@Article{         BojanczykKopczynskiTorunczyk,
    author = {Boja{\'n}czyk, Miko{{\l}}aj and Kopczy{\'n}ski, Eryk and Toru{\'n}czyk, Szymon},
  date-added    = "2012-06-22 21:58:44 +0100",
  date-modified = "2012-06-22 22:00:34 +0100",
  Journal       = "Semigroup Forum",
  Keywords      = "Ramsey theory",
  Title         = "Ramsey's theorem for colors from a metric space",
  Year          = "2012",
    abstract = {The Ramsey theorem says that for any countably infinite undirected clique whose edges are colored by a finite number of colors, there is an infinite subclique whose edges are colored by a single color. In this note, we generalize the theorem to a situation where the colors form a compact metric space.},
    date = {2012/08/01},
    doi = {10.1007/s00233-012-9404-4},
    isbn = {1432-2137},
    number = {1},
    pages = {182--184},
    url = {https://doi.org/10.1007/s00233-012-9404-4},
    volume = {85},
  File          = "Ramsey's theorem for colors from a metric space - Bojanczyk, Kopczyński, Toruńczyk (0) (0) - a - a - a.pdf"
}

@Article{ BojanczykKopczynskiTorunczyk, author = {Boja{\'n}czyk, Miko{{\l}}aj and Kopczy{\'n}ski, Eryk and Toru{\'n}czyk, Szymon}, date-added = "2012-06-22 21:58:44 +0100", date-modified = "2012-06-22 22:00:34 +0100", Journal = "Semigroup Forum", Keywords = "Ramsey theory", Title = "Ramsey's theorem for colors from a metric space", Year = "2012", abstract = {The Ramsey theorem says that for any countably infinite undirected clique whose edges are colored by a finite number of colors, there is an infinite subclique whose edges are colored by a single color. In this note, we generalize the theorem to a situation where the colors form a compact metric space.}, date = {2012/08/01}, doi = {10.1007/s00233-012-9404-4}, isbn = {1432-2137}, number = {1}, pages = {182--184}, url = {https://doi.org/10.1007/s00233-012-9404-4}, volume = {85}, File = "Ramsey's theorem for colors from a metric space - Bojanczyk, Kopczyński, Toruńczyk (0) (0) - a - a - a.pdf" }