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Authors

Semyon Litvinov

Last known institution:
Pennsylvania State University
ORCID:
0000-0003-2846-5646
4
h-index
0
i10-index
43
Citations
17
Works
Trends over time

Performance over time

Citation overview

Publications (bars) and citations (line) by year

  • Publications
  • Citations
0120510152020082011201520162017201820192020202120242008: Publications 0, Citations 32011: Publications 2, Citations 02015: Publications 2, Citations 32016: Publications 2, Citations 32017: Publications 1, Citations 02018: Publications 2, Citations 32019: Publications 2, Citations 42020: Publications 2, Citations 112021: Publications 1, Citations 22024: Publications 0, Citations 1

Citation history

0510152020082011201520162017201820192020202120242008: Citations 32011: Citations 02015: Citations 32016: Citations 32017: Citations 02018: Citations 32019: Citations 42020: Citations 112021: Citations 22024: Citations 1

Publication history

01220082011201520162017201820192020202120242008: Publications 02011: Publications 22015: Publications 22016: Publications 22017: Publications 12018: Publications 22019: Publications 22020: Publications 22021: Publications 12024: Publications 0

h-index evolution

Cumulative h-index by year

0134520082011201520162017201820192020202120242008: h-index 22011: h-index 22015: h-index 32016: h-index 32017: h-index 32018: h-index 32019: h-index 42020: h-index 42021: h-index 42024: h-index 4

Most-cited works

  1. A FEW REMARKS IN NON-COMMUTATIVE ERGODIC THEORY20056 citations
  2. On individual subsequential ergodic theorem in von Neumann algebras20016 citations
  3. Ergodic theorems in fully symmetric spaces of τ-measurable operators20154 citations
  4. On individual ergodic theorems for semifinite von Neumann algebras20202 citations
  5. Noncommutative weighted individual ergodic theorems with continuous time20202 citations
  6. Almost uniform and strong convergences in ergodic theorems for symmetric spaces20181 citations
  7. Local Ergodic Theorems in Symmetric Spaces of Measurable Operators20191 citations
  8. A Banach Principle for <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" altimg="si1.gif" overflow="scroll"><mml:msup><mml:mi>L</mml:mi><mml:mo>∞</mml:mo></mml:msup></mml:math> with semifinite measure20110 citations
  9. Individual ergodic theorems in noncommutative Orlicz spaces20160 citations
  10. The validity space of Dunford–Schwartz pointwise ergodic theorem20180 citations