965 ; Effros ; E.G. ; The group of homeomorphisms acts locally. 1965 ; Schori ; R.M. ; Universal chainable continuum. 1967 ; Smale ; S. ; Buckethandle in a horseshoe shape as the fixed set of a mapping square into a horseshoe. 1967 ; Cook ; H. ; Cook's continuum (a continuum admitting only the identity or a constant mapping onto itself). 1969 ; Krasinkiewicz ; J. ; Sierpinski universal plane curve is 1/2-homogeneous. 1970 ; Rogers ; J.T. ; A pseudo-solenoid is a common model for circle-like continua. 1970 ; Rogers ; J.T. ; The pseudo-circle is not homogeneous. 1970 ; Fearnley ; L. ; The pseudo-circle is unique. 1971 ; Lelek ; A. ; Houston problem book. 1972 ; Ingram ; W.T. ; An atriodic tree-like continuum with positive span. 1972 ; Bennett ; R.B. ; Menger universal curve is countable dense homogeneous. 1972 ; Charatonik ; J.J. ; Problem posing (?) challenge over problem solving (exists) and generalisations (for all). 1973 ; Nadler ; Sam B. Jr. ; The indecomposability of the dyadic solenoid. 1974 ; Rosenholtz ; I. ; Open image of a chainable continuum is chainable. 1975 ; Ungar ; G.S. ; 2-homogeneous continuum is locally connected. 1977 ; Hagopian ; Ch.L. ; Solenoids (homogeneous continua with only arc subcontinua). 1977 ; Rogers ; J.T. ; Solenoids of pseudo-arcs. 1978 ; Charatonik ; J.J. ; Arc-like openly homogenous continuum is the pseudo-arc. 1978 ; Curtis ; D.W. ; Hyperspaces of closed subsets of Peano continua are Hilbert cubes. 1978 ; Schori ; R.M. ; Hyperspaces of closed subsets of Peano continua are Hilbert cubes. 1978 ; Illanes ; A. ; Hyperspaces of sets. Book I 1978 ; Grispolakis ; J. ; Universal smooth dendroid. 1978 ; Tymchatyn ; E.D. ; Universal smooth dendroid. 1979 ; Bellamy ; D.P. ; A nonplanar tree-like continuum which admits a fixed point free mapping. 1979 ; Ingram ; W.T. ; Hereditarily indecomposable tree-like continua. 1980 ; Krasinkiewicz ; J. ; A dendroid with a monotone open map onto an arc. 1980 ; Minc ; P. ; A dendroid with a monotone open map onto an arc. 1980 ; Oversteegen ; Lex G. ; A dendroid with a monotone open map onto an arc. 1980 ; Mill ; J. van ; A Peano continuum homeomorphic to its own square but not to its countable infinite product. 1980 ; Iliadis ; S.D. ; Universal completely regular continuum (each nondegenerate subcontinuum has a nonempty interior). 1982 ; Oversteegen ; Lex ; Indecomposable homogeneous planar continuum has span zero. 1982 ; Tymchatyn ; E.D. ; Indecomposable homogeneous planar continuum has span zero. 1984 ; Charatonik ; J.J. ; Example of a smooth dendroid without ordinary points. 1984 ; Nikiel ; J. ; Gehman dendroid is the only dendrite with its set of end-points homeomorphic to the Cantor set. 1985 ; Mackowiak ; T. ; A universal hereditarily indecomposable continuum. 1986 ; Kennedy ; J. ; Pseudo-circle has uncountably many orbits each of which is the union of uncountably many composants. 1986 ; Rogers ; J.T. ; Pseudo-circle has uncountably many orbits each of which is the union of uncountably many composants. 1988 ; Mackowiak ; T. ; A characterization of finitely irreducible continua. 1989 ; Charatonik ; J.J. ; A fan is smooth iff can be embedded into the Cantor fan. 1989 ; Charatonik ; W.J. ; A fan is smooth iff can be embedded into the Cantor fan. 1989 ; Charatonik ; W.J. ; Lelek fan is the unique smooth fan with a dense set of endpoints. 1990 ; Kuperberg ; K. ; A locally connected homogeneous non-bihomogeneous continuum of dimension 7. 1990 ; Krupski ; P. ; Homogeneous tree-like continua are hereditarily indecomposable. 1990 ; Prajs ; J.R. ; Homogeneous tree-like continua are hereditarily indecomposable. 1991 ; Minc ; P. ; A transitive map on [0,1] whose inverse limit is the pseudo-arc. 1991 ; Transue ; W.R.R. ; A transitive map on [0,1] whose inverse limit is the pseudo-arc. 1992 ; Nadler ; Sam B. Jr. ; Continuum Theory. An Introduction. Book II 1993 ; Nadler ; Sam B. Jr. ; A continuum separated by each of its nondegenerate proper subcontinua. 1993 ; Seldomridge ; Gary A. ; A continuum separated by each of its nondegenerate proper subcontinua. 1993 ; Bellamy ; D. ; A tree-like continuum without the fixed-point property. 1993 ; Minc ; P. ; An atriodic simple-4-od-like continuum which is not simple-triod-like. 1993 ; Aarts ; J.M. ; Hairy arc. 1993 ; Oversteegen ; L.G. ; Hairy arc. 1994 ; Bandt ; Ch. ; Non-zero composants of the Buckethandle are homeomorphic. 1995 ; Kennedy ; J. ; Buckethandle as an inverse limit of circles using a single bonding map. 1996 ; Hagopian ; Ch. L. ; Simply connected plane continua have the fixed-point property. 1999 ; Lewis ; W. ; An example of a chainable continuum that admits an exactly 2-to-1 mapping onto a continuum. 1999 ; Illanes ; A. ; Hyperspaces. Book III 1999 ; Nadler ; Sam B. Jr. ; Hyperspaces. Book III 1999 ; Lewis ; W. ; Pseudo-arc maturity. 1999 ; Illanes ; A. ; The Continuum theory hyperspace in Mexico. 1999 ; Minc ; P. ; There exists a tree-like weakly chainable continuum without the fixed-point property. 2000 ; Prajs ; J.R. ; A continuous decomposition of the Menger curve into pseudo-arcs. 2002 ; Illanes ; A. ; Buckethandle admits no mean. 2003 ; Minc ; P. ; Buckethandle is mapped onto a planar dedroid with point-inverses at most of cardinality 3. 2003 ; Minc ; P. ; Planar dendroid contains a single point bottleneck. 2005 ; Macias ; S. ; Topics on continua. Book IV 2010 ; Illanes ; A. ; The arc is the only chainable continuum admitting a mean. 2010 ; Villanueva ; H. ; The arc is the only chainable continuum admitting a mean. 2011 ; Hoehn ; L.C. ; A non-chainable plane continuum with span zero. 2012 ; Ingram ; W.T. ; Inverse limit of books on inverse limit... 2013 ; Vejnar ; B. ; Acrless-arc, the arc-like arc-less continuum with two endpoints. 2013 ; Hoehn ; L.C. ; An uncountable collection of copies of a non-chainable tree-like continuum in the plane. 2014 ; Sturm ; F. ; Pseudo-solenoid is not continuously homogeneous. 2015 ; Mill ; J. van ; Pseudo-arc is the only continuum with homeomorphically near property. 2015 ; Banic ; I. ; Standard universal dendrite of order 3 as an inverse limit of arcs with one binding map. 2015 ; Martinez-de-la-Vega ; V. ; Standard universal dendrite of order 3 as an inverse limit of arcs with one binding map. 2016 ; Prajs ; J.R. ; Arcwise connected homogeneous continuum is a continuous image of the Cantor fan. 2016 ; Hoehn ; L.C. ; Classification of planar homogeneous continua. 2016 ; Oversteegen ; Lex ; Classification of planar homogeneous continua. 2016 ; Vejnar ; B. ; Two non-block points in any continuum. 2020 ; Hoehn ; L.C. ; Classification of hereditarily equivalent plane continua. 2020 ; Oversteegen ; Lex ; Classification of hereditarily equivalent plane continua.