Wilhelm Winter | Academic Influence

Wilhelm Winter's AcademicInfluence.com Rankings

Wilhelm Winter

Mathematics

#4874

World Rank

#6889

Historical Rank

Measure Theory

#3832

World Rank

#4518

Historical Rank

mathematics Degrees

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Mathematics

Wilhelm Winter's Degrees

PhD Mathematics University of Göttingen

Why Is Wilhelm Winter Influential?

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According to Wikipedia, Wilhelm Winter is a German mathematician, specializing in operator algebras . Education and career Winter received in 1996 his Diplom from the Heidelberg University and in 2000 his doctorate from the University of Münster with thesis advisor Joachim Cuntz and thesis Covering Dimension for Nuclear C*-Algebras. At the University of Münster he was a research assistant from 2001 to 2007 and habilitated there in 2006 in Münster. In Fall 2002 he was a visiting assistant professor at Texas A & M University. From 2007 to 2011 he was at University of Nottingham, first as a lecturer and later as a reader. Winter is a professor of mathematics at the University of Münster since 2011.

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Wilhelm Winter's Published Works

Number of citations in a given year to any of this author's works

Total number of citations to an author for the works they published in a given year. This highlights publication of the most important work(s) by the author

Published Works

Strongly self-absorbing C*-algebras (2005) (256)
Quasidiagonality of nuclear C*-algebras (2015) (253)
The nuclear dimension of C*-algebras (2009) (243)
Nuclear dimension and -stability of pure C ∗ -algebras (2010) (177)
COVERING DIMENSION AND QUASIDIAGONALITY (2002) (171)
Completely positive maps of order zero (2009) (164)
The Jiang–Su algebra revisited (2008) (148)
Nuclear dimension and $\mathcal{Z}$-stability of pure C∗-algebras (2012) (134)
Localizing the Elliott conjecture at strongly self-absorbing C*-algebras (2007) (119)
Decomposition rank and Z-stability (2008) (113)
Covering dimension for nuclear C∗-algebras (2001) (97)
Covering Dimension of C*-Algebras and 2-Coloured Classification (2015) (94)
Rokhlin Dimension and C*-Dynamics (2012) (92)
Rokhlin actions and self-absorbing C*-algebras (2005) (77)
Strongly self-absorbing C*-algebras are Z-stable (2009) (77)
Minimal Dynamics and K-Theoretic Rigidity: Elliott’s Conjecture (2009) (67)
The Elliott conjecture for Villadsen algebras of the first type (2006) (61)
C_0(X)-algebras, stability and strongly self-absorbing C*-algebras (2006) (59)
Nuclear dimension and $$\mathcal Z$$Z-stability (2014) (56)
$${\mathcal{C}}_{0}$$ (X)-algebras, stability and strongly self-absorbing $${\mathcal{C}}^{*}$$ -algebras (2007) (56)
Nuclear dimension of simple $$\mathrm {C}^*$$-algebras (2019) (56)
Decomposition rank and $\mathcal{Z}$ -stability (2010) (55)
On the Classification of Simple Z‐Stable C*‐Algebras with Real Rank Zero and Finite Decomposition Rank (2005) (52)
Nuclear dimension and Z -stability (2015) (50)
An algebraic approach to the radius of comparison (2010) (50)
STRUCTURE OF NUCLEAR C*-ALGEBRAS: FROM QUASIDIAGONALITY TO CLASSIFICATION AND BACK AGAIN (2017) (49)
Decomposition Rank of Subhomogeneous C*‐Algebras (2002) (47)
Simple C∗-algebras with locally finite decomposition rank (2006) (46)
Minimal dynamics and the classification of C*-algebras (2009) (46)
Z-STABILITY AND FINITE-DIMENSIONAL TRACIAL BOUNDARIES (44)
On the KK-theory of strongly self-absorbing C*-algebras (2007) (44)
Perturbations of nuclear C*-algebras (2009) (43)
On topologically finite-dimensional simple C*-algebras (2003) (42)
Classifying crossed product C*-algebras (2013) (42)
Covering dimension for nuclear $C^*$-algebras II (2001) (38)
Trivialization of C(X)-algebras with strongly self-absorbing fibres (2007) (35)
Strongly self-absorbing C*-algebras are $\mathcal{Z}$-stable (2011) (30)
Rokhlin Dimension for Flows (2016) (30)
A Note On Subhomogeneous C*-Algebras (2006) (29)
Decomposition rank of -stable C∗-algebras (2012) (28)
𝓏-Stable ASH Algebras (2005) (26)
$\mathcal Z$-stability and finite dimensional tracial boundaries (2012) (26)
The Model Theory of Nuclear $\mathrm{C}^*$-algebras (2016) (22)
The Rokhlin property vs. Rokhlin dimension 1 on unital Kirchberg algebras (2013) (21)
The generator problem for Z-stable C*-algebras (2012) (17)
The spatial isomorphism problem for close separable nuclear C*-algebras (2009) (14)
The Cuntz semigroup and stability of close C∗-algebras (2012) (14)
The Jiang-Su algebra does not always embed (2007) (14)
Model theory of $\mathrm{C}^*$-algebras (2016) (11)
Quasitraces are Traces: A Short Proof of the Finite-Nuclear-Dimension Case (2010) (11)
MINIMAL DYNAMICS AND $\mathcal{Z}$-STABLE CLASSIFICATION (2011) (11)
The Toeplitz algebra has nuclear dimension one (2018) (10)
Minimal dynamics and Z-stable classification (2010) (10)
The similarity problem for Z― ‐stable C*‐algebras (2011) (9)
Nuclear dimension and the corona factorization property (2009) (8)
QDQ vs. UCT (2016) (7)
Commutative C*-subalgebras of Simple Stably Finite C*-algebras with Real Rank Zero (2006) (7)
Permutations of Strongly Self-Absorbing C*-algebras (2007) (7)
Mini-Workshop: MASAs and Automorphisms of C*-Algebras (2018) (5)
UHF-slicing and classification of nuclear C*-algebras (2013) (4)
The Rokhlin property vs. Rokhlin dimension 1 on O_2 (2013) (3)
Z is universal (2012) (3)
Model theory of 𝐶*-algebras (2021) (2)
The diagonal dimension of sub-C*-algebras (2023) (1)
C*-Algebras, Dynamics, and Classification (2012) (1)
$\mathcal{Z}$ is universal (2014) (1)
Nuclearity and CPC*-systems (2023) (0)
O A ] 1 5 A ug 2 00 1 Covering Dimension for Nuclear C ∗-Algebras II (2001) (0)
Rokhlin Dimension for Flows (2016) (0)
Rokhlin Dimension and C*-Dynamics (2015) (0)
Minimal Dynamics and K-Theoretic Rigidity: Elliott’s Conjecture (2013) (0)
CBMS LECTURE SERIES (2012) (0)
ON THE KK-THEORY OF STRONGLY (2009) (0)
Classifiability of crossed products (2014) (0)
Nuclear dimension of simple C∗\documentclass[12pt]{minimal} \usepackage{amsmath} \usepackage{wasysym} \usepackage{amsfonts} \usepackage{amssymb} \usepackage{amsbsy} \usepackage{mathrsfs} \usepackage{upgreek} \setlength{\oddsidemargin}{-69pt} \begin{document}$$\mathrm {C}^*$$\end{document}-algebras (2020) (0)

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