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Publications in Math-Net.Ru |
Citations |
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2017 |
| 1. |
D. V. Egorov, “The Riemann–Roch theorem for the Dynnikov–Novikov discrete complex analysis”, Sibirsk. Mat. Zh., 58:1 (2017), 104–106   ; Siberian Math. J., 58:1 (2017), 78–79   |
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2014 |
| 2. |
Dmitry V. Egorov, “On $\mathrm{Spin(7)}$ Monge–Ampère type equations”, Sib. Èlektron. Mat. Izv., 11 (2014), 981–987 |
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2012 |
| 3. |
Dmitry V. Egorov, “Riemannian $\mathrm{Spin}(7)$ holonomy manifold carries octonionic-Kähler structure”, Mosc. Math. J., 12:4 (2012), 765–769  |
| 4. |
D. V. Egorov, “On Morse theory for manifolds with cross products”, Sib. Èlektron. Mat. Izv., 9 (2012), 456–459 |
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2011 |
| 5. |
D. V. Egorov, “QR-Submanifolds and Riemannian Metrics with Holonomy $G_2$”, Mat. Zametki, 90:5 (2011), 781–784 ; Math. Notes, 90:5 (2011), 763–766 |
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| 6. |
D. V. Egorov, “A new equation on the Calabi–Yau metrics in low dimensions”, Sibirsk. Mat. Zh., 52:4 (2011), 823–828 ; Siberian Math. J., 52:4 (2011), 651–654 |
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2009 |
| 7. |
D. V. Egorov, “Theta functions on $T^2$-bundles over $T^2$ with the zero Euler class”, Sibirsk. Mat. Zh., 50:4 (2009), 818–830 ; Siberian Math. J., 50:4 (2009), 647–657 |
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| 8. |
D. V. Egorov, “Theta functions on the Kodaira–Thurston manifold”, Sibirsk. Mat. Zh., 50:2 (2009), 320–328 ; Siberian Math. J., 50:2 (2009), 253–260 |
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