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Krysl, Svatopluk - Mathematical Institute, Charles University in Prague
Classification of p-homomorphisms between higher symplectic spinors
ON A DISTINGUISHED CLASS OF INFINITE DIMENSIONAL REPRESENTATIONS OF sp(2n; C )
A description of p-homomorphisms between harmonic modules in projective contact
On the ellipticity of symplectic twistor complexes Svatopluk Krysl
Decomposition of a tensor product of a higher symplectic spinor module and the defining
Doctoral dissertation thesis Invariant di#erential operators for
SYMPLECTIC SPINOR VALUED FORMS AND INVARIANT OPERATORS ACTING BETWEEN THEM
Relation of the spectra of symplectic RaritaSchwinger and Dirac operators on flat
Symplectic Killing spinors Svatopluk Krysl
Classification of 1st order symplectic spinor
Structure of the curvature tensor on symplectic spinors
Complex of twistor operators in symplectic spin Svatopluk Krysl
This is page 1 Printer: Opaque this
Howe type duality for metaplectic group acting on symplectic spinor valued forms
First order operators in projective contact geometry -a classification
Symplectic Killing spinors Svatopluk Krsl
Howe duality for the metaplectic group acting on symplectic spinor valued forms
Ellipticity of the symplectic twistor complex Svatopluk Krsl
