2. The System of Equations of Interacting Electromagnetic, Scalar Gravitational and Spinor Fields Anatoliy N. SERDYUKOV Francisk Skorina Gomel State University Gomel, Byelorussia

3. The Classical Particle in the Electromagnetic and Scalar Gravitational Fields (Comparative analysis)

4. The Classical Particle in the Electromagnetic and Scalar Gravitational Fields (Comparative analysis)

5. The Classical Particle in the Electromagnetic and Scalar Gravitational Fields (Comparative analysis)

6. The Classical Particle in the Electromagnetic and Scalar Gravitational Fields (Comparative analysis)

7. The Classical Particle in the Electromagnetic and Scalar Gravitational Fields (Comparative analysis)

8. The Gauge-Invariance of Gravitational Field Here  is an arbitrary real constant

9. The Closed Classical Systems: Particles and Fields

10. (Comparative analysis)

11. The Closed Classical Systems: Particles and Fields (Comparative analysis)

12. The Closed Classical Systems: Particles and Fields (Comparative analysis)

13. The Closed Classical Systems: Particles and Fields (Comparative analysis)

14. The Closed Classical Systems: Particles and Fields (Comparative analysis)

15. The Closed Classical Systems: Particles and Fields (Comparative analysis)

16. The Closed Classical Systems: Particles and Fields (Comparative analysis)

17. The Closed Classical Systems: Particles and Fields (Comparative analysis)

18. Three-dimensional Form of Equations (Comparative analysis)

19. Three-dimensional Form of Equations (Comparative analysis)

20. Three-dimensional Form of Equations (Comparative analysis)

21. Three-dimensional Form of Equations (Comparative analysis)

22. Newtonian Limit of Relativistic Equations

25. The Energy-Momentum Tensor: Particles and Fields (Comparative analysis)

26. The Energy-Momentum Tensor: Particles and Fields (Comparative analysis)

27. The Energy-Momentum Tensor: Particles and Fields (Comparative analysis)

28. Once more about the Gauge-Invariance of Gravitational Field

29. The System of Gauge-Invariant Equations

30. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields

31. To take into account the presence of gravitation field of system (in the frame of scalar model of gravitation) it is necessary to ensure the next transformation law of complete Lagrangian at gauge transformation  '  =  of gravitation potential.

32. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields

39. The movement equations of classical particles

40. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields The movement equations of classical particles

41. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields The movement equations of classical particles

42. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields The movement equations of classical particles

43. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields The movement equations of classical particles

44. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields The movement equations of classical particles

45. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields The movement equations of classical particles

46. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields The movement equations of classical particles

47. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields The equations of interacting electromagnetic and gravitational fields

48. The Extended System of Charge Particles, Electromagnetic and Gravitational Fields Three-dimensional form of field equations

49. The System of Equations of Interacting Electromagnetic, Scalar Gravitational and Spinor Fields