TY - BOOK ID - 133815700 TI - Partial compactification of monopoles and metric asymptotics AU - Kottke, Chris AU - Singer, Michael F. PY - 2022 SN - 9781470455415 PB - Providence, RI : American Mathematical Society, DB - UniCat KW - Vector bundles. KW - Global differential geometry. KW - Global analysis (Mathematics) KW - Quantum field theory. UR - https://www.unicat.be/uniCat?func=search&query=sysid:133815700 AB - "We construct a partial compactification of the moduli space, Mk, of SU(2) magnetic monopoles on R3, wherein monopoles of charge k decompose into widely separated 'monopole clusters' of lower charge going off to infinity at comparable rates. The hyperKahler metric on Mk has a complete asymptotic expansion up to the boundary, the leading term of which generalizes the asymptotic metric discovered by Bielawski, Gibbons and Manton when each lower charge is 1"-- ER -