摘要
Chern-Simons theories exhibit many interesting and important properties.Chern-Simons models acquire dynamics via coupling to other fields, and get multifarious gauge theory, all of which has vortice solutions, these static solutions can be obtained when their Hamiltonian was minimal. R. Jackiw and S-Y. Pi considered a gauged, nonliner Schodinger equation in two spatial dimensions, can describe nonrelativistic matter interacting with Chern-Simons gauge fields. Then they find explicit static, self-dual solutions which satisfies the Liouville equation.
Chern-Simons theories exhibit many interesting and important properties.Chern-Simons models acquire dynamics via coupling to other fields, and get multifarious gauge theory, all of which has vortice solutions, these static solutions can be obtained when their Hamiltonian was minimal. R. Jackiw and S-Y. Pi considered a gauged, nonliner Schodinger equation in two spatial dimensions, can describe nonrelativistic matter interacting with Chern-Simons gauge fields. Then they find explicit static, self-dual solutions which satisfies the Liouville equation.
基金
Supported by Chinese Academy of Sciences Knowledge Innovation Project (KJCX2-SW-No2)National Natural Science Foundation of China(10435080
10575123)
