Commutation properties of anticommuting self-adjoint operators, spin representation and Dirac operators

In this contribution we investigate oscillation and spectral properties of self-adjoint differential operators of the form r~ M(y ## ' + L~o~(I). where t C I := [a, co), r~ > 0 and r0 .... ,m-l, 77 Oscillation and nonoscillation of (1.1) are defined using the concept of conjugate points. Two

The representations of \(\operatorname{Spin}(4,2)\), seem to be of particular physical interest since its quotient \(S O(4,2)\), is the conformal group of the spacetime. Kostant [7] has considered the Laplacian on a projective cone in \(R^{8}\) and has shown that the kernel \(H\) of the Laplacian is

Oscillation and spectral properties of the one-term differential operator of the form are investigated. It is shown that certain recently established necessary conditions for discreteness a boundedness below of the spectrum of 1 are also sufficient for this property. Some related problems are also i