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Publications in Math-Net.Ru |
Citations |
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2018 |
| 1. |
T. M. Zayats, V. M. Simulik, R. V. Timchik, “On the choice of the wavefunction of the ground state of He for precision calculations of autoionization state parameters above the excited ion formation threshold”, Zhurnal Tekhnicheskoi Fiziki, 88:7 (2018), 970–976   ; Tech. Phys., 63:7 (2018), 940–946 |
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2005 |
| 2. |
I. Yu. Krivsky, R. R. Lompay, V. M. Simulik, “Symmetries of the complex Dirac–Kähler equation”, TMF, 143:1 (2005), 64–82   ; Theoret. and Math. Phys., 143:1 (2005), 541–558  |
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1992 |
| 3. |
I. Yu. Krivsky, V. M. Simulik, “Dirac equation and spin 1 representations, a connection with symmetries of the Maxwell equations”, TMF, 90:3 (1992), 388–406 ; Theoret. and Math. Phys., 90:3 (1992), 265–276 |
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1991 |
| 4. |
V. M. Simulik, “Connection between the symmetry properties of the Dirac and Maxwell equations. Conservation laws”, TMF, 87:1 (1991), 76–85 ; Theoret. and Math. Phys., 87:1 (1991), 386–393 |
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1989 |
| 5. |
I. Yu. Krivsky, V. M. Simulik, “Noether analysis of zilch conservation laws and their generalization for the electromagnetic field.
II. Use of Poincaré-invariant formulation of the principle of least action”, TMF, 80:3 (1989), 340–352 ; Theoret. and Math. Phys., 80:3 (1989), 912–921 |
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| 6. |
I. Yu. Krivsky, V. M. Simulik, “Noether analysis of zilch conservation laws and their generalization for the electromagnetic field. I. Use of different formulations of the principle of least action”, TMF, 80:2 (1989), 274–287 ; Theoret. and Math. Phys., 80:2 (1989), 864–874 |
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