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Index of elliptic operators for diffeomorphisms of manifoldsWe develop an elliptic theory for operators associated with a diffeomorphism of a closed smooth
Noncommutative elliptic theory. ExamplesWe study differential operators with coefficients in noncommutative algebras. As an algebra
ELLIPTIC THEORY FOR A GENERALIZATION OF NONCOMMUTATIVE TORUS which generate noncommutative algebra. Ellipticity conditions for such operators were obtained
On the index of noncommutative elliptic operators over C*-algebrasWe consider noncommutative elliptic operators over C*-algebras, associated with a discrete group
Index of Twisted Elliptic Boundary Value Problems Associated with Isometric Group Actions$$ with boundary and a $$\Gamma$$ -invariant elliptic boundary value problem $$\mathcal{D}$$ on $$M$$ , we consider
Index of Twisted Elliptic Boundary Value Problems Associated with Isometric Group Actions and a $\Gamma$-invariant elliptic boundary value problem $\mathcal{D}$ on $M$, we consider its twisting
Probability structures in subspace lattice approach to foundations of quantum theory© 2015, Springer Science+Business Media New York. Noncommutative measure and probability theory
ON ELLIPTIC COMPLEXES IN RELATIVE ELLIPTIC THEORYWe consider complexes of operators in relative elliptic theory. Here we formulate ellipticity
Некоммутативная геометрия и топология в Московском государственном университетеThe paper outlines the history of the formation of noncommutative geometry at the Faculty
An Atiyah–Bott–Lefschetz Theorem for Relative Elliptic ComplexesAbstract Relative elliptic theory is a theory of elliptic operators for pairs $$(M,X)$$ of closed
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