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Tame control theory
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Tame Geometry, Transseries and Applications to Analysis and Geometry
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- 1 Tame control theory
- 2 Expanding the Ordered Group of Integers by Beatty Sequences
- 3 Tameness beyond o-minimality
- 4 Introduction to o-minimality and the Pila-Wilkie Theorem
- 5 Primitives of algebraic functions
- 6 Parametrizations and complexity of preparation
- 7 Towards an algebraic independence result for certain p -adic series.
- 8 Surreal numbers and transseries lecture #1
- 9 Techniques of resolution of singularities in quasianalytic classes lecture #1
- 10 Transseries, Model Theory, and Hardy Fields lecture 1
- 11 O-minimality and the Pila-Wilkie Theorem Lecture #1
- 12 Surreal numbers and transseries lecture #2
- 13 Transseries, Model Theory, and Hardy Fields Lecture #2
- 14 Techniques of resolution of singularities in quasianalytic classes
- 15 O-minimality and the Pila-Wilkie Theorem Lecture #2
- 16 Surreal numbers and transseries lecture #3
- 17 Techniques of resolution of singularities in quasianalytic classes lecture #3
- 18 Transseries, Model Theory, and Hardy Fields Lecture #3
- 19 Surreal Ordered Exponential Fields
- 20 O-minimality and the Pila-Wilkie Theorem Lecture #3
- 21 Transseries, Model Theory, and Hardy Fields Lecture #4
- 22 Surreal numbers and transseries lecture #4
- 23 Techniques of resolution of singularities in quasianalytic classes Lecture #4
- 24 O-minimality and the Pila-Wilkie Theorem Lecture #4
- 25 Surreal numbers and transseries lecture #5
- 26 Techniques of resolution of singularities in quasianalytic classes lecture #5
- 27 Transseries, Model Theory, and Hardy Fields Lecture #5
- 28 On the Pila-Wilkie theorem
- 29 O-minimality and the Pila-Wilkie Theorem Lecture #5
- 30 Surreal numbers and transseries lecture #6
- 31 Transseries, Model Theory, and Hardy Fields Lecture #6
- 32 Techniques of resolution of singularities in quasianalytic classes lecture #6
- 33 O-minimality and the Pila-Wilkie Theorem Lecture #6
- 34 Surreal numbers and transseries lecture #7
- 35 Techniques of resolution of singularities in quasianalytic classes lecture #7
- 36 Transseries, Model Theory, and Hardy Fields Lecture #7
- 37 Schwartz functions on definable (and other) domains
- 38 O-minimality and the Pila-Wilkie Theorem Lecture #7
- 39 Surreal numbers and transseries lecture #8
- 40 Transseries, Model Theory, and Hardy Fields Lecture #8
- 41 Techniques of resolution of singularities in quasianalytic classes lecture #8
- 42 O-minimality and the Pila-Wilkie Theorem Lecture #8
- 43 New techniques for the resolution of singularities of vector fields and differential operators #1
- 44 Tame control theory lecture #1
- 45 Transseries, Model Theory, and Hardy Fields Lecture #9
- 46 Lessons from early-stage COVID-19 outbreak dynamics in Gauteng province, South Africa
- 47 Complex analysis in o minimal expansions of real closed fields lecture #1
- 48 New techniques for the resolution of singularities of vector fields and differential operators #2
- 49 Transseries, Model Theory, and Hardy Fields Lecture #10
- 50 Tame control theory lecture #2
- 51 Complex analysis in o minimal expansions of real closed fields lecture #2
- 52 Transseries, Model Theory, and Hardy Fields lecture #11
- 53 Holomorphic extensions in the structure Ran,exp
- 54 New techniques for the resolution of singularities of vector fields and differential operators #4
- 55 Complex analysis in o minimal expansions of real closed fields lecture #3
- 56 New techniques for the resolution of singularities of vector fields and differential operators #4
- 57 Transseries, Model Theory, and Hardy Fields Lecture #12
- 58 Tame control theory lecture #3
- 59 Complex analysis in o minimal expansions of real closed fields lecture #4
- 60 New techniques for the resolution of singularities of vector fields and differential operators #5
- 61 Tame control theory lecture #4
- 62 Transseries, Model Theory, and Hardy Fields Lecture #13
- 63 On Rayner Structures
- 64 Complex analysis in o minimal expansions of real closed fields lecture #5
- 65 New techniques for the resolution of singularities of vector fields and differential operators #6
- 66 Transseries, Model Theory, and Hardy Fields Lecture #14
- 67 Tame control theory lecture #5
- 68 Complex analysis in o minimal expansions of real closed fields lecture #6
- 69 New techniques for the resolution of singularities of vector fields and differential operators #7
- 70 Tame control theory lecture #6
- 71 Transseries, Model Theory, and Hardy Fields Lecture #15
- 72 Equisingular algebraic approximation of analytic germs
- 73 New techniques for the resolution of singularities of vector fields and differential operators #8
- 74 Complex analysis in o minimal expansions of real closed fields lecture #7
- 75 Transseries, Model Theory, and Hardy Fields Lecture #16
- 76 Tameness beyond o-minimality lecture #1
- 77 Complex analysis in o minimal expansions of real closed fields lecture #8
- 78 Hilbert 16th problem and o-minimality lecture #1
- 79 Tameness beyond o-minimality lecture #2
- 80 Transseries, Model Theory, and Hardy Fields Lecture #17
- 81 Embedding Hardy fields with composition into generalized power series
- 82 Applications of o-minimality to Hodge Theory Lecture #1
- 83 Hilbert 16th problem and o-minimality lecture #2
- 84 Transseries, Model Theory, and Hardy Fields Lecture #18
- 85 Tame control theory lecture #7
- 86 Applications of o-minimality to Hodge Theory Lecture #2
- 87 Hilbert 16th problem and o-minimality lecture #3
- 88 Tameness beyond o-minimality lecture #3
- 89 Transseries, Model Theory, and Hardy Fields Lecture #19
- 90 Stratified Resolution of Singularities of Generalized Analytic Functions
- 91 Applications of o-minimality to Hodge Theory Lecture #3
- 92 Hilbert 16th problem and o-minimality lecture #4
- 93 Transseries, Model Theory, and Hardy Fields Lecture #20
- 94 Tameness beyond o-minimality lecture #4
- 95 Applications of o-minimality to Hodge Theory Lecture #4
- 96 Tameness beyond o-minimality lecture #5
- 97 Hilbert 16th problem and o-minimality lecture #5
- 98 Transseries, Model Theory, and Hardy Fields Lecture #21
- 99 Decomposing definable groups
- 100 Hilbert 16th problem and o-minimality lecture #6
- 101 Applications of o-minimality to Hodge Theory Lecture #5
- 102 Transseries, Model Theory, and Hardy Fields Lecture #22
- 103 Tameness beyond o-minimality lecture #6
- 104 Applications of o-minimality to Hodge Theory Lecture #6
- 105 Hilbert 16th problem and o-minimality lecture #7
- 106 Tameness beyond o-minimality lecture #7
- 107 Transseries, Model Theory, and Hardy Fields Lecture #23
- 108 Classifications of Dulac germs
- 109 Applications of o-minimality to Hodge Theory Lecture #7
- 110 Hilbert 16th problem and o-minimality lecture #8
- 111 Transseries, Model Theory, and Hardy Fields Lecture #24
- 112 Tameness beyond o-minimality lecture #8
- 113 Applications of o-minimality to Hodge Theory Lecture #8
- 114 Gluing together definable sets
- 115 Normal forms for logarithmic transseries
- 116 Finiteness theorems for limit cycles part 1
- 117 Finiteness theorems for limit cycles part 2
- 118 Finiteness theorems for limit cycles part 3
- 119 Multipoint Julia theorems
- 120 Nonlinear conditions for differentiability by almost analytic extension
- 121 Bounding the lenght of the first non-zero Melnikov function
- 122 Wilkie's conjecture for Pfaffian structures
- 123 Wastewater-Based Modelling to Support COVID-19 Surveillance
- 124 Superexact asymptotic series and monodromy maps of the polycycles
- 125 Fourier transform of subanalytic functions
- 126 What does an orbit tell about a parabolic diffeomorphism?
- 127 Complex cells and preparation theorems
- 128 Holomorphic continuation of R_an,exp - germs: the missing lecture
- 129 Rigidity of saddle loops
- 130 Toward a unification of infinities
- 131 Formal linearization of logarithmic transseries and analytic linearization of Dulac germs
- 132 Some remarks on the complex exponential field
- 133 o-minimal EXP-fields and Schanuel's conjecture
- 134 Towards Reduction of Singularities of Generalized Analytic Functions
- 135 An overview of the metric/geometric version of Zariski's multiplicity conjecture
- 136 Arc-wise analytic stratification
- 137 Torsion Points on Families of Abelian Varieties
- 138 Real closed fields, Peano Arithmetic and saturation properties
- 139 Dichotomy interlacement versus Hardy in definable ODE's
- 140 Semi-analytic locus of a subanalytic set
- 141 Action of a group of local diffeomorphisms on the space of curves
- 142 The automorphism group of a valued field of generalised formal power series
- 143 Local Invariant hypersurfaces for codimension one foliations. The dicritical case
- 144 Triangulation of semi-algebraic p-adic sets
- 145 Partial desingularization
- 146 Towards a description of the algebraic closure of multivariate power series
- 147 Strongly linear maps on bounded Hahn fields: applications to derivations, logarithms, automorphisms
- 148 Generalised power series determined by linear recurrence relations
- 149 Transseries and discrete dynamical systems
