Persons: Peller, Vladimir Vsevolodovich

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Peller, Vladimir Vsevolodovich

Total publications:	119 (119)
in MathSciNet:	106 (106)
in zbMATH:	91 (91)
in Web of Science:	60 (60)
in Scopus:	47 (47)
Cited articles:	69
Citations:	1192
Presentations:	14

Number of views:
This page:	5569
Abstract pages:	12723
Full texts:	3682
References:	860

Professor

Doctor of physico-mathematical sciences

E-mail:

Keywords:

self-adjoint operators; normal operators; Hankel operators; Toeplitz operators; trace formulae; Schatten - von Neumann classes; operator Lipschitz functions

UDC:

513, 513.8, 513.881, 517.5, 517.53, 517.948, 517.98, 519.28, 517.51

Subject:

operator theory; perturbation theory; Hankel and Toeplitz operators; multiple operator integrals; stationary processes

Main publications:

V.V. Peller, “Operatory Gankelya v teorii vozmuschenii unitarnykh i samosopryazhennykh operatorov”, Funkts. analiz i ego pril., 19:2 (1985), 37–51
V.V. Peller, “Operatory Gankelya klassa S_p i ikh prilozheniya (ratsionalnaya approksimatsiya, gaussovskie protsessy, problema mazhoratsii operatorov”, Matem. sb., 113(155):4 (1980), 538–581
V.V. Peller, Hankel operators and their applications, Springer Monographs in Mathematics, Springer-Verlag, New York, 2003
A.B. Aleksandrov and V.V. Peller, “Operator Hölder–Zygmund functions”, Advances in Math, 224 (2010), 910–966
V.V. Peller, “The Lifshits–Krein trace formula and operator Lipschitz functions”, Proc. Amer. Math. Soc., 144 (2016), 5207–5215

https://www.mathnet.ru/eng/person22838

List of publications on Google Scholar

List of publications on ZentralBlatt

https://mathscinet.ams.org/mathscinet/MRAuthorID/194673

https://orcid.org/0000-0002-7414-7625

https://www.scopus.com/authid/detail.url?authorId=6603898611

Full list of publications:

scientific publications

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

1.	A. B. Aleksandrov, V. V. Peller, “Functions of compact operators under trace class perturbations”, Algebra i Analiz, 36:1 (2024), 7–16
2.	V. V. Peller, “Besov spaces in operator theory”, Russian Math. Surveys, 79:1, 1–52
3.	A.B. Aleksandrov and V.V. Peller, “Triangular projection on S_p, 0<p<1, and related inequalities”, Proc. Amer. Math. Soc., 151 (2023), 2559-2571
4.	A. B. Aleksandrov, V. V. Peller, “Triangular projection on $\boldsymbol{S}_p,~0<p<1$, as $p$ approaches $1$”, Algebra i Analiz, 35:6 (2023), 1–13
5.	A.B. Aleksandrov and V.V. Peller, “Functions of perturbed commuting dissipative operators”, Math. Nachr., 295:6 (2022), 1042–1062	4 ^[x]
6.	A. B. Aleksandrov, V. V. Peller, “Functons of perturbed pairs of noncommuting dissipative operator”, St. Petersburg Math. J., 34:3 (2023), 379–392
7.	A. B. Aleksandrov, V. V. Peller, “Functions of perturbed noncommuting unbounded self-adjoint operators”, St. Petersburg Math. J., 34:6 (2023), 913–927
8.	A. B. Aleksandrov, V. V. Peller, “Functions of pairs of unbounded noncommuting self-adjoint operators under perturbation”, Dokl. Math., 106:3 (2022), 407–411
9.	A. B. Aleksandrov, V. V. Peller, “Functions of perturbed pairs of non-commuting contractions”, Izv. Math., 84:4 (2020), 659–682
10.	A.B. Aleksandrov and V.V. Peller, “Functions of noncommuting operators under perturbation of class $S_p$”, Math. Nachr., 293 (2020), 847–860
11.	A.B. Aleksandrov and V.V. Peller, “Schur multipliers of Schatten–von Neumann classes $S_p$”, Journal Funct. Anal., 279 (2020), 108683	4 ^[x]
12.	M.M. Malamud, H. Neidhardt, V.V. Peller, “Absolute continuity of spectral shift”, J. Funct. Anal., 276, (2019), 1575–1621	10 ^[x]
13.	A.B. Aleksandrov, V.V. Peller, “Dissipative operators and operator Lipschitz functions”, Proc. Amer. Math. Soc., 147:5 (2019) , 2081-2093	4 ^[x]
14.	V.V. Peller, “Functions of commuting contractions under perturbation”, Math. Nachr., 292 (2019) , 1151 - 1160	5 ^[x]
15.	A. B. Aleksandrov, V. V. Peller, D. S. Potapov, “On a Trace Formula for Functions of Noncommuting Operators”, Math. Notes, 106:4 (2019), 481–487
16.	V. V. Peller, “An elementary approach to operator Lipschitz type estimates”, Tribute to Victor Havin: 50 Years with Hardy Spaces, 261, Birkhäuser, Basel, 2018, 395–416.
17.	V. V. Peller, “Functions of triples of noncommuting self-adjoint operators under perturbations of class $\boldsymbol{S_p}$”, Proc. Amer. Math. Society, 146:4 (2018), 1699-1711	4 ^[x]
18.	A. B. Aleksandrov, V. V. Peller, “Multiple operator integrals, Haagerup and Haagerup-like tensor products, and operator ideals”, Bulletin London Math. Soc., 49 (2017), 463–479	12 ^[x]
19.	M. M. Malamud, H. Neidhardt, V. V. Peller, “Analytic operator Lipschitz functions in the disk and a trace formula for functions of contractions”, Funct. Anal. Appl., 51:3 (2017), 185–203
20.	M. M. Malamud, H. Neidhardt, V. V. Peller, “A trace formula for functions of contractions and analytic operator Lipschitz functions”, C. R. Math. Acad. Sci. Paris, 355 (2017), 806–811	3 ^[x]
21.	A. B. Aleksandrov, V. V. Peller, “Krein's trace formula for unitary operators and operator Lipschitz functions”, Funct. Anal. Appl., 50:3 (2016), 167–175
22.	A. B. Aleksandrov, V. V. Peller, “Operator Lipschitz functions”, Russian Math. Surveys, 71:4 (2016), 605–702
23.	V. V. Peller, “Comments on the paper N.J. Kalton and C. Le Merdy “Solution of a problem of Peller concerning similarity””, Nigel J. Kalton Selecta, V. 1, Contemporary Mathematicians, Birkhäuser, Basel, 2016, 335–338
24.	V. V. Peller, “Multiple operator integrals in perturbation theory”, Bull. Math. Sci., 6 (2016), 15–88	30 ^[x]
25.	A. B. Aleksandrov, F. L. Nazarov, V. V. Peller, “Functions of noncommuting self-adjoint operators under perturbation and estimates of triple operator integrals”, Adv. Math., 295 (2016), 1–-52
26.	A. B. Aleksandrov, V. V. Peller, “Functions of almost commuting operators and an extension of the Helton–Howe trace formula”, J. Funct. Anal., 271 (2016), 3300–3322
27.	V. V. Peller, “The Lifshits–Krein trace formula and operator Lipschitz functions”, Proc. Amer. Math. Soc., 144 (2016), 5207–5215
28.	A. B. Aleksandrov, F. L. Nazarov, V. V. Peller, “Functions of perturbed noncommuting self-adjoint operators”, C. R. Acad. Sci. Paris, Sér. I, 353 (2015), 209-–214	2 ^[x]
29.	A. B. Aleksandrov, V. V. Peller, “Almost commuting functions of almost commuting self-adjoint operators”, C. R. Acad. Sci. Paris, Sér. I, 353 (2015), 583–588	3 ^[x]
30.	A. B. Aleksandrov, F. L. Nazarov, V. V. Peller, “Triple operator integrals in Schatten–von Neumann norms and functions of perturbed noncommuting operators”, C.R. Acad. Sci. Paris, Sér. I, 353 (2015), 723–728
31.	F. L. Nazarov, V. V. Peller, “Functions of perturbed $n$-tuples of commuting self-adjoint operators”, J. Funct. Anal., 266 (2014), 5398–-5428	14 ^[x]
32.	V. V. Peller, “Utilization of technology for mathematical talks”, Notices of the AMS, 60:2 (2013), 235–238
33.	A. B. Aleksandrov, V. V. Peller, “Operator and commutator moduli of continuity for normal operators”, Proc. London Math. Soc. (3), 105 (2012), 821-–851	10 ^[x]
34.	V. V. Peller, “Selected problems in perturbation theory”, Topics in complex analysis and operator theory, Contemp. Math., 561, Amer. Math. Soc., Providence, RI, 2012, 67–90
35.	F. L. Nazarov, V. V. Peller, “Functions of perturbed tuples of self-adjoint operators”, C.R. Acad. Sci. Paris, Sér. I, 350 (2012), 349–354	2 ^[x]
36.	A. B. Aleksandrov, V. V. Peller, “Functions of perturbed dissipative operators”, St. Petersburg Math. J., 23:2 (2012), 209–238
37.	A. B. Aleksandrov, V. V. Peller, “Trace formulae for perturbations of class $\boldsymbol{S}_m$”, J. Spectral Theory,, 1 (2011), 1–26	11 ^[x]
38.	A. B. Aleksandrov, V. V. Peller, D. Potapov, F. Sukochev, “Functions of normal operators under perturbation”, Advances in Math., 226 (2011), 5216–5251	26 ^[x]
39.	A. B. Aleksandrov, V. V. Peller, “Estimates of operator moduli of continuity”, J. Funct. Anal., 261 (2011), 2741-–2796	15 ^[x]
40.	A. B. Aleksandrov, V. V. Peller, “Operator Hölder–Zygmund functions”, Advances in Math., 224 (2010), 910–966	38 ^[x]
41.	A. B. Aleksandrov, V. V. Peller, “Functions of operators under perturbations of class $\boldsymbol{S}_p$”, J. Funct. Anal., 258 (2010), 3675–3724	30 ^[x]
42.	V. V. Peller, “The behavior of functions of operators under perturbations”, A glimpse at Hilbert space operators, Oper. Theory Adv. Appl., 207, Birkhäuser, Basel, 2010, 287–324	4 ^[x]
43.	A. B. Aleksandrov, V. V. Peller, “Functions of perturbed unbounded self-adjoint operators. Operator Bernstein type inequalities”, Indiana Univ. Math. J., 59 (2010), 1451–1490	11 ^[x]
44.	A. B. Aleksandrov, V. V. Peller, D. Potapov, F. Sukochev, “Functions of perturbed normal operators”, C.R. Acad. Sci. Paris, Sér. I, 348 (2010), 553–558	2 ^[x]
45.	V. V. Peller, “Analytic approximation of matrix functions and dual extremal functions”, Proc. Amer. Math. Soc., 137 (2009), 205–210	2 ^[x]
46.	F. L. Nazarov, L. Baratchart, V. V. Peller, “Analytic approximation of matrix functions in $L^p$”, J. Approx. Theory, 158 (2009), 242-278	6 ^[x]
47.	V. V. Peller, “Differentiability of functions of contractions”, Linear and complex analysis, Amer. Math. Soc. Transl. Ser. 2, 226, Amer. Math. Soc., Providence, RI, 2009, 109–131
48.	A. B. Aleksandrov, V. V. Peller, “Functions of perturbed operators”, C.R. Acad. Sci. Paris, Sér. I, 347 (2009), 483–488	8 ^[x]
49.	F. L. Nazarov, V. V. Peller, “Lipschitz functions of perturbed operators”, C.R. Acad. Sci. Paris, Sér. I, 347 (2009), 857–862	13 ^[x]
50.	V. V. Peller, V. I. Vasyunin, “Analytic approximation of rational matrix functions”, Indiana Univ. Math. J., 56 (2007), 1913–1937	2 ^[x]
51.	V. V. Peller, “On S. Mazur's problems 8 and 88 from the Scottish Book”, Stud. Math., 180 (2007), 191–198	2 ^[x]
52.	V. V. Peller, “Multiple operator integrals and higher operator derivatives”, J. Funct. Anal., 233 (2006), 515–544
53.	St. Petersburg Math. J., 17:3 (2006), 493–510
54.	V. V. Peller, S. R. Treil, “Very badly approximable matrix functions}”, Selecta Math., 11 (2005), 127–154	4 ^[x]
55.	V. V. Peller, “An extension of the Koplienko–Neidhardt trace formulae”, J. Funct. Anal., 221 (2005), 456–481
56.	V. V. Peller, Operatory Gankelya i ikh prilozheniya, Sovremennaya matematika, Regulyarnaya i khaoticheskaya dinamika, Izhevsk, 2005 , 1026 pp.
57.	A. B. Aleksandrov, V. V. Peller, “Distorted Hankel operators”, Indiana Univ. Math. J., 53 (2004), 925–940	1 ^[x]
58.	V. V. Peller, Hankel Operators and their Applications, Springer Monographs in Mathematics, Springer–Verlag, Berlin, 2003 , 784 pp.	292 ^[x]
59.	A. B. Aleksandrov, V. V. Peller, “Hankel and Toeplitz-Schur multipliers”, Math. Ann., 324 (2002), 277–327	18 ^[x]
60.	A. B. Aleksandrov, S. Janson, V. V. Peller, R. Rochberg, “An interesting class of operators with unusual Schatten–von Neumann behavior”, Function spaces, interpolation theory and related topics (Lund, 2000), de Gruyter, Berlin, 2002, 61–149
61.	R. B. Alexeev, V. V. Peller, “Unitary interpolants and factorization indices of matrix functions”, J. Funct. Anal., 179 (2001), 43-65
62.	R. B. Alexeev, V. V. Peller, “Invariance properties of thematic factorizations of matrix functions”, J. Funct. Anal., 179 (2001), 309-332
63.	V. V. Peller, “Regularity conditions for vectorial stationary processes”, Operator Theory: Advances and Applications, 113, Birkhäuser, Basel, 2000, 287-301
64.	R. B. Alexeev, V. V. Peller, “Badly approximable matrix functions and canonical factorizations”, Indiana Univ. Math. J., 49 (2000), 1247–1285	2 ^[x]
65.	V. V. Peller, “An excursion into the theory of Hankel operators”, Holomorphic spaces (Berkeley, CA, 1995), Math. Sci. Res. Inst. Publ., 33, Cambridge Univ. Press, Cambridge, 1998, 65–120
66.	V. V. Peller, “Factorization and approximation problems for matrix functions”, J. Amer. Math. Soc., 11 (1998), 751-770
67.	V. V. Peller, “Hereditary properties of solutions of the four block problem”, Indiana Univ. Math. J., 47 (1998), 177-197
68.	V. V. Peller, S. R. Treil, “Approximation by analytic matrix functions. The four-block problem”, J. Funct. Anal., 148 (1997), 191-228
69.	V. V. Peller, N. J.Young, “Continuity properties of best analytic approximations”, J. Reine und Angew. Math., 483 (1997), 1-22
70.	V. V. Peller, N. J.Young, “Superoptimal approximation by meromorphic matrix functions”, Math. Proc. Camb. Phil. Soc., 119 (1996), 497-511	4 ^[x]
71.	A. B. Aleksandrov, V. V. Peller, “Hankel operators and similarity to a contraction”, Int. Math. Res. Notices, 6 (1996), 263-275	16 ^[x]
72.	A. M. Megretskii, V. V. Peller, S. R. Treil, “The inverse spectral problem for self-adjoint Hankel operators”, Acta Math., 174 (1995), 241-309	33 ^[x]
73.	V. V. Peller, N. J.Young, “Construction of superoptimal approximation”, Math. Control Signals Systems, 8 (1995), 497-511	4 ^[x]
74.	V. V. Peller, “Approximation by analytic operator-valued functions”, Harmonic Analysis and Operor Theory (Caracas, 1994), Contemp. Math., 189, Amer. Math. Soc., Providence, RI, 1995, 431-438	3 ^[x]
75.	V. V. Peller, S. R. Treil, “Superoptimal singular values and indices of infinite matrix functions”, Ind. Univ. Math. J., 44 (1995), 243-255	1 ^[x]
76.	V. V. Peller, N. J.Young, “Superoptimal analytic approximations of matrix functions”, J. Funct. Anal., 120 (1994), 300-343	5 ^[x]
77.	V. V. Peller, N. J.Young, “Superoptimal singular values and indices of matrix functions”, Int. Eq. Oper. Theory, 20 (1994), 350-363	5 ^[x]
78.	V. V. Peller, “Functional calculus for a pair of almost commuting selfadjoint operators”, J. Funct. Anal., 112 (1993), 325-345
79.	V. V. Peller, “Invariant subspaces of Toeplitz operators with piecewise continuous symbols”, Proc. Amer. Math. Soc., 119 (1993), 171-178	1 ^[x]
80.	A. M. Megretskii, V. V. Peller, S. R. Treil, “Le problème inverse pour les opérateurs de Hankel”, Comptes Rendus Acad. Sci, Paris, Séries I, 317 (1993), 343-346
81.	V. V. Peller, “Boundedness properties of the operators of best approximations by meromorphic functions”, Arkiv för Mat., 30 (1992), 331-343	2 ^[x]
82.	A. L. Vol'berg, V. V. Peller, D. V. Yakubovich, “A brief excursion into the theory of hyponormal operators”, Leningrad Math. J., 2:2 (1991), 211–243
83.	V. V. Peller, “Hankel operators and continuity properties of best approximation operators”, Leningrad Math. J., 2:1 (1991), 139–160
84.	V. V. Peller, “Hankel operators and multivariate stationary processes”, Operator theory: operator algebras and applications, Part 1, Proc. Sympos. Pure Math. (Durham, NH, 1988), 51, Part 1, Amer. Math. Soc., Providence, RI, 1990, 357-371	7 ^[x]
85.	V. V. Peller, “Hankel operators in the perturbation theory of unbounded selfadjoint operators”, Analysis and Partial Differential Equations. A Collection of Papers Dedicated to Misha Cotlar, Lecture Notes in Pure and Appl. Math.,, 122, Marcel Dekker, Inc., New York, 1990, 529-544
86.	V. V. Peller, “When is a function of a Toeplitz operator close to a Toeplitz operator?”, Operator Theory, 42, Birkhäuser, Basel, 1989, 59-85	4 ^[x]
87.	V. V. Peller, “Smoothness of Schmidt functions of smooth Hankel operators”, Function spaces and applications (Lund 1986), Lect. Notes Math., 1302, Springer-Verlag, Berlin, 1988, 237-246
88.	V. V. Peller, “Wiener–Hopf operators on a finite interval and Schatten–von Neumann classes”, Proc. Amer. Math. Soc., 104 (1988), 479-486	5 ^[x]
89.	V. V. Peller, “Rational approximation in $L^p$ and Faber transforms”, Investigations on linear operators and function theory. Part XVI, Zap. Nauchn. Sem. LOMI, 157, “Nauka”, Leningrad. Otdel., Leningrad, 1987, 70–75
90.	V. V. Peller, “For which $f$ does $A-B\in\boldsymbol{S}_p$ imply that $f(A)-f(B)\in\boldsymbol{S}_p$?”, Operator Theory, 24, Birkhäuser, Basel, 1987, 289-294
91.	V. V. Peller, “Spectrum, similarity, and invariant subspaces of Toeplitz operators”, Math. USSR-Izv., 29:1 (1987), 133–144
92.	V. V. Peller, S .V. Khrushchev, “Hankel operators of Schatten – von Neumann class $\boldsymbol{S}_p$ and their applications to stationary processes and best approximations”: N. K. Nikolskii, Treatise on the shift operator, Springer-Verlag, Berlin, 1986, 359-454
93.	V. V. Peller, “Hankel operators in the perturbation theory of unitary and self-adjoint operators”, Funct. Anal. Appl., 19:2 (1985), 111–123
94.	V. V. Peller, “A remark on interpolation in spaces of vector functions”, J. Soviet Math., 37:5 (1987), 1357–1358
95.	V. V. Peller, “Hankel Schur multipliers and multipliers of $H^1$”, Investigations on linear operators and function theory. Part XIII, Zap. Nauchn. Sem. LOMI, 135, “Nauka”, Leningrad. Otdel., Leningrad, 1984, 113–119
96.	V.V. Peller, “Metricheskie svoistva usrednyayuschego proektora na mnozhestvo gankelevykh operatorov”, DAN SSSR, 278 (1984), 275-281
97.	V. V. Peller, “Estimates of functions of a Hilbert space operator, similarity to a contraction, and related function algebras”, 199 problems of linear and complex analysis, Lect. Notes in Math., 1043, Springer - Verlag,, Berlin, 1984, 199 - 204
98.	V. V. Peller, “Estimates of operator polynomials in the Schatten – von Neumann classes $\boldsymbol{S}_{p}$”, 199 problems in linear and complex analysis, Lect. Notes Math., 1043, Springer-Verlag, Berlin, 1984, 205-208
99.	S. V. Khrushchev, V. V. Peller, “Moduli of Hankel operators, Past and Future”, 199 problems of real and complex analysis, Lect. Notes in Math., 1043, Springer-Verlag, Berlin, 1984, 92-97
100.	V. V. Peller, “Iterates of Toeplitz operators”, 199 problems of linear and complex analysis, Lect. Notes Math., 1043, Springer-Verlag, Berlin, 1984, 269-270
101.	V. V. Peller, “Nuclear Hankel operators acting between Hardy classes”, Operator Theory, 14, Birkhäuser, Basel, 1984, 213-220
102.	V. V. Peller, “Metric properties of an averaging projector onto the set of Hankel matrices”, Dokl. Akad. Nauk SSSR, 278:2 (1984), 275–281
103.	V. V. Peller, “A description of Hankel operators of class $\mathfrak S_p$ for $p>0$, an investigation of the rate of rational approximation, and other applications”, Math. USSR-Sb., 50:2 (1985), 465–494
104.	V. V. Peller, “Invariant subspaces for Toeplitz operators”, Investigations on linear operators and function theory. Part XII, Zap. Nauchn. Sem. LOMI, 126, “Nauka”, Leningrad. Otdel., Leningrad, 1983, 170–179
105.	V.V. Peller, “Continuity properties of the averaging projection onto the set of Hankel matrices”, J. Funct. Anal., 53 (1983), 64-73
106.	V. V. Peller, S. V. Khrushchev, “Hankel operators, best approximations, and stationary Gaussian processes”, Russian Math. Surveys, 37:1 (1982), 61–144
107.	V. V. Peller, “Rational approximation and smoothness of functions”, J. Soviet Math., 36:3 (1987), 391–398
108.	V.V. Peller, “Estimates of functions of power bounded operators on Hilbert space”, J. Oper. Theory, 7 (1982), 341-372
109.	V.V. Peller, “Vectorial Hankel operators and related operators of the Schatten–von Neumann class ${\frak S}_{p}$”, Int. Equat. Oper. Theory, 5 (1982), 244-272	37 ^[x]
110.	V. V. Peller, “Analogue of J. von Neumann's inequality, isometric dilation of contractions and approximation by isometries in spaces of measurable functions”, Proc. Steklov Inst. Math., 155 (1983), 101–145
111.	V. V. Peller, “Hankel operators of class $\mathfrak S_p$ and their applications (rational approximation, Gaussian processes, the problem of majorizing operators)”, Math. USSR-Sb., 41:4 (1982), 443–479
112.	V. V. Peller, “Gladkie gankelevy operatory i ikh prilozheniya (idealy ${\frak S}_p$, klassy Besova, sluchainye protsessy)”, DAN SSSR, 252:1 (1980), 43–48	4 ^[x]
113.	V. V. Peller, “Estimates of operator polynomials in symmetric spaces. Functional calculus for absolute contraction operators”, Math. Notes, 25:6 (1979), 464–471
114.	V. V. Peller, “Applications of ultraproducts in operator theory. A simple proof of E. Bishop's theorem”, Investigations on linear operators and function theory. Part IX, Zap. Nauchn. Sem. LOMI, 92, “Nauka”, Leningrad. Otdel., Leningrad, 1979, 230–240
115.	V. V. Peller, “Approximations by isometries and V. I. Matsaev's hypothesis for absolute contractions of the space $L^p$”, Funct. Anal. Appl., 12:1 (1978), 29–38
116.	V. V. Peller, “14.4. Estimation of operator polynomials in Schatten–von Neumann classes”, J. Soviet Math., 26:5 (1984), 2167–2168
117.	V.V. Peller, “L'inégalité de von Neumann, la dilatation isométrique et l'approximation par isométries dans $L^{p}$”, C.R. de l'Académie des Sciences de Paris, sér. A,, 278 (1978), 311-314
118.	V. V. Peller, “Estimates of operator polynomials on the space $L^p$ with respect to the multiplier norm”, J. Soviet Math., 16:3 (1981), 1139–1149
119.	V.V. Peller, “Analog neravenstva Dzh. fon Neimana dlya prostranstva $L^p$”, DAN SSSR, 231:3 (1976), 539–542	1 ^[x]

Presentations in Math-Net.Ru

1.	Поведение функций от операторов при относительно ограниченных и относительно ядерных возмущениях V. V. Peller Seminar on Operator Theory and Function Theory May 13, 2024 17:30
2.	Spectral shift functions for compressions and for dissipative operators V. V. Peller International Conference on Complex Analysis Dedicated to the Memory of Andrei Gonchar and Anatoliy Vitushkin November 23, 2023 11:00
3.	Вещественные функции спектрального сдвига для сжатий и диссипативных операторов V. V. Peller Conference on Complex Analysis and its Applications September 13, 2023 11:00
4.	Вещественные функции спектрального сдвига для сжатий V. V. Peller Seminar on Operator Theory and Function Theory April 17, 2023 17:30
5.	Поведение функций от пар некоммутирующих максимальных диссипативных операторов при возмущении V. V. Peller October 25, 2022 11:00
6.	Треугольное проектирование в $S_p$ при $p<1$ V. V. Peller Seminar on Operator Theory and Function Theory October 3, 2022 17:30
7.	Schur multipliers of the Schatten–von Neumann class $S_p$ for $0<p<1$. V. V. Peller International Conference on Complex Analysis Dedicated to the Memory of Andrei Gonchar and Anatoliy Vitushkin October 15, 2021 11:00
8.	Оценки липшицева типа для функций от диссипативных операторов V. V. Peller Seminar on Operator Theory and Function Theory February 15, 2021 17:30
9.	Functions of commuting dissipative operators under their perturbation V. V. Peller V. I. Smirnov Seminar on Mathematical Physics May 11, 2020 16:30
10.	Матричные мультипликаторы Шура класса Шатена - фон Неймана $S_p$. V. V. Peller Seminar on Operator Theory and Function Theory March 16, 2020 17:30
11.	Решение задачи Крейна и абсолютная непрерывность спектрального сдвига V. V. Peller Seminar on Theory of Functions of Real Variables May 11, 2018 18:30
12.	Функции возмущённых некоммутирующих операторов V. V. Peller Seminar on Operator Theory and Function Theory January 19, 2015 17:30
13.	Преподавание математики в США V. V. Peller Meetings of the St. Petersburg Mathematical Society June 3, 2014 18:00
14.	Формулы следов при возмущениях операторами класса Шаттена – фон Ноймана $S_m$ V. V. Peller Seminar on Operator Theory and Function Theory December 20, 2010 17:30

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