The formal de Rham complex. (English. Russian original) Zbl 1300.55010
Theor. Math. Phys. 174, No. 2, 220-235 (2013); translation from Teor. Mat. Fiz. 174, No. 2, 256-271 (2013).
Summary: We propose a formal construction generalizing the classic de Rham complex to a wide class of models in mathematical physics and analysis. The presentation is divided into a sequence of definitions and elementary, easily verified statements; proofs are therefore given only in the key case. Linear operations are everywhere performed over a fixed number field \(\mathbb F=\mathbb R,\mathbb C\). All linear spaces, algebras, and modules, although not stipulated explicitly, are by definition or by construction endowed with natural locally convex topologies, and their morphisms are continuous.
MSC:
| 55N35 | Other homology theories in algebraic topology |
| 58A12 | de Rham theory in global analysis |
| 58A15 | Exterior differential systems (Cartan theory) |
| 17B55 | Homological methods in Lie (super)algebras |
Keywords:
de Rham complex; multiplicator; derivation; exterior algebra; boundary operator; exterior differential; complex associated with an algebra; gradingReferences:
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