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- Q17017346 subject Q6069331.
- Q17017346 subject Q6547869.
- Q17017346 subject Q7211696.
- Q17017346 abstract "In mathematics, global analysis, also called analysis on manifolds, is the study of the global and topological properties of differential equations on manifolds and vector space bundles. Global analysis uses techniques in infinite-dimensional manifold theory and topological spaces of mappings to classify behaviors of differential equations, particularly nonlinear differential equations. These spaces can include singularities and hence catastrophe theory is a part of global analysis. Optimization problems, such as finding geodesics on Riemannian manifolds, can be solved using differential equations so that the calculus of variations overlaps with global analysis. Global analysis finds application in physics in the study of dynamical systems and topological quantum field theory.".
- Q17017346 wikiPageExternalLink globalanalysisshort.pdf.
- Q17017346 wikiPageWikiLink Q11214.
- Q17017346 wikiPageWikiLink Q1345659.
- Q17017346 wikiPageWikiLink Q1648886.
- Q17017346 wikiPageWikiLink Q203920.
- Q17017346 wikiPageWikiLink Q213488.
- Q17017346 wikiPageWikiLink Q216861.
- Q17017346 wikiPageWikiLink Q2296951.
- Q17017346 wikiPageWikiLink Q395.
- Q17017346 wikiPageWikiLink Q413.
- Q17017346 wikiPageWikiLink Q4382845.
- Q17017346 wikiPageWikiLink Q5535474.
- Q17017346 wikiPageWikiLink Q6069331.
- Q17017346 wikiPageWikiLink Q632814.
- Q17017346 wikiPageWikiLink Q638328.
- Q17017346 wikiPageWikiLink Q6543824.
- Q17017346 wikiPageWikiLink Q6547869.
- Q17017346 wikiPageWikiLink Q658429.
- Q17017346 wikiPageWikiLink Q721094.
- Q17017346 wikiPageWikiLink Q7211696.
- Q17017346 wikiPageWikiLink Q755991.
- Q17017346 wikiPageWikiLink Q863349.
- Q17017346 wikiPageWikiLink Q984063.
- Q17017346 comment "In mathematics, global analysis, also called analysis on manifolds, is the study of the global and topological properties of differential equations on manifolds and vector space bundles. Global analysis uses techniques in infinite-dimensional manifold theory and topological spaces of mappings to classify behaviors of differential equations, particularly nonlinear differential equations. These spaces can include singularities and hence catastrophe theory is a part of global analysis.".
- Q17017346 label "Global analysis".