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Ïóáëèêàöèè â áàçå äàííûõ Math-Net.Ru |
Öèòèðîâàíèÿ |
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2021 |
| 1. |
Ý. Í. Ñàòòîðîâ, Ô. Ý. Ýðìàìàòîâà, “Î ïðîäîëæåíèè ðåøåíèé îáîáùåííîé ñèñòåìû Êîøè–Ðèìàíà â ìíîãîìåðíîé ïðîñòðàíñòâåííîé áåñêîíå÷íîé îáëàñòè”, Èçâ. âóçîâ. Ìàòåì., 2021, № 2, 27–43  ; E. N. Sattorov, F. E. Ermamatova, “On continuation of solutions of generalized Cauchy–Riemann system in an unbounded subdomain of multidimensional space”, Russian Math. (Iz. VUZ), 65:2 (2021), 22–38   |
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| 2. |
Ý. Í. Ñàòòîðîâ, Ô. Ý. Ýðìàìàòîâà, “Î âîññòàíîâëåíèè ðåøåíèé îáîáùåííîé ñèñòåìû Êîøè–Ðèìàíà
â ìíîãîìåðíîé ïðîñòðàíñòâåííîé îáëàñòè ïî èõ çíà÷åíèÿì íà êóñêå
ãðàíèöû ýòîé îáëàñòè”, Ìàòåì. çàìåòêè, 110:3 (2021), 405–423  ; È. N. Sattorov, F. E. Ermamatova, “On the Recovery of Solutions of a Generalized Cauchy–Riemann System in a Multidimensional Spatial Domain from Their Values on a Piece of the Boundary of This Domain”, Math. Notes, 110:3 (2021), 393–408 |
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2019 |
| 3. |
Ý. Í. Ñàòòîðîâ, Ô. Ý. Ýðìàìàòîâà, “Ôîðìóëà Êàðëåìàíà äëÿ ðåøåíèé îáîáùåííîé ñèñòåìû Êîøè–Ðèìàíà â ìíîãîìåðíîé ïðîñòðàíñòâåííîé îáëàñòè”, ÑÌÔÍ, 65:1 (2019), 95–108 |
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