"Jany\u0161ka, Josef" . "477596" . "Hermitian vector fields and special phase functions" . . "36"^^ . "We start by analysing the Lie algebra of Hermitian vector fields of a Hermitian line bundle. Then, we specify the base space of the above bundle by considering a Galilei, or an Einstein spacetime. Namely, in the first case, we consider, a fibred manifold over absolute time equipped with a spacelike Riemannian metric, a spacetime connection (preserving the time fibring and the spacelike metric) and an electromagnetic field. In the second case, we consider a spacetime equipped with a Lorentzian metric and an electromagnetic field. In both cases, we exhibit a natural Lie algebra of special phase functions and show that the Lie algebra of Hermitian vector fields turns out to be naturally isomorphic to the Lie algebra of special phase functions. Eventually, we compare the Galilei and Einstein cases."@en . "Modugno, Marco" . "International Journal of Geometrical Methods in Modern Physics" . . . "0219-8878" . "3" . "RIV/00216224:14310/06:00015741!RIV10-MSM-14310___" . "Hermitian vector fields; quantum bundle; special phase functions; Galilei spacetime; Lorentz spacetime"@en . . "Hermitian vector fields and special phase functions"@en . . . "000238919400004" . . "GB - Spojen\u00E9 kr\u00E1lovstv\u00ED Velk\u00E9 Brit\u00E1nie a Severn\u00EDho Irska" . "[59FCA75692F2]" . . . "P(GA201/05/0523), Z(MSM0021622409)" . . . . "Hermitian vector fields and special phase functions" . . . "Hermitian vector fields and special phase functions"@en . "14310" . "RIV/00216224:14310/06:00015741" . "4" . . . "2"^^ . . "We start by analysing the Lie algebra of Hermitian vector fields of a Hermitian line bundle. Then, we specify the base space of the above bundle by considering a Galilei, or an Einstein spacetime. Namely, in the first case, we consider, a fibred manifold over absolute time equipped with a spacelike Riemannian metric, a spacetime connection (preserving the time fibring and the spacelike metric) and an electromagnetic field. In the second case, we consider a spacetime equipped with a Lorentzian metric and an electromagnetic field. In both cases, we exhibit a natural Lie algebra of special phase functions and show that the Lie algebra of Hermitian vector fields turns out to be naturally isomorphic to the Lie algebra of special phase functions. Eventually, we compare the Galilei and Einstein cases." . "1"^^ . . .