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Fumiaki Suzuki (2015)
Birational rigidity of complete intersectionsMathematische Zeitschrift, 285
A. Pukhlikov (2008)
On the $8n^2$-inequalityarXiv: Algebraic Geometry
A. Pukhlikov (2002)
Birationally rigid Fano hypersurfacesarXiv: Algebraic Geometry
Daniel Evans, A. Pukhlikov (2016)
Birationally rigid complete intersections of codimension twoarXiv: Algebraic Geometry
T. Eckl, A. Pukhlikov (2012)
On the locus of non-rigid hypersurfacesarXiv: Algebraic Geometry
A. Pukhlikov (2013)
Birationally Rigid Varieties
A. Pukhlikov (2009)
On the self-intersection of a movable linear systemJournal of Mathematical Sciences, 164
A. Corti (2000)
Explicit Birational Geometry of 3-Folds: Singularities of linear systems and 3-fold birational geometry
J. Kollár (1992)
Flips and Abundance for Algebraic ThreefoldsAstérisque, 211
A. Pukhlikov (1998)
Essentials of the method of maximal singularities
(1994)
A simple proof of Grothendieck’s theorem on the parafactoriality of local rings
A. Pukhlikov (2005)
Birational geometry of algebraic varieties with a pencil of Fano complete intersectionsmanuscripta mathematica, 121
(1993)
Three-dimensional log flips
I. Cheltsov (2005)
Birationally rigid Fano varietiesRussian Mathematical Surveys, 60
V. Iskovskih, Ju. Manin (1971)
THREE-DIMENSIONAL QUARTICS AND COUNTEREXAMPLES TO THE LÜROTH PROBLEMMathematics of The Ussr-sbornik, 15
A. Pukhlikov (2000)
Explicit Birational Geometry of 3-Folds: Essentials of the method of maximal singularitiesarXiv: Algebraic Geometry
(2005)
Nonexistence of elliptic structures on general Fano complete intersections of index one
A Pukhlikov (2013)
Birationally Rigid Varieties. Mathematical Surveys and Monographs
A. Pukhlikov (2001)
Birationally rigid Fano hypersurfaces with isolated singularitiesSbornik Mathematics, 193
V. Shokurov (1993)
3-FOLD LOG FLIPSIzvestiya: Mathematics, 40
N. Romão, J Speight (2004)
Slow Schrödinger dynamics of gauged vorticesNonlinearity, 17
The famous $$4n^2$$ 4 n 2 -inequality is extended to generic complete intersection singularities: it is shown that the multiplicity of the self-intersection of a mobile linear system with a maximal singularity is greater than $$4n^2\mu $$ 4 n 2 μ , where $$\mu $$ μ is the multiplicity of the singular point.
Arnold Mathematical Journal – Springer Journals
Published: Nov 30, 2016
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