"0009-725X" . . "The natural quantum Lagrangians which appear in Galilei general relativistic quantum mechanics are classified by using methods of natural operators. It is proved that all natural quantum Lagrangians are linear combinations (with real coefficients) of the canonical quantum Lagrangian and the product of the scalar curvature of a spacetime vertical connection and the Hermitian product. The classification of all natural generalized Schroedinger operators is given and it is proved that all natural generalized Schroedinger operators can be induced from natural quantum Lagrangians." . "A remark on natural quantum Lagrangians and natural generalized Schroedinger operators in Galilei quantum mechanics" . . "P(GA201/99/0296), Z(MSM 143100009)" . . "Supplemento ai Rendiconti del Circolo Matematico di Palermo,Serie II" . "66" . "Natural operator, quantum bundle, quantum connection, quantum Lagrangian, Schroedinger operator"@en . . . . . "A remark on natural quantum Lagrangians and natural generalized Schroedinger operators in Galilei quantum mechanics"@en . "14310" . . "0"^^ . "2" . "12"^^ . "1"^^ . "0"^^ . . "1"^^ . "117" . "A remark on natural quantum Lagrangians and natural generalized Schroedinger operators in Galilei quantum mechanics" . "672298" . "Jany\u0161ka, Josef" . . . . . "The natural quantum Lagrangians which appear in Galilei general relativistic quantum mechanics are classified by using methods of natural operators. It is proved that all natural quantum Lagrangians are linear combinations (with real coefficients) of the canonical quantum Lagrangian and the product of the scalar curvature of a spacetime vertical connection and the Hermitian product. The classification of all natural generalized Schroedinger operators is given and it is proved that all natural generalized Schroedinger operators can be induced from natural quantum Lagrangians."@en . . . . "[3DDBD256C469]" . . . "RIV/00216224:14310/01:00004183" . "RIV/00216224:14310/01:00004183!RIV/2002/MSM/143102/N" . "A remark on natural quantum Lagrangians and natural generalized Schroedinger operators in Galilei quantum mechanics"@en . "IT - Italsk\u00E1 republika" . .