Listing 1 - 9 of 9 |
Sort by
|
Choose an application
RAPPELS SUR LES SOUS-VARIETES. ESPACES NORMAUX PRINCIPAUX. QUASI-OMBILICALITE.
Choose an application
517.95 --- Differential equations, Partial --- Hypergeometric functions --- Riemann surfaces --- Singularities (Mathematics) --- Geometry, Algebraic --- Surfaces, Riemann --- Functions --- Functions, Hypergeometric --- Transcendental functions --- Hypergeometric series --- Partial differential equations --- 517.95 Partial differential equations --- SINGULARITIES (Mathematics) --- Singularités (mathématiques) --- Fonctions de plusieurs variables complexes --- Singularités (mathématiques) --- Riemann, Surfaces de --- Fonctions hypergeometriques
Choose an application
Differential geometry. Global analysis --- Quasiconformal mappings --- Riemann surfaces --- 517.54 --- Surfaces, Riemann --- Functions --- Mappings, Quasiconformal --- Conformal mapping --- Functions of complex variables --- Geometric function theory --- Mappings (Mathematics) --- Conformal mapping and geometric problems in the theory of functions of a complex variable. Analytic functions and their generalizations --- Quasiconformal mappings. --- Riemann surfaces. --- 517.54 Conformal mapping and geometric problems in the theory of functions of a complex variable. Analytic functions and their generalizations
Choose an application
Mathematical physics --- Calcul tensoriel --- Relativité (physique) --- Théorie quantique --- Transformations, Groupes de --- Relativité (physique) --- Théorie quantique --- Physique mathématique --- Riemann, Variétés de
Choose an application
Differential geometry. Global analysis --- Geometry, Differential --- Géométrie différentielle --- 514.75 --- Differential geometry --- Differential geometry in spaces with fundamental groups --- 514.75 Differential geometry in spaces with fundamental groups --- Géométrie différentielle --- Geometry, Differential. --- Hypersurfaces in differential geometry --- Integral manifolds --- Lie groups --- Moving frame method --- Tangent bundle --- Tensors --- Topology(Algebraic-) --- Gauss Bonnet theorem --- Gauss theory of surfaces --- Ricci calculus --- Riemann curvature tensor --- Riemann metric
Choose an application
Complex analysis --- Analytic functions. --- Fonctions analytiques --- Analytic functions --- #WBIB:dd.Lic.L.De Busschere --- 517.53 --- machtreeksen --- integralen --- harmonisch --- Riemann --- dirichlet --- voortzetten --- holoform --- cauchy --- reeksen --- zeta --- elliptisch --- picard --- analytische functie --- conform --- Functions, Analytic --- Functions, Monogenic --- Functions, Regular --- Regular functions --- Functions of complex variables --- Series, Taylor's --- Functions of a complex variable --- 517.53 Functions of a complex variable
Choose an application
Complex analysis --- Analytical spaces --- 517.55 --- Functions of several complex variables. Approximation. Integral representations. Holomorphic functions. Entire functions --- Stein spaces. --- 517.55 Functions of several complex variables. Approximation. Integral representations. Holomorphic functions. Entire functions --- Stein spaces --- Functions of several complex variables. --- Fonctions de plusieurs variables complexes. --- Stein manifolds. --- Stein, Variétés de --- Fonctions de plusieurs variables complexes --- Stein, Variétés de --- Riemann, Surfaces de --- Variétés (mathématiques) --- Faisceaux
Choose an application
Based on a seminar sponsored by the Institute for Advanced Study in 1977-1978, this set of papers introduces micro-local analysis concisely and clearly to mathematicians with an analytical background. The papers treat the theory of microfunctions and applications such as boundary values of elliptic partial differential equations, propagation of singularities in the vicinity of degenerate characteristics, holonomic systems, Feynman integrals from the hyperfunction point of view, and harmonic analysis on Lie groups.
Mathematical analysis --- Differential geometry. Global analysis --- 517.98 --- -Advanced calculus --- Analysis (Mathematics) --- Algebra --- Functional analysis and operator theory --- Addresses, essays, lectures --- Mathematical analysis. --- Addresses, essays, lectures. --- -517.1 Mathematical analysis --- 517.98 Functional analysis and operator theory --- -Functional analysis and operator theory --- -517.98 Functional analysis and operator theory --- 517.1 Mathematical analysis --- 517.1. --- 517.1 --- Addition. --- Analytic function. --- Analytic manifold. --- Asymptotic analysis. --- Bernhard Riemann. --- Boundary value problem. --- Bounded operator. --- Cartan subgroup. --- Characterization (mathematics). --- Class function (algebra). --- Closed-form expression. --- Codimension. --- Cohomology. --- Compact space. --- Comparison theorem. --- Contact geometry. --- Continuous function. --- Continuous linear operator. --- Convex hull. --- Cotangent bundle. --- D-module. --- Degenerate bilinear form. --- Diagonal matrix. --- Differentiable manifold. --- Differential operator. --- Dimension (vector space). --- Dimension. --- Elliptic partial differential equation. --- Equation. --- Existence theorem. --- Fourier integral operator. --- Generic point. --- Group theory. --- Harmonic analysis. --- Holomorphic function. --- Holonomic. --- Homogeneous space. --- Hyperfunction. --- Hypersurface. --- Identity element. --- Irreducible representation. --- Killing form. --- Lagrangian (field theory). --- Lie algebra. --- Lie group. --- Linear differential equation. --- Locally compact space. --- Masaki Kashiwara. --- Maximal ideal. --- Monodromy. --- Natural number. --- Neighbourhood (mathematics). --- Ordinary differential equation. --- Orthogonal complement. --- Partial differential equation. --- Path integral formulation. --- Proper map. --- Pseudo-differential operator. --- Regularity theorem. --- Sigurdur Helgason (mathematician). --- Submanifold. --- Subset. --- Summation. --- Symmetric space. --- Symplectic geometry. --- Tangent cone. --- Theorem. --- Topological space. --- Vector bundle. --- Victor Guillemin. --- Weyl group. --- Analyse microlocale
Choose an application
Singularities of solutions of differential equations forms the common theme of these papers taken from a seminar held at the Institute for Advanced Study in Princeton in 1977-1978. While some of the lectures were devoted to the analysis of singularities, others focused on applications in spectral theory. As an introduction to the subject, this volume treats current research in the field in such a way that it can be studied with profit by the non-specialist.
Partial differential equations --- Differential equations, Linear --- Differential equations, Partial --- Equations différentielles linéaires --- Equations aux dérivées partielles --- Numerical solutions --- Congresses --- Solutions numériques --- Congrès --- Théorie asymptotique --- 517.95 --- -Differential equations, Partial --- -Partial differential equations --- Linear differential equations --- Linear systems --- Insect societies. --- Insects --- Congresses. --- Ecology. --- 517.95 Partial differential equations --- -517.95 Partial differential equations --- Equations différentielles linéaires --- Equations aux dérivées partielles --- Solutions numériques --- Congrès --- Théorie asymptotique --- -Hexapoda --- Insecta --- Pterygota --- Arthropoda --- Entomology --- Behavior, Animal --- Ecology --- Insecta. --- Insect societies --- Sociétés d'insectes --- Insectes --- Ecologie --- Numerical solutions&delete& --- Insects, Social --- Social insects --- Animal societies --- Behavior --- Insects. Springtails --- Animal ethology and ecology. Sociobiology --- Behavior, Animal. --- Équations aux dérivées partielles --- Solutions numériques. --- A priori estimate. --- Adjoint equation. --- Analytic continuation. --- Analytic function. --- Analytic manifold. --- Asymptote. --- Asymptotic analysis. --- Asymptotic distribution. --- Asymptotic expansion. --- Asymptotic formula. --- Big O notation. --- Calculus on manifolds. --- Canonical transformation. --- Characteristic equation. --- Characteristic function (probability theory). --- Codimension. --- Cohomology. --- Commutator. --- Complex manifold. --- Complex number. --- Continuous function (set theory). --- Continuous function. --- Covariant derivative. --- Diffeomorphism. --- Differential equation. --- Differential operator. --- Dirichlet problem. --- Eigenfunction. --- Eigenvalues and eigenvectors. --- Elementary proof. --- Elliptic boundary value problem. --- Equation. --- Equivalence class. --- Equivalence relation. --- Error term. --- Existence theorem. --- Existential quantification. --- Exponential function. --- Fourier integral operator. --- Fourier inversion theorem. --- Fourier transform. --- Functional calculus. --- Fundamental solution. --- Hamiltonian vector field. --- Hardy space. --- Harmonic analysis. --- Hermann Weyl. --- Hermitian adjoint. --- Hilbert space. --- Holomorphic function. --- Homogeneous function. --- Hyperbolic partial differential equation. --- Hyperfunction. --- Hypersurface. --- Inclusion map. --- Inequality (mathematics). --- Integer lattice. --- Integral transform. --- Irreducible representation. --- Lagrangian (field theory). --- Laplace operator. --- Limit (mathematics). --- Linear map. --- Local diffeomorphism. --- Manifold. --- Mathematical optimization. --- Maximal torus. --- Monotonic function. --- Ordinary differential equation. --- Oscillatory integral. --- Partial differential equation. --- Partition of unity. --- Poisson bracket. --- Poisson summation formula. --- Polynomial. --- Projection (linear algebra). --- Projective variety. --- Pseudo-differential operator. --- Regularity theorem. --- Renormalization. --- Riemann surface. --- Riemannian manifold. --- Riesz representation theorem. --- Self-adjoint operator. --- Self-adjoint. --- Sign (mathematics). --- Special case. --- Spectral theorem. --- Spectral theory. --- Summation. --- Support (mathematics). --- Symplectic geometry. --- Symplectic manifold. --- Taylor series. --- Theorem. --- Toeplitz operator. --- Trace class. --- Trigonometric polynomial. --- Unit disk. --- Variable (mathematics). --- Equations aux derivees partielles lineaires --- Équations aux dérivées partielles --- Solutions numériques.
Listing 1 - 9 of 9 |
Sort by
|