TY - BOOK AU - Takamura,Shigeru ED - SpringerLink (Online service) TI - Splitting Deformations of Degenerations of Complex Curves: Towards the Classification of Atoms of Degenerations, III T2 - Lecture Notes in Mathematics, SN - 9783540333647 AV - QA564-609 U1 - 516.35 23 PY - 2006/// CY - Berlin, Heidelberg PB - Springer Berlin Heidelberg KW - Mathematics KW - Geometry, algebraic KW - Differential equations, partial KW - Algebraic Geometry KW - Several Complex Variables and Analytic Spaces N1 - Basic Notions and Ideas -- Splitting Deformations of Degenerations -- What is a barking? -- Semi-Local Barking Deformations: Ideas and Examples -- Global Barking Deformations: Ideas and Examples -- Deformations of Tubular Neighborhoods of Branches -- Deformations of Tubular Neighborhoods of Branches (Preparation) -- Construction of Deformations by Tame Subbranches -- Construction of Deformations of type Al -- Construction of Deformations by Wild Subbranches -- Subbranches of Types Al, Bl, Cl -- Construction of Deformations of Type Bl -- Construction of Deformations of Type Cl -- Recursive Construction of Deformations of Type Cl -- Types Al, Bl, and Cl Exhaust all Cases -- Construction of Deformations by Bunches of Subbranches -- Barking Deformations of Degenerations -- Construction of Barking Deformations (Stellar Case) -- Simple Crusts (Stellar Case) -- Compound barking (Stellar Case) -- Deformations of Tubular Neighborhoods of Trunks -- Construction of Barking Deformations (Constellar Case) -- Further Examples -- Singularities of Subordinate Fibers near Cores -- Singularities of Fibers around Cores -- Arrangement Functions and Singularities, I -- Arrangement Functions and Singularities, II -- Supplement -- Classification of Atoms of Genus ? 5 -- Classification Theorem -- List of Weighted Crustal Sets for Singular Fibers of Genus ? 5 N2 - The author develops a deformation theory for degenerations of complex curves; specifically, he treats deformations which induce splittings of the singular fiber of a degeneration. He constructs a deformation of the degeneration in such a way that a subdivisor is "barked" (peeled) off from the singular fiber. These "barking deformations" are related to deformations of surface singularities (in particular, cyclic quotient singularities) as well as the mapping class groups of Riemann surfaces (complex curves) via monodromies. Important applications, such as the classification of atomic degenerations, are also explained UR - http://dx.doi.org/10.1007/978-3-540-33364-7 ER -