Floor decomposition of tropical planar curves
Abstract
Mikhalkin showed that when counted with appropriate (r-real) multiplicities, the number of tropical curves in (R*)2 of genus g and Newton polygon Δ passing through s generic points in (R*)2 agrees with the corresponding Gromov-Witten (resp. Welschinger) invariants. Brugalle and Mikhalkin show that the enumeration of these tropical curves can be reduced to the enumeration of certain combinatorial objects called floor diagrams. We study these floor diagrams and their applications.
Description
Thesis (M.S.)--American University of Beirut, Department of Mathematics, 2013.
Advisor : Dr. Azar, Monique, Assistant Professor, Mathematics--Committee Members : Dr. Abu Khuzam, Hazar, Professor, Mathematics ; Dr. Egeileh, Michel, Assistant Professor, Mathematics.
Includes bibliographical references (leaf 59)
Advisor : Dr. Azar, Monique, Assistant Professor, Mathematics--Committee Members : Dr. Abu Khuzam, Hazar, Professor, Mathematics ; Dr. Egeileh, Michel, Assistant Professor, Mathematics.
Includes bibliographical references (leaf 59)