Upper bound for the number of eigenvalues for nonlinear operators
Time-space duality and Salam-Weinberg model
The Penrose transform and Clifford analysis
[For the entire collection see Zbl 0742.00067.]The Penrose transform is always based on a diagram of homogeneous spaces. Here the case corresponding to the orthogonal group is studied by means of Clifford analysis [see and : Clifford analysis (1982; Zbl 0529.30001)], and is presented a simple approach using the Dolbeault realization of the corresponding cohomology groups and a simple calculus with differential forms (the Cauchy integral formula for solutions of the Laplace equation and the Leray...
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Integral formulae for spinor fields
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Towards the subquantum theory
The Penrose transform for Dirac equation
The Penrose transform is discussed for the Dirac equation corresponding to an orthogonal group in even dimensions. The authors outline a simple approach to the calculation which involves using the Dolbeault realization of cohomology groups rather than hypercohomology and spectral sequence. The details will be given elsewhere.
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Feynman path integral as spectral decomposition
Invariant operations on manifolds with almost Hermitian symmetric structures. II: Normal Cartan connections.
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