Persons: Emelyanov, Eduard Yur'evich

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Emelyanov, Eduard Yur'evich

Total publications:	66 (65)
in MathSciNet:	63 (62)
in zbMATH:	60 (59)
in Web of Science:	31 (31)
in Scopus:	33 (33)
Cited articles:	43
Citations:	212

Number of views:
This page:	3223
Abstract pages:	4862
Full texts:	1849
References:	613

Head Scientist Researcher

Doctor of physico-mathematical sciences (2004)

Speciality:

01.01.01 (Real analysis, complex analysis, and functional analysis)

E-mail:

Keywords:

vector lattice, positive operator, nonstandard hull.

UDC:

517.95, 517.955.4, 517.98, 517.982, 517.986.7, 517.983.23, 517.987.5

Subject:

functional analysis, operator theory, nonstandard analysis

Main publications:

Emelʹyanov, E. Yu.; Kohler, U.; Räbiger, F.; Wolff, M. P. H., “Stability and almost periodicity of asymptotically dominated semigroups of positive operators”, Proc. Amer. Math. Soc., 129:9 (2001), 2633-2642
Eduard Yu. Emel'yanov, Manfred P. H. Wolff, “Positive operators on Banach spaces ordered by strongly normal cones. Positivity and its applications”, Positivity, 7 (2003), 3-22
Eduard Yu. Emel'yanov, Non-spectral asymptotic analysis of one-parameter operator semigroups., Operator Theory: Advances and Applications, 173, Birkhäuser Verlag, Basel, 2007
Aydın, A.; Emelyanov, E. Yu.; Erkurşun Özcan, N.; Marabeh, M. A. A., “Compact-like operators in lattice-normed spaces”, Indag. Math. (N.S.), 29:2 (2018), 633-656
Aydın, Abdullah; Emelyanov, Eduard; Gorokhova, Svetlana, “Full lattice convergence on Riesz spaces”, Indag. Math. (N.S.), 32:3 (2021), 658-690

https://www.mathnet.ru/eng/person28619

List of publications on Google Scholar

https://zbmath.org/authors/ai:emelyanov.eduard-yurevich

https://mathscinet.ams.org/mathscinet/MRAuthorID/353198

Full list of publications:

scientific publications

		Citations (Crossref Cited-By Service + Math-Net.Ru)

1.	Ş. Alpay, E. Emelyanov, S. Gorokhova, “$o\tau$-continuous, Lebesgue, KB, and Levi operators between vector lattices and topological vector spaces”, Result. Math., 77:3 (2022)	1 ^[x]
2.	S. G. Gorokhova, E. Yu. Emelyanov, “On operators dominated by Kantorovich–Banach operators and Lévy operators in locally solid lattices”, Vladikavkaz. Mat. Zh., 24:3 (2022), 55–61
3.	A. Aydin, E. Emelyanov, S. Gorokhova, “Full lattice convergence on Riesz spaces”, Indag. Math. (N.S.), 32:3 (2021), 658–690	12 ^[x]
4.	Ş. Alpay, E. Emelyanov, S. Gorokhova, “Bibounded uo-convergence and b-property in vector lattices”, Positivity, 25:5 (2021), 1677–1684	1 ^[x]
5.	E. Yu. Emelyanov, M. A. A. Marabeh, “On the Brezis–Lieb Lemma and Its Extensions”, Operator Theory and Differential Equations. Selected papers based on the presentations at the 15th conference on order analysis and related problems of mathematical modeling, Vladikavkaz, Russia, July 15–20, 2019, Trends in Mathematics, eds. Kusraev, Anatoly G., Birkhäuser/Springer, 2021, 25–35	1 ^[x]
6.	E. Yu. Emelyanov, “On the domination problem for Lebesgue, KB, and Levi operators”, Poryadkovyi analiz i smezhnye voprosy matematicheskogo modelirovaniya. Teoriya operatorov i differentsialnye uravneniya. tezisy dokladov XVI Mezhdunarodnoi nauchnoi konferentsii. (Vladikavkaz, 2021), Yuzhnyi matematicheskii institut Vladikavkazskogo nauchnogo tsentra Rossiiskoi akademii nauk i Pravitelstva Respubliki Severnaya Osetiya-Alaniya, Vladikavkaz, 2021, 31–32
7.	E. Yu. Emelyanov, M. A. A. Marabeh, “Internal characterization of Brezis-Lieb spaces”, Positivity, 24:3 (2020), 585–592	2 ^[x]
8.	Y. A. Dabboorasad, E. Emelyanov, M. A. A. Marabeh, “Order convergence is not topological in infinite-dimensional vector lattices”, Uzbek Math. J., 2020, no. 1, 159–166	11 ^[x]
9.	E. Y. Emelyanov, S. G. Gorokhova, S. S. Kutateladze, “Unbounded order convergence and the Gordon theorem”, Vladikavk. matem. zhurn., 21:4 (2019), 56–62	2 ^[x]
10.	A. Ayd{\i}n, E. Emelyanov, N. Erkurşun Özcan, M. A. A. Marabeh, “Unbounded p-convergence in lattice-normed vector lattices”, Siberian Advances in Mathematics, 29 (2019), 164–182	7 ^[x]
11.	A. M. Dabboorasad, E. Yu. Emelyanov, “Unbounded convergence in the convergence vector lattices: a survey”, Vladikavk. matem. zhurn., 20:2 (2018), 49–56	3 ^[x]
12.	A. Aydin, E. Emelyanov, N. Erkurşun Özcan, M. A. A. Marabeh, “Compact-like operators in lattice-normed spaces”, Indag. Math. (N.S.), 29:2 (2018), 633–656	15 ^[x]
13.	Y. A. Dabboorasad, E. Yu. Emelyanov, M. A. A. Marabeh, “um-Topology in multi-normed vector lattices”, Positivity, 22:2 (2018), 653–667	5 ^[x]
14.	E. Emelyanov, N. Erkurşun Özcan, S. Gorokhova, “Komlós properties in Banach lattices”, Acta Mathematica Hungarica, 155:2 (2018), 324–331	5 ^[x]
15.	Y. A. Dabboorasad, E. Emelyanov, M. A. A. Marabeh, “uτ-convergence in locally solid vector lattices”, Positivity, 22:4 (2018), 1065–1080	12 ^[x]
16.	E. Yu. Emelyanov, “Archimedean cones in vector spaces”, Convex Anal., 24:1 (2017), 169–183
17.	E. Emelyanov, H. Gül, “Nonstandard hulls of ordered vector spaces”, Positivity, 20:2 (2016), 413–433	1 ^[x]
18.	E. Yu. Emelyanov, M. A. A. Marabeh, “Two measure-free versions of the Brezis–Lieb lemma.”, Vladikavkaz. Mat. Zh., 18:1 (2016), 21–25	9 ^[x]
19.	E. Yu. Emelyanov, “Arkhimedizatsiya uporyadochennykh vektornykh prostranstv”, Matematicheskii forum (Itogi nauki. Yug Rossii), 10:1 (2016), 13–21
20.	A. E. Gutman, E. Yu. Emelyanov, A. V. Matyukhin, “Nezamknutye arkhimedovy konusy v lokalno vypuklykh prostranstvakh”, Vladikavk. matem. zhurn., 17:3 (2015), 36–43	3 ^[x]
21.	E. Yu. Emelyanov, “Beskonechno malye v poluuporyadochennykh prostranstvakh”, Matematicheskii forum (Itogi nauki. Yug Rossii), 8:1 (2014), 43–56
22.	E. Yu. Emel'yanov, “Infinitesimals in ordered vector spaces”, Vladikavkaz. Mat. Zh., 15:1 (2013), 18–22	3 ^[x]
23.	E. Emelyanov, N. Erkurşun Özcan, “Asymptotically absorbing nets of positive operators”, Siberian Advances in Mathematics, 22:4 (2012), 243–260	1 ^[x]
24.	E. Yu. Emelyanov, “On quasi-compactness of operator nets on Banach spaces”, Stud. Math., 2011, no. 2, 163–170	2 ^[x]
25.	E. Yu. Emelyanov, “Asymptotically finite dimensional operators in Banach spaces. Recent developments and open problems”, Matematicheskii forum (Itogi nauki. Yug Rossii), 5 (2011), 57–62
26.	E. Yu. Emel'yanov, “Asymptotic behavior of Lotz–Räbiger and martingale nets”, Siberian Math. J., 51:5 (2010), 810–817
27.	E. Yu. Emelyanov, R. Zaharopol, “Convergence of Lotz-Räbiger nets of operators on spaces of continuous functions”, Rev. Roum. Math. Pures Appl., 55:1 (2010), 1–26
28.	E. Emelyanov, N. Erkurşun Özcan, “Lotz-Räbiger’s nets of Markov operators in $L^1$-spaces”, J. Math. Anal. Appl., 371:2 (2010), 777–783 $https://gateway.webofknowledge.com/gateway/Gateway.cgi?GWVersion=2&SrcApp=Publons&SrcAuth=Publons_CEL&DestLinkType=FullRecord&DestApp=WOS_CPL&KeyUT={https://www.webofscience.com/wos/woscc/full-record/WOS:000280566900037$	5 ^[x]
29.	E. Emelyanov, N. Erkurşun Özcan, “An extension of Sine’s counterexample”, Positivity, 13:1 (2009), 125–127	1 ^[x]
30.	E. Yu. Emel'yanov, N. Erkursun, “Generalization of Eberlein's and Sine's ergodic theorems to $LR$-nets”, Vladikavkaz. Mat. Zh. Journal Profile, 9:3 (2007), 22–26	14 ^[x]
31.	E. Yu. Emelyanov, Non-spectral asymptotic analysis of one-parameter operator semigroups, Operator Theory: Advances and Applications, 173, Birkhäuser, Basel, 2007 , viii, 174 pp.
32.	Ş. Alpay, A. Binhadjah, E. Yu, Emelyanov, Z. Ercan, “Mean ergodicity of positive operators in KB-spaces”, J. Math. Anal. Appl., 323:1 (2006), 371–378 $https://gateway.webofknowledge.com/gateway/Gateway.cgi?GWVersion=2&SrcApp=Publons&SrcAuth=Publons_CEL&DestLinkType=FullRecord&DestApp=WOS_CPL&KeyUT={https://www.webofscience.com/wos/woscc/full-record/WOS:000240566000027$	4 ^[x]
33.	E. Yu. Emelyanov, “Positive asymptotically regular operators in L1-spaces and KB-spaces”, Proceedings of the conference “Positivity IV—Theory and Applications” (Dresden, Germany, July 25–29, 2005), ISBN 3-86005-512-7/pbk, eds. Weber, Martin R., TU Dresden, Institut für Analysis, Dresden, 2006, 53–61
34.	Ş. Alpay, E. Yu, Emelyanov, A. Binhadjah, “A positive doubly power bounded operator with a nonpositive inverse exists on any infinite-dimensional AL-space”, Positivity, 10:1 (2006), 105–110
35.	E. Yu. Emelyanov, M. P. H. Wolff, “Asymptotic behavior of Markov semigroups on preduals of von Neumann algebras”, J. Math. Anal. Appl., 314:2 (2006), 749–763	7 ^[x]
36.	E. Yu. Emel'yanov, “Some open questions on positive operators in Banach lattices”, Vladikavkaz. Mat. Zh., 7:4 (2005), 17–21
37.	E. Yu. Emel'yanov, “Regularity Conditions for Markov Semigroups on Abstract $L^1$-Spaces”, Siberian Adv. Math., 14:4 (2004), 1–29
38.	E. Yu. Emelyanov, “A remark to a theorem of Yu. A. Abramovich”, Proc. Am. Math. Soc., 132:3 (2004), 781–782	1 ^[x]
39.	E. Yu. Emelyanov, Z. Ercan, “A formula for the joint local spectral radius”, Proc. Am. Math. Soc., 132:5 (2004), 1449–1451
40.	Ş. Alpay, E. Yu, Emelyanov, Z. Ercan, “A characterization of an order ideal in Riesz spaces”, Proc. Am. Math. Soc., 132:12 (2004), 3627–3628	1 ^[x]
41.	E. Yu. Emelyanov, M. P. H. Wolff, “Mean lower bounds for Markov operators”, Ann. Pol. Math., 83:1 (2004), 11–19	7 ^[x]
42.	È. Yu. Emel'yanov, “Some conditions for a $C_0$-semigroup to be asymptotically finite-dimensional”, Siberian Math. J., 44:5 (2003), 793–796
43.	E. Yu. Emelyanov, M. P. H. Wolff, “Positive operators on Banach spaces ordered by strongly normal cones”, Positivity, 7:1–2 (2003), 3–22	18 ^[x]
44.	E. Yu. Emelyanov, M. P. H. Wolff, “Asymptotic behaviour of Markov semigroups on non commutative $L^1$-spaces”, Quantum probability and infinite-dimensional analysis. Proceedings of the conference (Burg, (Spreewald) Germany, March 15–20, 2001), Quantum Probab. White Noise Anal., 15, eds. W. Freudenberg, World Scientific (ISBN 981-238-288-7/hbk), River Edge, NJ, 2003, 77–83
45.	E. Yu. Emelyanov, “Invariant densities and mean ergodicity of Markov operators”, Isr. J. Math., 136 (2003), 373–379	3 ^[x]
46.	E. Yu. Emelyanov, M. P. H. Wolff, “Quasi constricted linear representations of abelian semigroups on Banach spaces”, Math. Nachr., 2002, no. 233–234, 103–110 $https://gateway.webofknowledge.com/gateway/Gateway.cgi?GWVersion=2&SrcApp=Publons&SrcAuth=Publons_CEL&DestLinkType=FullRecord&DestApp=WOS_CPL&KeyUT={https://www.webofscience.com/wos/woscc/full-record/WOS:000173683100007$
47.	E. Yu. Emelyanov, U. Kohler, F. Räbiger, M. P. H. Wolff, “Stability and almost periodicity of asymptotically dominated semigroups of positive operators”, Proc. Am. Math. Soc., 129:9 (2001), 2633–2642	8 ^[x]
48.	E. Yu. Emelyanov, M. P. H. Wolff, “Quasi-constricted linear operators on Banach spaces”, Stud. Math., 144:2 (2001), 169–179	8 ^[x]
49.	E. Yu. Emelyanov, F. Räbiger, M. P. H. Wolff, “Asymptotic behavior of positive operators on Banach lattices”, Positivity, 4:3 (2000), 245–251	1 ^[x]
50.	E. Yu. Emelyanov, “Infinitesimals in vector lattices”: A. E. Gutman, E. Yu. Emel’yanov, A. G. Kusraev, G. A. Losenkov, A. V. Koptev, S. A. Malyugin,, Nonstandard analysis and vector lattices, Updated translation of the Russian original, Math. Appl., 525, eds. S. S. Kutateladze, Kluwer Acad. Publ., Dordrecht, 2000, 161–230
51.	S. G. Gorokhova, È. Yu. Emel'yanov, “A Sufficient Condition for Order Boundedness of an Attractor for a Positive Mean Ergodic Operator in a Banach Lattice”, Siberian Adv. Math., 9:3 (1999), 78–85
52.	E. Yu. Emelyanov, M. P. H. Wolff, “Mean ergodicity on Banach lattices and Banach spaces”, Arch. Math., 72:3 (1999), 214–218	6 ^[x]
53.	A. E. Gutman, E. Yu. Emelyanov, A. G. Kusraev, S. S. Kutateladze, Nestandartnyi analiz i vektornye reshetki, Izdatelstvo Instituta matematiki SO RAN, Novosibirsk, 1999 , x, 379 pp.
54.	È. Yu. Emel'yanov, “Invariant homomorphisms of nonstandard extensions of Boolean algebras and vector lattices”, Siberian Math. J., 38:2 (1997), 244–252
55.	E. Yu. Emelyanov, “Banach lattices on which every power-bounded operator is mean ergodic”, Positivity, 1:4 (1997), 291–295	1 ^[x]
56.	E. Yu. Emelyanov, “Invariant homomorphisms of nonstandard enlargements of Boolean algebras and vector lattices”, Siberian conference on applied and industrial mathematics dedicated to the memory of L. V. Kantorovich. Vol. 1. Novosibirsk (Russia), July 25–29, 1994, eds. Bokut’, L. A. (ed.) et al., Izdatel’stvo Instituta Matematiki SO RAN, Novosibirsk, 1997, 117–125
57.	E. Yu. Emelyanov, “Some aspects of the theory of bounded groups of operators in Banach spaces”, Siberian Adv. Math., 7:1 (1997), 26–31
58.	E. Yu. Emelyanov, “Infinitesimal analysis and vector lattices”, Sib. Adv. Math., 6:1 (1996), 19–70
59.	È. Yu. Emel'yanov, “An infinitesimal approach to the representation of vector lattices by spaces of continuous functions on a compactum”, Dokl. Akad. Nauk, 344:1 (1995), 9–11
60.	E. Yu. Emelyanov, “Order hulls of vector lattices”, Dokl. Math., 51:1 (1995), 54–55
61.	È. Yu. Emel'yanov, “Banach–Kantorovich spaces associated with the order hulls of decomposable lattice-normed spaces”, Siberian Math. J., 36:1 (1995), 66–77
62.	È. Yu. Emel'yanov, “The order and regular hulls of Riesz spaces”, Siberian Math. J., 35:6 (1994), 1101–1108
63.	S. G. Gorokhova, È. Yu. Emel'yanov, “On the notion of stability of order convergence in vector lattices”, Siberian Math. J., 35:5 (1994), 912–916
64.	È. Yu. Emel'yanov, “Nonstandard hulls of vector lattices”, Siberian Math. J., 35:1 (1994), 77–87
65.	E. Yu. Emelyanov, “Ob obraze vektornykh mer Leba”, Optimizatsiya, 52:69 (1993), 59–73
66.	E. Yu. Emelyanov, “Erratum to: “Iinfinitesimals in ordered vector spaces””, Vladikavkaz. Mat. Zh., 15:2 (2013), 82–83	1 ^[x]

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