03127nam 2200577 450 991079400270332120201010081917.01-4704-6144-7(CKB)4100000011309201(MiAaPQ)EBC6229933(RPAM)21609895(PPN)250767872(EXLCZ)99410000001130920120201010d2020 uy 0engurcnu||||||||txtrdacontentcrdamediacrrdacarrierLaminational models for some spaces of polynomials of any degree /Alexander Blokh [and three others]Providence, Rhode Island :American Mathematical Society,2020.1 online resource (118 pages)Memoirs of the American Mathematical Society ;Number 12881-4704-4176-4 Includes bibliographical references and index.Invariant laminations : general properties -- Special types of invariant laminations -- Applications : Spaces of topological polynomials."The so-called "pinched disk" model of the Mandelbrot set is due to A. Douady, J. H. Hubbard and W. P. Thurston. It can be described in the language of geodesic laminations. The combinatorial model is the quotient space of the unit disk under an equivalence relation that, loosely speaking, "pinches" the disk in the plane (whence the name of the model). The significance of the model lies in particular in the fact that this quotient is planar and therefore can be easily visualized. The conjecture that the Mandelbrot set is actually homeomorphic to this model is equivalent to the celebrated MLC conjecture stating that the Mandelbrot set is locally connected. For parameter spaces of higher degree polynomials no combinatorial model is known. One possible reason may be that the higher degree analog of the MLC conjecture is known to be false. We investigate to which extent a geodesic lamination is determined by the location of its critical sets and when different choices of critical sets lead to essentially the same lamination. This yields models of various parameter spaces of laminations similar to the "pinched disk" model of the Mandelbrot set"--Provided by publisher.Memoirs of the American Mathematical Society ;Number 1288.Geodesics (Mathematics)PolynomialsInvariant manifoldsCombinatorial analysisDynamicsGeodesics (Mathematics)Polynomials.Invariant manifolds.Combinatorial analysis.Dynamics.514/.74237F2037F1037F50mscBlokh Alexander M.1958-1154927Oversteegen Lex G.Ptacek RossTimorin VladlenMiAaPQMiAaPQMiAaPQBOOK9910794002703321Laminational models for some spaces of polynomials of any degree3694400UNINA