# Julie Bergner

#48,834

Most Influential Person Now

Mathematician

## Julie Bergner's AcademicInfluence.com Rankings

Julie Bergnermathematics Degrees

Mathematics

#3521

World Rank

#5176

Historical Rank

#1297

USA Rank

Measure Theory

#3895

World Rank

#4590

Historical Rank

#1116

USA Rank

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Mathematics

## Julie Bergner's Degrees

- PhD Mathematics Princeton University
- Masters Mathematics Stanford University
- Bachelors Mathematics University of California, Berkeley

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## Why Is Julie Bergner Influential?

(Suggest an Edit or Addition)According to Wikipedia, Julia Elizabeth Bergner is a mathematician specializing in algebraic topology, homotopy theory, and higher category theory. She is a professor of mathematics at the University of Virginia. Education and career Bergner graduated from Gonzaga University in 2000. She completed her Ph.D. at the University of Notre Dame in 2005. Her dissertation, Three Models for the Homotopy Theory of Homotopy Theories, was supervised by William Gerard Dwyer.

## Julie Bergner's Published Works

### Published Works

- A model category structure on the category of simplicial categories (2004) (258)
- THREE MODELS FOR THE HOMOTOPY THEORY OF HOMOTOPY THEORIES (2005) (142)
- A Survey of (∞, 1)-Categories (2010) (87)
- Rigidification of algebras over multi-sorted theories (2005) (69)
- Reedy categories and the Θ -construction (2011) (42)
- Simplicial monoids and Segal categories (2005) (42)
- Homotopy limits of model categories and more general homotopy theories (2010) (35)
- Comparison of models for (∞,n) ‐categories, II (2020) (32)
- Reedy categories and the $$\varTheta $$-construction (2013) (30)
- The Homotopy Theory of (∞,1)-Categories (2018) (30)
- A CHARACTERIZATION OF FIBRANT SEGAL CATEGORIES (2006) (27)
- Homotopy fiber products of homotopy theories (2008) (24)
- 2-Segal sets and the Waldhausen construction (2016) (24)
- Complete Segal spaces arising from simplicial categories (2007) (21)
- A survey of models for (∞, n)-categories (2020) (21)
- Comparison of models for $(\infty, n)$-categories, II (2012) (20)
- Models for ( ∞ , n )-categories and the cobordism hypothesis (2011) (16)
- A survey of (\infty, 1)-categories (2006) (15)
- Adding inverses to diagrams II: Invertible homotopy theories are spaces (2007) (14)
- ADDING INVERSES TO DIAGRAMS ENCODING ALGEBRAIC STRUCTURES (2006) (12)
- Group actions on Segal operads (2012) (11)
- The edgewise subdivision criterion for 2-Segal objects (2018) (10)
- EQUIVALENCE OF MODELS FOR EQUIVARIANT (∞, 1)-CATEGORIES (2016) (10)
- 2–Segal objects and the Waldhausen construction (2018) (9)
- COMPARISON OF MODELS FOR (1;n)-CATEGORIES, I (2013) (7)
- Reedy categories and the $\Theta$-construction (2011) (6)
- A T ] 2 7 A pr 2 02 1 AN EXPLICIT COMPARISON BETWEEN 2-COMPLICIAL SETS AND Θ 2-SPACES (2021) (5)
- Reedy categories which encode the notion of category actions (2012) (5)
- Correction to "Simplicial monoids and Segal categories" (2008) (4)
- DERIVED HALL ALGEBRAS FOR STABLE HOMOTOPY THEORIES (2009) (4)
- FIXED POINTS OF p-TORAL GROUPS ACTING ON PARTITION COMPLEXES (2014) (3)
- Models for $(\infty, n)$-categories and the cobordism hypothesis (2010) (3)
- EQUIVALENCE OF MODELS FOR EQUIVARIANT (2015) (2)
- Classification of problematic subgroups of $\boldsymbol {U(n)}$ (2014) (2)
- EQUIVALENCE OF MODELS FOR EQUIVARIANT (2015) (2)
- Comparison of Waldhausen constructions (2019) (2)
- Equivalence of models for equivariant $(\infty, 1)$-categories (2014) (1)
- Enriched functor categories for functor calculus (2020) (1)
- Action Graphs and Catalan Numbers (2015) (1)
- Cluster categories for topologists (2013) (1)
- Modeling Homotopy Theories (2019) (1)
- ON THE HOMOTOPY THEORY OF HOMOTOPY THEORIES (2011) (1)
- Cofibrantly generated model structures for functor calculus (2023) (1)
- Equivariant complete Segal spaces (2015) (1)
- Action graphs, rooted planar forests, and self-convolutions of the Catalan numbers (2018) (0)
- Homotopy colimits of model categories (2012) (0)
- 6. What Do I Do When My Paper or Grant Is Rejected? by Julia E. Bergner (2020) (0)
- Models for $(\infty,n)$-categories with discreteness conditions, I (2022) (0)
- Diagrams encoding group actions on Γ-spaces (2012) (0)
- Workshop on the homotopy theory of homotopy theories (2011) (0)
- Preface for the WITIII proceedings volume (2022) (0)
- Groupoid Cardinality and Egyptian Fractions (2015) (0)
- Women in Topology (2015) (0)
- New trends in triangulated categories and their associated cohomology theories (2009) (0)
- WIT: Women in Topology (2014) (0)
- Algebraic Topology: Manifolds Unlocking Higher Structures (2015) (0)
- Equivariant Trees and Partition Complexes (2023) (0)
- What Do I Do When My Paper or Grant Is Rejected (2020) (0)
- Writing papers in the mathematical sciences (2020) (0)
- Group actions on Segal operads (2014) (0)
- Diagrams encoding group actions on $\Gamma$-spaces (2012) (0)
- A survey of models for $(\infty, n)$-categories (2018) (0)
- Simplicial Sets in Topology, Category Theory, and Beyond (2022) (0)

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## What Schools Are Affiliated With Julie Bergner?

Julie Bergner is affiliated with the following schools: