nLab Pierre Deligne

Pierre Deligne is a Belgian mathematician who was a student of Alexander Grothendieck, then worked at l’IHÉS and now is emeritus at IAS.

• Wikipedia entry,

• IAS page,

• publication list (pdf)

• list of scanned articles: numdam

• Luc Illusie, From Pierre Deligne’s secret garden: looking back at some of his letters (pdf)

Deligne’s main interests include algebraic geometry especially cohomology of algebraic varieties, Hodge theory, L-functions and automorphic forms, Tannakian theory, representation theory of algebraic groups, and motives, where he extended the conjectural picture from pure to mixed motives (Grothendieck was much earlier aware and pushing toward that extension, though not publishing about it, according to Serre and others).

Deligne has obtained the Fields medal in 1978 for a famous 1973 proof of Weil conjectures.

For the sake of preparatory/foundational steps he wrote a quick amendement for the unfinished volumes of SGA in a form of practical and short (but controversial to Grothendieck) SGA $4\frac{1}{2}$. This work uses a powerful and deep yoga of Hodge filtrations discovered also by Deligne.

Selected writings

Introducing the notion of algebraic stacks and (what came to be called) Deligne-Mumford stacks, and on the example of the moduli space of curves:

• Pierre Deligne, David Mumford, The irreducibility of the space of curves of given genus, Publications Mathématiques de l’IHÉS (Paris) 36 (1969) 75-109 [doi:10.1007/BF02684599, numdam:PMIHES_1969__36__75_0]

On differential equations with regular singular points (and developing local systems, twisted cohomology, twisted de Rham cohomology, Gauss-Manin connections):

• Pierre Deligne, Equations différentielles à points singuliers réguliers, Lecture Notes Math. 163, Springer (1970) $[$publications.ias:355$]$

Deligne led a seminar on differential systems corresponding to meromorphic connections, whose basic results were explained in a classic in this are:

• Équations différentielles à points singuliers réguliers, Lect. Notes in Math. 163, Springer-Verlag (1970)

surveyed in:

• N. Katz, An overview of Deligne’s work on Hilbert's twenty-first problem, Proc. of Symp. in Pure Math., vol.28, pp. 537-557 (1976).

Introducing Deligne cohomology in complex analytic geometry (by a chain complex of holomorphic differential forms) with applications to Hodge theory and intermediate Jacobians:

• Pierre Deligne, Théorie de Hodge II , IHES Pub. Math. (1971), no. 40, 5–57 (pdf)

On elliptic curves over general commutative ground rings (in arithmetic geometry):

• Pierre Deligne, Michael Rapoport, Les Schémas de Modules de Courbes Elliptiques In: Deligne P., Kuijk W. (eds) Modular Functions of One Variable II, Lecture Notes in Mathematics, vol 349. Springer (1973) (doi:10.1007/978-3-540-37855-6_4)

On the Weil conjectures:

• La conjecture de Weil : I, Publications Mathématiques de l’IHÉS 43 (1974), p. 273-307 numdam

On rational homotopy theory of Kähler manifolds:

• Pierre Deligne, Phillip Griffiths, John Morgan, Dennis Sullivan, Real homotopy theory of Kähler manifolds, Invent Math (1975) 29: 245 (doi:10.1007/BF01389853)

  (containing the statement that the co-binary Sullivan differential is the dual Whitehead product)

Introducing the notion of perverse sheaves (and of t-structures on triangulated categories):

• Alexander Beilinson, Joseph Bernstein, Pierre Deligne, Faisceaux pervers, Astérisque 100 (1982) [ISBN:978-2-85629-878-7, pdf, MR86g:32015]

On Tannakian categories:

• Pierre Deligne, James Milne: Tannakian categories, in: Hodge Cycles, Motives, and Shimura Varieties, Lecture Notes in Mathematics 900, Springer (1982) [doi:10.1007/978-3-540-38955-2_4, webpage]

On tensor categories and Tannaka duality:

• Pierre Deligne, section 2 of Catégories Tannakiennes, Grothendieck Festschrift, vol. II, Birkhäuser Progress in Math. 87 (1990) pp. 111-195 (pdf)

culminating in Deligne's theorem on tensor categories:

• Pierre Deligne, Catégorie Tensorielle, Moscow Math. Journal 2 (2002) no. 2, 227-248. (pdf)

On mathematical foundations of superalgebra, supergeometry and supersymmetry:

• Pierre Deligne, John Morgan, Notes on supersymmetry, in Quantum Fields and Strings, A course for mathematicians, vol 1, Amer. Math. Soc. (1999) 41-98 [web version, pdf, pdf]

• Pierre Deligne, Daniel Freed, Supersolutions, in: Quantum Fields and Strings, A course for mathematicians, vol 1, Amer. Math. Soc. (1999) 227 [web version, arXiv:hep-th/9901094]

and focus on signs in supergeometry:

• Pierre Deligne, Daniel Freed, Sign manifesto, in: Quantum Fields and Strings, A course for mathematicians, vol 1, Amer. Math. Soc. (1999) 357 [web version, pdf]

On moduli problems in supergeometry via methods from algebraic geometry:

• Pierre Deligne: Supermoduli – Methods from Algebraic Geometry, lecture series at Supermoduli Workshop, Simons Center @ Stony Brook (2015) [scgp video: I, II, III, IV, V; YouTube:I]

Related entries

• Deligne completeness theorem

• Deligne conjecture

• Tannaka duality

• Deligne's theorem on tensor categories

• Whitehead product,

  the co-binary Sullivan differential is the dual Whitehead product