Matches in DBpedia 2016-04 for { ?s ?p "Paul Glendinning is a Professor of Applied Mathematics, in the School of Mathematics at the University of Manchester who is known for his work on dynamical systems, specifically models of the time-evolution of complex mathematical or physical processes. His main areas of research are bifurcation theory (particularly global bifurcations); synchronization and blowout bifurcations; low-dimensional maps; and quasi-periodically forced systems."@en }
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- Paul_Glendinning abstract "Paul Glendinning is a Professor of Applied Mathematics, in the School of Mathematics at the University of Manchester who is known for his work on dynamical systems, specifically models of the time-evolution of complex mathematical or physical processes. His main areas of research are bifurcation theory (particularly global bifurcations); synchronization and blowout bifurcations; low-dimensional maps; and quasi-periodically forced systems.".
- Q7150921 abstract "Paul Glendinning is a Professor of Applied Mathematics, in the School of Mathematics at the University of Manchester who is known for his work on dynamical systems, specifically models of the time-evolution of complex mathematical or physical processes. His main areas of research are bifurcation theory (particularly global bifurcations); synchronization and blowout bifurcations; low-dimensional maps; and quasi-periodically forced systems.".
- Paul_Glendinning comment "Paul Glendinning is a Professor of Applied Mathematics, in the School of Mathematics at the University of Manchester who is known for his work on dynamical systems, specifically models of the time-evolution of complex mathematical or physical processes. His main areas of research are bifurcation theory (particularly global bifurcations); synchronization and blowout bifurcations; low-dimensional maps; and quasi-periodically forced systems.".
- Q7150921 comment "Paul Glendinning is a Professor of Applied Mathematics, in the School of Mathematics at the University of Manchester who is known for his work on dynamical systems, specifically models of the time-evolution of complex mathematical or physical processes. His main areas of research are bifurcation theory (particularly global bifurcations); synchronization and blowout bifurcations; low-dimensional maps; and quasi-periodically forced systems.".