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J. KopiĆski (CTP PAS) - Constructing a solution to the Penrose CCC scenario
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SCREAM Seminar - Symmetry, Curvature Reduction, and Equivalence Methods in Differential Geometry
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- 1 J. KopiĆski (CTP PAS) - Constructing a solution to the Penrose CCC scenario
- 2 Prof. PaweĆ Nurowski (CTP PAS): Conformal transformations and the beginning of the Universe: Part I.
- 3 Prof.PaweĆ Nurowski (CTP PAS): Conformal transformations and the beginning of the Universe: Part II.
- 4 Prof.PaweĆ Nurowski (CTP PAS): Conformal transformations and the beginning of the Universe:Part III.
- 5 Dennis The (UiT): Classifying homogeneous geometric structures: Part I.
- 6 Dennis The (UiT): Classifying homogeneous geometric structures: Part II.
- 7 Dennis The (UiT): Classifying homogeneous geometric structures: Part III.
- 8 Prof. PaweĆ Nurowski (CTP PAS): Simple models in Penrose's Conformal Cyclic Cosmology
- 9 M. Zhitomirskii (Technion): Normal forms and symmetries for (2,3,5) and (3,5) distributions Part I
- 10 M. Zhitomirskii (Technion): Normal forms and symmetries for (2,3,5) and (3,5) distributions Part II
- 11 M. Zhitomirskii (Technion): Normal forms and symmetries for (2,3,5) and (3,5) distributions Part III
- 12 M. Zhitomirskii (Technion): Normal forms and symmetries for (2,3,5) and (3,5) distributions Part IV
- 13 Boris Kruglikov (UiT): Dispersionless integrable systems: Part I
- 14 Boris Kruglikov (UiT): Dispersionless integrable systems: Part II
- 15 Boris Kruglikov (UiT): Dispersionless integrable systems: Part III
- 16 I. Zelenko:Geometry of rank 2 distributions via abnormal extremals:generalized Wilczynski invariants
- 17 I.Zelenko:Geometry of rank 2 distributions via abnormal extremals:algebraic structure of invariants
- 18 David Sykes (Texas A&M): On Geometry of 2-nondegenerate, Hypersurface-type CauchyâRiemann Structures
- 19 B. Doubrov (BSU): Moving frames and invariants for submanifolds in parabolic homogeneous spaces - 1.
- 20 B. Doubrov (BSU): Moving frames and invariants for submanifolds in parabolic homogeneous spaces - 2.
- 21 B. Doubrov (BSU): Moving frames and invariants for submanifolds in parabolic homogeneous spaces - 3.
- 22 Dr. Andrea Santi (UiT): An introduction to supergravity in 11 dimensions â Part I
- 23 Dr. Andrea Santi (UiT): An introduction to supergravity in 11 dimensions â Part II
- 24 Dr. Andrea Santi (UiT): An introduction to supergravity in 11 dimensions â Part III
- 25 Dr. Omid Makhmali (CTP PAS): Frobenius integrability and Cartan geometries - Part I
- 26 Dr. Omid Makhmali (CTP PAS): Frobenius integrability and Cartan geometries - Part II
- 27 Dr. Omid Makhmali (CTP PAS): Frobenius integrability and Cartan geometries - Part III
- 28 Prof. Joël Merker (Paris-Saclay University): Symmetries with power series - Part I
- 29 Prof. JoĂ«l Merker (Paris-Saclay University): Symmetries with power series â Part II
- 30 Prof. JoĂ«l Merker (Paris-Saclay University): Symmetries with power series â Part III
- 31 Symmetric trilinear forms and Einstein-like equations: from affine spheres to Griess algebras
- 32 Symmetric trilinear forms and Einstein-like equations: from affine spheres to Griess algebras p. II
- 33 Symmetric trilinear forms and Einstein-like equations: from affine spheres to Griess algebras p. III
- 34 Ian Anderson (Utah State University, USA): Symmetries, Conservation Laws and Variational Principles
- 35 I. Anderson (Utah State University): Symmetries, Conservation Laws and Variational Principles, p. II
- 36 I. Anderson (Utah State University): Symmetries, Conservation Laws and Variational Principles, p.III
- 37 D. McNutt (UiT The Arctic University):Cartan-Karlhede algorithm and Cartan invariants for spacetimes
- 38 D. McNutt (The Arctic University):Cartan-Karlhede algorithm and Cartan invariants for spacetimes p.2
- 39 D. McNutt (The Arctic University):Cartan-Karlhede algorithm and Cartan invariants for spacetimes p.3
- 40 Dr. JarosĆaw KopiĆski (CTP PAS): Applications of tractor calculus in general relativity (Part I)
- 41 Dr. JarosĆaw KopiĆski (CTP PAS): Applications of tractor calculus in general relativity (Part II)
- 42 Dr. JarosĆaw KopiĆski (CTP PAS): Applications of tractor calculus in general relativity (Part III)
- 43 Evgeny Ferapontov (Loughborough University, UK): On ODEs satisfied by modular forms
- 44 E. Ferapontov (Loughborough University, UK): Dispersionless integrable equations and modular forms
- 45 Prof. José Figueroa-O'Farrill (School of Mathematics, Univ. of Edinburgh): Spacetime G-structures I
- 46 R. Graham (Univ. of Washington): Gauss--Bonnet Formula for Renormalized Area of Minimal Submanifolds
- 47 Prof. José Figueroa-O'Farrill (School of Mathematics, Univ. of Edinburgh): Spacetime G-structures II
- 48 Prof. José Figueroa-O'Farrill (School of Mathematics,Univ. of Edinburgh): Spacetime G-structures III
- 49 Prof. Adam Sawicki (Center for Theoretical Physics PAS): Geometry of quantum correlations
- 50 Prof. Adam Sawicki (Center for Theoretical Physics PAS): Geometry of quantum correlations, part II
