|
|
2024 ã. Àâòîðû: Ðû÷êîâà Ñ.È., Ëàâåð À.Á., Å.Â. Ãëåáîâà, Í.È. ÊóðûøåâàÂûðàæåííîñòü ñòåðåîêèíåòè÷åñêîãî ýôôåêòà ó ïàöèåíòîâ ñ âðîæäåííîé ÷àñòè÷íîé àòðîôèåé çðèòåëüíîãî íåðâà è îïåðèðîâàííûìè îïóõîëÿìè ãîëîâíîãî ìîçãà. Íåâñêèå ãîðèçîíòû 2024 (ýëåêòðîííûé ïîñòåð) Çàãðóçèòü (261.4 KB) |
|
2024 ã. Àâòîðû: Ëàâåð À.Á., Ðû÷êîâà Ñ.È., Í.È. ÊóðûøåâàÏîêàçàòåëè çðèòåëüíîé ïàìÿòè ó øêîëüíèêîâ ñ âðîæäåííîé ÷àñòè÷íîé àòðîôèåé çðèòåëüíîãî íåðâà. Íåâñêèå ãîðèçîíòû 2024 (ýëåêòðîííûé ïîñòåð) Çàãðóçèòü (111.4 KB) |
|
2024 ã. Àâòîðû: Ñåëèâåðñòîâ À.Â., Çâåðêî́â Î.À.Lower bounds for the rank of a matrix with zeros and ones outside the leading diagonal. Programming and Computer Software. 2024. V. 50. No. 2. P. 202-207.
|
|
2024 ã. Àâòîðû: Âüþãèí È.Â., Äóäíèêîâà Ë.À.Ñòàáèëüíûå ðàññëîåíèÿ è ïðîáëåìà Ðèìàíà–Ãèëüáåðòà íà ðèìàíîâîé ïîâåðõíîñòè // Ìàòåìàòè÷åñêèé ñáîðíèê. 2024. Ò. 215. ¹ 2. Ñ. 3-20. Ïåðåéòè ê ïóáëèêàöèè Çàãðóçèòü (635.2 KB) |
|
2024 ã. Àâòîðû: Davydov A., Marcugini S., Pambianco F.Further results on covering codes with radius R and codimension tR+1, Designs, Codes and Cryptography. (2024). 22 pages, doi :10.1007/s10623-024-01402-0
Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Ëàâåð À.Á., Ðû÷êîâà Ñ.È., Êóðûøåâà Í.È.Ñòðóêòóðà îôòàëüìîïàòîëîãèè â ïåðèîäå ðåìèññèè ó ïàöèåíòîâ ñ îïåðèðîâàííûìè îïóõîëÿìè ãîëîâíîãî ìîçãà. XXIII íàó÷íî-ïðàêòè÷åñêàÿ íåéðîîôòàëüìîëîãè÷åñêàÿ êîíôåðåíöèÿ, ñáîðíèê ñòàòåé ïî ìàòåðèàëàì XXIII íàó÷íî-ïðàêòè÷åñêîé íåéðîîôòàëüìîëîãè÷åñêîé êîíôåðåíöèè 2024 (26 ÿíâàðÿ 2024ã., Ìîñêâà). – Ñ. 80-82
|
|
2024 ã. Àâòîðû: Ëèõâàíöåâà Â.Ã., Êàïêîâà Ñ.Ã., Ðû÷êîâà Ñ.È., Íàóìîâà Â.È.Ôàêòîðû ðèñêà ïðîãðåññèðîâàíèÿ íåîâàñêóëÿðíîé âîçðàñòíîé ìàêóëÿðíîé äåãåíåðàöèè ïîñëå õèðóðãèè êàòàðàêòû. Îôòàëüìîëîãèÿ. 2024;21(1):23–34. https://doi.org/10.18008/18165095202412334 Çàãðóçèòü (1.1 MB) |
|
2024 ã. Àâòîðû: Ëèõâàíöåâà Â.Ã., Ãåâîðêÿí À.Ñ., Êàïêîâà Ñ.Ã., Ðû÷êîâà Ñ.È., Áîðèñåíêî Ò.Å.Îæèðåíèå êàê ôàêòîð ðèñêà íåýôôåêòèâíîñòè àíòèàíãèîãåííîãî ëå÷åíèÿ íåîâàñêóëÿðíîé âîçðàñòíîé ìàêóëÿðíîé äåãåíåðàöèè. Îôòàëüìîëîãèÿ.2024;21(1):128–137. https://doi.org/ 10.18008/1816509520241128137 Çàãðóçèòü (1 MB) |
|
2024 ã. Àâòîðû: Ëèõâàíöåâà Â.Ã., Ãåâîðêÿí F.C., Êàïêîâà Ñ.Ã., Ðû÷êîâà Ñ.È., Áîðèñåíêî Ò.Å.Ñèñòåìíàÿ àðòåðèàëüíàÿ ãèïåðòåíçèÿ è îôòàëüìîãèïåðòåíçèÿ êàê íåçàâèñèìûå ôàêòîðû ðèñêà ïëîõîãî îòâåòà íà àíòèàíãèîãåííóþ òåðàïèþ ïðåïàðàòàìè 1é ëèíèè ïðè íåîâàñêóëÿðíîé âîçðàñòíîé ìàêóëÿðíîé äåãåíåðàöèè. Îôòàëüìîëîãèÿ. 2024;21(1):117–127. https://doi.org/10.18008/1816509520241117127 Çàãðóçèòü (1.2 MB) |
|
2024 ã. Àâòîðû: Ðû÷êîâà Ñ.È., Ëèõâàíöåâà Â.Ã., Ñàíäèìèðîâ Ð.È.Ðåçóëüòàòû êîëè÷åñòâåííîé è êà÷åñòâåííîé îöåíêè öâåòîâîãî çðåíèÿ ó ïàöèåíòîâ ñ âðîæäåííîé ÷àñòè÷íîé àòðîôèåé çðèòåëüíîãî íåðâà. Îôòàëüìîëîãèÿ. 2024;21(1):152–161.
https://doi.org/10.18008/1816509520241152161 Çàãðóçèòü (1.2 MB) |
|
2024 ã. Àâòîðû: Ðû÷êîâà Ñ.È., Àáóãîâà Ò.Ä., Ëèõâàíöåâà Â.Ã., Ñàíäèìèðîâ Ð.È.Âëèÿíèå öâåòîâîãî ôîíà íà çðèòåëüíîå âîñïðèÿòèå òåêñòà ó äåòåé ñ îôòàëüìîïàòîëîãèåé. The EYE ÃËÀÇ. 2024. Ò. 26, ¹ 1. Ñ. 12–25 Çàãðóçèòü (1.1 MB) |
|
2024 ã. Àâòîðû: Veretennikov A.Alexander Veretennikov, On Higher Order Moments and Rates of Convergence for SDEs with Switching,
Moscow Math. J., 2024, Issue 1, pp. 107–124, http://www.mathjournals.org/mmj/2024-024-001/2024-024-001-006.html; the preprint at arXiv:2212.13921
Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Êàíîâåé Â.Ã., Ëþáåöêèé Â.À.Íåçàâèñèìîñòü ñõåìû ñâåðòêè â àðèôìåòèêå âòîðîãî ïîðÿäêà îò ñ÷åòíîãî âûáîðà áåç ïàðàìåòðîâ. Ìàòåìàòè÷åñêèå çàìåòêè, 2024 (WoS Q3, SCIMAGO Q2), íà ðåöåíçèðîâàíèè.
|
|
2024 ã. Àâòîðû: Gorbunov K., Lyubetsky V.Algorithms for the reconstruction of genomic structures with proofs of their low polynomial complexity and high exactness.
Mathematics, March 11 2024, Vol. 12, No. 6, Art. 817.
DOI: 10.3390/math12060817
(WoS Q1) Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Kanovei V., Lyubetsky V.Jensen Reals by Means of Second-Order Peano Arithmetic.
Axioms, 2024, 13(2), Article no 96.
DOI: 10.3390/axioms13020096 (WoS Q2) Ïåðåéòè ê ïóáëèêàöèè Çàãðóçèòü (248.3 KB) |
|
2024 ã. Àâòîðû: Ïîñèöåëüñêèé Ë.Å., Øòîâè÷åê ß.Contraderived categories of CDG-modules. Ýëåêòðîííûé ïðåïðèíò arXiv:2401.07021 [math.RA], 66 ñòð. Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Ïîñèöåëüñêèé Ë.Å.The categories of corings and coalgebras over a ring are locally countably presentable. Ýëåêòðîííûé ïðåïðèíò arXiv:2401.02928 [math.RA], 21 ñòð.
Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Ïîñèöåëüñêèé Ë.Å.Philosophy of contraherent cosheaves. Ýëåêòðîííûé ïðåïðèíò arXiv:2311.14179 [math.AG], 65 ñòð. Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Ïîñèöåëüñêèé Ë.Å.Locally coherent exact categories. Ýëåêòðîííûé ïðåïðèíò arXiv:2311.02418 [math.CT], 33 ñòð. Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Ãðà÷åâà Ì.À., Ìàíüêî Î.Ì.Èññëåäîâàíèå âëèÿíèÿ ýêñïåðèìåíòà “ñóõàÿ” èììåðñèÿ íà îïòè÷åñêèé àïïàðàò ãëàçà. Ôèçèîëîãèÿ ÷åëîâåêà.  ïå÷àòè.
|
|
2024 ã. Àâòîðû: Gracheva M., Manko O.M.“Investigation of the effect of "Dry" immersion experiment on the optical apparatus of the eye,” Hum Physiol, to be published.
|
|
2024 ã. Àâòîðû: Kanovei V., Lyubetsky V.A good lightface Δ^1_n well-ordering of the reals does not imply the existence of boldface Δ^1_{n−1} well-orderings.
Annals of Pure and Applied Logic,
2024, 175, 6, pp.\ 1-38. DOI 10.1016/j.apal.2024.103426
(WoS Q2) Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Ïîñèöåëüñêèé Ë.Å.A bounded below, noncontractible, acyclic complex of projective modules. Acta Math. Hungarica, ñòàòüÿ îïóáëèêîâàíà ýëåêòðîííî íà ñàéòå æóðíàëà â ìàðòå 2024 ãîäà, DOI:10.1007/s10474-024-01414-1, 22 ñòð. Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Kanovei V., Lyubetsky V.Parameterfree Comprehension does not imply full Comprehension in second order Peano arithmetic.
Studia Logica,
2024, DOI: 10.1007/s11225-024-10108-2
(WoS Q2) Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Ïîñèöåëüñêèé Ë.Å.Generalized periodicity theorems. Ýëåêòðîííûé ïðåïðèíò arXiv:2301.00708 [math.RA], 38 ñòð. Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Ïîñèöåëüñêèé Ë.Å.Local, colocal, and antilocal properties of modules and complexes over commutative rings. Journ. of Algebra 646 (2024), ñòð.100-155. Ïåðåéòè ê ïóáëèêàöèè |
|
2024 ã. Àâòîðû: Ïîñèöåëüñêèé Ë.Å., Øòîâè÷åê ß.Topologically semiperfect topological rings. Algebras and Represent. Theory 27 (2024), ¹1, ñòð.245-278. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Âüþãèí È.Â.Orders of Zeros of Polynomials in Solutions to the Fuchsian Differential Equation / Ïåð. ñ ðóñ. // Journal of Mathematical Sciences. 2023. Vol. 270. P. 665-673. doi Ïåðåéòè ê ïóáëèêàöèè Çàãðóçèòü (140.7 KB) |
|
2023 ã. Àâòîðû: Âüþãèí È.Â., Àë¸øèíà Ñ.À.Î ïîëèíîìèàëüíîì âàðèàíòå çàäà÷è ñóìì-ïðîèçâåäåíèé äëÿ ïîäãðóïï / Ïåð. ñ àíãë. // Ìàòåìàòè÷åñêèå çàìåòêè. 2023. Ò. 113. ¹ 1. Ñ. 3-10. Ïåðåéòè ê ïóáëèêàöèè Çàãðóçèòü (468 KB) |
|
2023 ã. Àâòîðû: Áåêìàãàìáåòîâ Ê.À., ×å÷êèí Ã.À., ×åïûæîâ Â.Â., Òîëåìèñ À.À.Homogenization of Attractors to Ginzburg-Landau Equations in Media with Locally Periodic Obstacles: Critical Case, Bulletin of the Karaganda University, Mathematics series. V.111, No.3. 2023. P.11-27. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Áåêìàãàìáåòîâ Ê.À., Òîëåìèñ À.À., ×åïûæîâ Â.Â., ×å÷êèí Ã.À.Îá àòòðàêòîðàõ óðàâíåíèé Ãèíçáóðãà-Ëàíäàó â îáëàñòè ñ ëîêàëüíî-ïåðèîäè÷åñêîé ìèêðîñòðóêòóðîé. Ñóáêðèòè÷åñêèé, êðèòè÷åñêèé è ñóïåðêðèòè÷åñêèé ñëó÷àè. Äîêëàäû Ðîññèéñêîé Àêàäåìèè Íàóê. Ìàòåìàòèêà, èíôîðìàòèêà, ïðîöåññû óïðàâëåíèÿ. Ò.513. 2023. N.1. Ñ.9-14. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Ðû÷êîâà Ñ.È., Ëèõâàíöåâà Â.Ã., Ñàíäèìèðîâ Ð.È.Ðåçóëüòàòû èññëåäîâàíèÿ öâåòîâîãî çðåíèÿ ðàçíûìè ñïîñîáàìè ó äåòåé ñ àìáëèîïèåé. Ðîññèéñêàÿ äåòñêàÿ îôòàëüìîëîãèÿ. 2023;3: 15–26. DOI: https://doi.org/10.25276/2307-6658-2023-3-15-26 Çàãðóçèòü (887.8 KB) |
|
2023 ã. Àâòîðû: Ñåâàñòüÿíîâ Í.Ñ., Íåðåòèíà Ò.Â., Âåäåíèíà Â.Þ.Evolution of calling songs in the grasshopper subfamily Gomphocerinae (Orthoptera, Acrididae). Zoologica Scripta, 52: 154–175. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Veretennikov A.A.A. Shchegolev, A.Yu. Veretennikov, On Convergence Rate Bounds for a Class of Nonlinear Markov Chains, Markov processes and related fields, 2023, v.29, Issue 5, 619-639. doi:10.61102/1024-2953-mprf.2023.29.5.001; the preprint at arXiv:2209.12834 Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: ×î÷èà Ï.À.P.A.Chochia Image Analysis and Processing Theory, Methods, and Algorithms. Review of Research at the Iconics Laboratory of the Institute for Information Transmission Problems of the Russian Academy of Sciences // Pattern Recognition and Image Analysis, 2023, vol.33, no.4, pp.1168–1241. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: ×î÷èà Ï.À.Chochia P.A. Image Restoration and Enhancement Using Blind Estimation of Amplitude Distortion // Journal of Communications Technology and Electronics, 2023, vol. 68, suppl. 2, pp. S263–S273. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Puhalskii A. Large deviation limits of invariant measures, Stochastics and Dynamics, v.23, No. 7 (2023) 2350052 (28 pages) (available upon request) Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Ñòåïàíÿí Ê.Â., Ïîïîâ À.Ê., Ìèëëåð À.Á., Ìèëëåð Á.Ì.Îïòè÷åñêèé ïîòîê â çàäà÷àõ íàâèãàöèè è óïðàâëåíèÿ áåñïèëîòíûìè àâòîíîìíûìè ñðåäñòâàìè // Èíôîðìàöèîííûå ïðîöåññû. Òîì 23, ¹4, 2023, C.526-544 Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Ñòåïàíîâà Å.À., Áàíêîâ Ä.Â., Ëÿõîâ À.È., Õîðîâ Å.Ì.Áàíêîâ Ä. Â. è äð. Ìàòåìàòè÷åñêèå ìîäåëè ñîâðåìåííûõ ìåõàíèçìîâ ýíåðãîñáåðåæåíèÿ â ñåòÿõ Wi-Fi //Èíôîðìàöèîííûå ïðîöåññû. – 2023. – Ò. 23. – ¹. 2.1. – Ñ. 313-334. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Ïàðîøèí Â.Ä., Ëîãèíîâ Â.À., Ëåâèöêèé È.À., Õîðîâ Å.Ì.Â.Ä. Ïàðîøèí, È.À. Ëåâèöêèé, Â.À. Ëîãèíîâ, Å.Ì. Õîðîâ. Äóáëèðîâàíèå ïàêåòîâ äëÿ ïîâûøåíèÿ ïðîïóñêíîé ñïîñîáíîñòè ìíîãîêàíàëüíûõ óñòðîéñòâ â ñåòÿõ Wi-Fi 7 // Èíôîðìàöèîííûå ïðîöåññû. – 2023. – Ò. 23. – ¹. 4. – Ñ. 624-629. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Shilovsky G., Seliverstov A., Zverkóv O.Demographic indicators, models, and testing. Discrete and Continuous Models and Applied Computational Science. 2023. V. 31. No. 4. P. 359–374. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Âüþãèí Â.Â., Òðóíîâ Â.Ã.Ïðîãíîçèðîâàíèå ëîêàëüíî ñòàöèîíàðíûõ äàííûõ ñ èñïîëüçîâàíèåì ïðåäñêàçàíèé ýêñïåðòíûõ ñòðàòåãèé.
Èíôîðìàöèîííûå ïðîöåññû, Òîì 23, ¹ 4, 2023, ñòð. 470–487 Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Êàëèìóëèíà Ý.Þ.Elmira Yu. Kalimulina. Finiteness of One-Valued Function Classes in Many-Valued Logic. Fractal and Fractional, 2023. https://doi.org/10.3390/fractalfract8010029
[Scopus Q1; WoS Q1, JCI 2022 = 1.51] Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Êîçÿêèí Â.Ñ.Êîíâåðòåð áèáëèîãðàôèè èç ôîðìàòà BibTEX â ôîðìàò AMSBIB. Èíôîðìàöèîííûå ïðîöåññû. 2023. Ò. 23, ¹ 4. Ñ. 455–469 Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Ëåâèí Ì.Ø.Î çàäà÷å êëàñòåðèçàöèè ñ îïòèìèçàöèåé ñâÿçåé ýëåìåíòîâ êëàñòåðîâ. Èíôîðìàöèîííûå ïðîöåññû, 23(4), 513-525, 2023. DOI: 10.53921/18195822_2023_23_4_513 Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Áåêìàãàìáåòîâ Ê.À., ×å÷êèí Ã.À., ×åïûæîâ Â.Â.Application of Fatou’s Lemma for Strong Homogenization of Attractors to Reaction–Diffusion Systems with Rapidly Oscillating Coefficients in Orthotropic Media with Periodic Obstacles. Mathematics 2023, 11, 1448. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Ïîñèöåëüñêèé Ë.Å.Resolutions as directed colimits. Ýëåêòðîííûé ïðåïðèíò arXiv:2312.07197 [math.AC], 37 ñòð. Ïåðåéòè ê ïóáëèêàöèè |
|
2023 ã. Àâòîðû: Dragovic V., Gontsov R., Goryuchkina I.From formal to actual Puiseux series solutions of algebraic differential equations of first order, Ann. Sc. Norm. Super. Pisa Cl. Sci. (5), 2023, V. 24(4), P. 2201-2213. Çàãðóçèòü (252.2 KB) |
|
2023 ã. Àâòîðû: Ñåëèâåðñòîâ À.Â.Î äëèíå íåâûïîëíèìîé ïîäôîðìóëû. Ìåæäóíàðîäíàÿ êîíôåðåíöèÿ Ìàëüöåâñêèå ÷òåíèÿ 13-17 íîÿáðÿ 2023 ã. Íîâîñèáèðñê, 2023. Ñ. 132.
Ïåðåéòè ê ïóáëèêàöèè Çàãðóçèòü (1.8 MB) |
|
2023 ã. Àâòîðû: Ïîïîâ À.Ê., Ñòåïàíÿí Ê.Â., Ìèëëåð Á.Ì., Ìèëëåð À.Á.Ìåòîäèêà ñðàâíåíèÿ àëãîðèòìîâ îöåíèâàíèÿ ïîëîæåíèÿ äâèæóùåéñÿ êàìåðû îòíîñèòåëüíî íåïîäâèæíîãî îáúåêòà // Ìàòåðèàëû XXIII Ìåæäóíàðîäíîé êîíôåðåíöèè ïî Âû÷èñëèòåëüíîé ìåõàíèêå è ñîâðåìåííûì ïðèêëàäíûì ïðîãðàììíûì ñèñòåìàì (ÂÌÑÏÏÑ"2023), 4-10 ñåíòÿáðÿ 2023, Äèâíîìîðñêîå, Êðàñíîäàðñêèé êðàé, Ðîññèÿ. Ñ.128-130. (ÐÈÍÖ: https://www.elibrary.ru/item.asp?id=55021482) Ïåðåéòè ê ïóáëèêàöèè |
|