Olver, Peter - School of Mathematics, University of Minnesota

• Invariant Histograms Daniel Brinkman1
• Conservation Laws in Elasticity. IlL Planar Linear Anisotropic Elastostatics
• AIMS Lecture Notes 2006 Peter J. Olver
• Di#erential Invariants for Parametrized Projective Surfaces Gloria Mar Be#a
• SIAM J. MATH. ANAL. Vol. 23, No. 1, pp. 209-221, January 1992
• JOUKNAL OF MATHEMATI(`AL ANALYSIS AND APPLICATIONS 145, 342-356 (1990) Lie Algebras of Differential Operators
• Differential Invariants of Conformal and Projective Surfaces
• AIMS Exercise Set # 7 Peter J. Olver
• AIMS Lecture Notes 2006 Peter J. Olver
• SymmetryPreserving Numerical Methods
• Moving Frames and Differential Invariants in CentroAffine Geometry
• MAURER--CARTAN EQUATIONS FOR LIE SYMMETRY PSEUDOGROUPS OF DIFFERENTIAL EQUATIONS
• Invariant Variational Problems and Invariant Flows via Moving Frames
• Di#erential Invariants of Conformal and Projective Surfaces
• [1] Ablowitz, M.J., and Clarkson, P.A., Solitons, Nonlinear Evolution Equations and the Inverse Scattering Transform, L.M.S. Lecture Notes in Math., vol. 149, Cambridge
• Generalized Functions and Green's Functions Boundary value problems, involving both ordinary and partial differential equations,
• Centre de Recherches Math'ematiques CRM Proceedings and Lecture Notes
• AIMS Exercise Set # 6 Peter J. Olver
• A Plethora of Integrable BiHamiltonian Equations A.S. Fokas 1
• Affine Geometry, Curve Flows, and Invariant Numerical Approximations
• NonAssociative Local Lie Groups Peter J. Olver +
• Geodesic Flow and Two (Super) Component Analog of the Camassa--Holm Equation
• Canonical Forms for BiHamiltonian Systems Peter J. Olver
• Symmetry, Integrability and Geometry: Methods and Applications SIGMA * (200*), ***, 9 pages Pohozhaev Identities and Non-Existence Results
• The Planar Laplace Equation The fundamental partial differential equations that govern the equilibrium mechanics
• CONVERGENCE OF SOLITARYWAVE SOLUTIONS IN A PERTURBED BIHAMILTONIAN DYNAMICAL SYSTEM.
• Conformal curvature flows: from phase transitions to active vision
• Di#erential Invariant Algebras of Lie Pseudo--Groups Peter J. Olver +
• Recursive Moving Frames Peter J. Olver +
• Corrections to the corrected printing and paperback edition of Olver, P.J., Applications of Lie Groups to Differential Equations,
• TriHamiltonian Duality Between Solitons and Compactons Peter J. Olver y
• Dynamics of Planar Media In Sections 4.3 and 5.3, we studied the equilibrium configurations of planar media
• New QuasiExactly Solvable Hamiltonians in Two Dimensions
• Joint Invariant Signatures Peter J. Olver +
• Geometric Foundations of Numerical Algorithms and Symmetry
• PERSISTENCE OF FREENESS FOR LIE PSEUDOGROUP ACTIONS
• Invariant Modules and the Reduction of Nonlinear Partial Di#erential Equations
• Symmetry, Integrability and Geometry: Methods and Applications SIGMA * (200*), ***, 9 pages Pohozhaev Identities and NonExistence Results
• Applied Linear Algebra Peter J. Olver
• Applied Linear Algebra by Peter J. Olver and Chehrzad Shakiban
• Applied Linear Algebra by Peter J. Olver and Chehrzad Shakiban
• CORRECTIONS TO SECOND PRINTING OF Olver, P.J., Equivalence, Invariants, and Symmetry,
• Corrections to the first printing of Olver, P.J., Applications of Lie Groups to Differential Equations,
• Symbol Index Applied Linear Algebra, by Peter J. Olver and Chehrzad Shakiban
• What are Partial Differential Equations? Let us begin by specifying our object of study. A differential equation is an equation
• Fourier Series Just before 1800, the French mathematician/physicist/engineer Jean Baptiste Joseph
• Separation of Variables There are three paradigmatic linear partial differential equations, and they have col-
• Numerical Methods As you know, most differential equations are far too complicated to be solved by an
• Partial Differential Equations in Space At last we have reached the ultimate rung of the dimensional ladder (at least for
• Complex Numbers The purpose of this short appendix is to review the basics of complex numbers and
• Recent Advances in the Theory and Application of Lie PseudoGroups
• PERSISTENCE OF FREENESS FOR LIE PSEUDOGROUP ACTIONS
• Lie Completion of Pseudo-Groups Vladimir Itskov Peter J. Olver1
• Poisson Structures for Geometric Curve Flows in Semi-simple Homogeneous Spaces
• On the Structure of Lie Pseudo-Groups Peter J. Olver1
• Lectures on Moving Frames Peter J. Olver
• Invariant Submanifold Flows Peter J. Olver
• ALGORITHMS FOR DIFFERENTIAL INVARIANTS OF SYMMETRY GROUPS OF DIFFERENTIAL EQUATIONS
• Numerical Invariantization for Morphological PDE Schemes
• MAURERCARTAN EQUATIONS FOR LIE SYMMETRY PSEUDO-GROUPS OF DIFFERENTIAL EQUATIONS
• Geometric Integration via Multi-space Pilwon Kim and Peter J. Olver
• Corrections to Kogan, I.A., and Olver, P.J., The invariant variational bicomplex, Contemp. Math.
• Geometric Foundations of Numerical Algorithms and Symmetry
• Moving Coframes II. Regularization and Theoretical Foundations
• Moving Coframes. I. A Practical Algorithm
• On Relative Invariants School of Mathematics
• Equivalence and the Cartan Form Peter J. Olver
• INVARIANT THEORY, EQUIVALENCE PROBLEMS, AND THE CALCULUS OF VARIATIONS *
• SIAM J. MATH. ANAL. Vol. 20, No. 5, pp. 1172-1185, September 1989
• RESEARCH ANNOUNCEMENTS BULLETIN (New Series) OF THE
• AFFINE INVARIANT SURFACE EVOLUTIONS FOR 3D IMAGE SEGMENTATION Yogesh Rathi, Peter Olver, Guillermo Sapiro, Allen Tannenbaum
• NL3344 Lie algebras and Lie groups 1 NL3344 Lie algebras and Lie groups
• Invariant Modules and the Reduction of Nonlinear Partial Differential Equations
• Symmetry and the Chazy Equation Peter A. Clarkson z
• Applied Numerical Mathematics 10 (1992) 307-324 North-Holland
• SIAM J. APPL. MATH. ? 1987 Society for Industrial and Applied Mathematics Vol. 47, No. 2, April 1987 005
• LIE ALGEBRAS OF DIFFERENTIAL OPERATORS IN TWO COMPLEX VARIABLES
• Dispersive Quantization Peter J. Olver
• J. Fluid Mech. (1982), vol. 125, pp. 137-185 Printed in @eat Britain
• Multi-Hamiltonian structure of the Born-Infeld equation Department ofMathematics, Technical University ofIstanbul, Istanbul, Turkey
• Hamiltonian structures for systems of hyperbolic conservation laws Peter J. Olver
• JOURNAL OF DIFFERENTIAL EQUATIONS 71, l&33 (1988) Darboux' Theorem for Hamiltonian Differential Operators
• Math. Proc. Camb. Phil. Soc. (1980), 88, 71 7 1 Printed in Great Britain
• Symmetry, Integrability and Geometry: Methods and Applications SIGMA * (200*), ***, 9 pages Pohozhaev and Morawetz Identities
• Journal of Elasticity 19:189-212 (1988) Kluwer AcademicPublishers,Dordrecht -Printed in the Netherlands 189
• Math. Proc. Camb. Phil. Soc. (1985), 97, 511 5 1 1 Printed in Qreat Britain
• Conservation Laws in Elasticity II. Linear Homogeneous Isotropic Elastostatics
• "Conservation Laws in Elasticity II. Linear Homogeneous Isotropic Elastostatics"
• Conservation Laws in Elasticity L General Results
• Generalized Transvectants Siegel Modular Forms
• Invariant Theory Differential Equations
• Math. Proe. Camb. Phil. Soc. (1983), 94, 529 5 2 9 Printed in Great Britain
• Boundary Value Problems in One Dimension While its roots are firmly planted in the finite-dimensional world of matrices and
• Fourier Analysis In addition to their inestimable importance in mathematics and its applications,
• Nonlinear Systems Nonlinearity is ubiquitous in physical phenomena. Fluid and plasma mechanics, gas
• Nonlinear Partial Differential Equations The ultimate topic to be touched on in this book is the vast and active field of nonlinear
• [1] Ablowitz, M.J., and Clarkson, P.A., Solitons, Nonlinear Evolution Equations and the Inverse Scattering Transform, L.M.S. Lecture Notes in Math., vol. 149, Cambridge
• Numerical Analysis Lecture Notes Peter J. Olver
• Numerical Analysis Lecture Notes Peter J. Olver
• Numerical Analysis Lecture Notes Peter J. Olver
• Numerical Analysis Lecture Notes Peter J. Olver
• Numerical Analysis Lecture Notes Peter J. Olver
• University of Minnesota Twin Cities Campus School ofMathematics 127 Vincent Hall
• Poisson Structures and Integrability
• Moving Frames in Applications
• Moving Frames Peter J. Olver
• Differential Invariants of Surfaces
• Moving Frames? Peter J. Olver
• Moving Frames Differential Invariants
• Moving Frames Peter J. Olver
• Invariant Variational Integrable Curve Flows
• Moving Frames Peter J. Olver
• Non-Associative Peter J. Olver
• Very Basic MATLAB Peter J. Olver
• Moving Frames and Singularities of Prolonged Group Actions
• AIMS Lecture Notes 2006 Peter J. Olver
• AIMS Lecture Notes 2006 Peter J. Olver
• AIMS Lecture Notes 2006 Peter J. Olver
• AIMS Exercise Set # 1 Peter J. Olver
• AIMS Exercise Set # 4 Peter J. Olver
• AIMS Exercise Set # 6 Peter J. Olver
• NUMERICAL ANALYSIS PROGRAMS IN MATLAB About the Program Disk
• Fourier Transforms Fourier series and their ilk are designed to solve boundary value problems on bounded
• Computational Aspects Moving Frames
• AIMS Lecture Notes 2006 Peter J. Olver
• Proceedingsof the 34th Conferenceon Decision 8, Control
• To appear: Algebraic and Geometric Structures in Di erential Equations, Proceedings, Univeristy of Twente, 1993.
• On Multivariate Interpolation Peter J. Olver +
• Partial Di#erential Equations in Three--Dimensional Space
• The Calculus of Variations We have already had ample opportunity to exploit Nature's propensity to minimize.
• The Calculus of Variations We have already had ample opportunity to exploit Nature's propensity to minimize.
• SIAM J. MATH. ANAL. ol. 23, No. 5, pp. 1141-1166, September 1992
• Orthogonal Bases and the QR Algorithm by Peter J. Olver
• Differential and Numerically Invariant Signature Curves Applied to Object Recognition
• AIMS Lecture Notes 2006 Peter J. Olver
• Joint Invariant Signatures Peter J. Olver
• Contemporary Mathematics The Invariant Variational Bicomplex
• Dispersive Quantization Peter J. Olver +
• Invariant EulerLagrange Equations and the Invariant Variational Bicomplex
• Integrable Evolution Equations on Associative Algebras
• Geometric Integration via Multispace Pilwon Kim and Peter J. Olver #
• INVARIANT GEOMETRIC EVOLUTIONS OF SURFACES AND VOLUMETRIC SMOOTHING \Lambda
• Moving Frames and Di#erential Invariants in Centro--A#ne Geometry
• Nonlinearity 5 (1952) 601-621. Printed in the UK Equivalence of higher-order Lagrangians: 111. New
• Nonlinearity 1 (1988) 389-398. Printed in the UK The structure of nul! Lagrangians
• Moving Frames in Classical Invariant
• AIMS Lecture Notes 2006 Peter J. Olver
• AIMS Lecture Notes 2006 Peter J. Olver
• Moving Coframes. I. A Practical Algorithm
• Di#erential and Numerically Invariant Signature Curves Applied to Object Recognition
• NonAbelian Integrable Systems of the Derivative Nonlinear Schrodinger Type
• [1] Alligood, K.T., Sauer, T.D., and Yorke, J.A., Chaos. An Introduction to Dynamical Systems, SpringerVerlag, New York, 1997.
• Lectures on Moving Frames Peter J. Olver +
• QUASIEXACT SOLVABILITY Artemio Gonz' alezL' opez, Niky Kamran, and Peter J. Olver
• ALGORITHMS FOR DIFFERENTIAL INVARIANTS OF SYMMETRY GROUPS OF DIFFERENTIAL EQUATIONS
• Nonlinear Systems Nonlinearity is ubiquitous in physical phenomena. Fluid and plasma mechanics, gas
• Numerical Analysis Lecture Notes Peter J. Olver
• Geodesic Flow and Two (Super) Component Analog of the CamassaHolm Equation
• NONCLASSICAL AND CONDITIONAL SYMMETRIES Peter J. Olver, Evgenii M. Vorob'ev
• Non-Associative Local Lie Groups Peter J. Olver
• AIMS Lecture Notes 2006 Peter J. Olver
• Differential Invariants and Invariant Differential Equations Peter J. Olver y
• CONVERGENCE OF SOLITARYWAVE SOLUTIONS IN A PERTURBED BIHAMILTONIAN DYNAMICAL SYSTEM.
• NONCLASSICAL AND CONDITIONAL SYMMETRIES Peter J. Olver, Evgenii M. Vorob'ev
• Affine Invariant Gradient Flows \Lambda Peter J. Olver 1 , Guillermo Sapiro 2 , and Allen Tannenbaum 1
• AIMS Lecture Notes 2006 Peter J. Olver
• AIMS Exercise Set # 2 Peter J. Olver
• PseudoStabilization of Prolonged Group Actions
• Canonical Forms and Conservation Laws in Linear Elastostatics
• Table of Contents Chapter 1. What are Partial Differential Equations? . . . . . . 1
• Corrections and Comments on Classical Invariant Theory, by P.J. Olver
• An Introduction to Moving Frames Peter J. Olver
• Di erential Invariants and Invariant Di erential Equations Peter J. Olver y
• A Survey of Moving Frames Peter J. Olver
• Dispersive Quantization Peter J. Olver
• Moving Frames and Moving Coframes Mark Fels +
• AIMS Lecture Notes 2006 Peter J. Olver
• AIMS Lecture Notes 2006 Peter J. Olver
• Radon Series Comp. Appl. Math 1, 1--28 c # de Gruyter 2007
• AIMS Exercise Set # 1 Peter J. Olver
• To appear: Algebraic and Geometric Structures in Differential Equations, Proceedings, Univeristy of Twente, 1993.
• Di#erential Invariants of Surfaces Peter J. Olver +
• Geometric Snakes for Edge Detection and Segmentation of Medical Imagery
• Real Lie Algebras of Differential Operators and QuasiExactly Solvable Potentials
• Generalized Transvectants Siegel Modular Forms
• AIMS Lecture Notes 2006 Peter J. Olver
• AIMS Lecture Notes 2006 Peter J. Olver
• TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY
• Symmetries of Polynomials \Lambda Irina Berchenko
• Direct Reduction and Di#erential Constraints Peter J. Olver +
• Moving Frames Peter J. Olver +
• Lie PseudoGroups Peter J. Olver
• Poisson Structures for Geometric Curve Flows in Semisimple Homogeneous Spaces
• Moving Frames ---in Geometry, Algebra, Computer Vision, and Numerical Analysis
• Lie Completion of PseudoGroups Vladimir Itskov Peter J. Olver 1
• The Canonical Contact Form Peter J. Olver +
• AIMS Lecture Notes 2006 Peter J. Olver
• NL3344 Lie algebras and Lie groups 1 NL3344 Lie algebras and Lie groups
• Moving Frames for Lie Pseudo--Groups Peter J. Olver +
• On the Structure of Lie PseudoGroups Peter J. Olver 1 Juha Pohjanpelto 2
• Contemporary Mathematics The Invariant Variational Bicomplex
• JOURNAL OF DIFFERENTIAL EQUATIONS 80, 32-78 (1989) Equivalence Problems for
• Numerical Analysis Lecture Notes Peter J. Olver
• Moving Frames and Joint Differential Invariants Peter J. Olver y
• Symmetry and the Chazy Equation Peter A. Clarkson z
• INVARIANT THEORY, EQUIVALENCE PROBLEMS, AND THE CALCULUS OF VARIATIONS *
• Classification and Uniqueness of Invariant Geometric Flows 1
• AIMS Lecture Notes 2006 Peter J. Olver
• Complex Analysis and Conformal Mapping The term "complex analysis" refers to the calculus of complex-valued functions f(z)
• Numerical Analysis Lecture Notes Peter J. Olver
• Differential Invariant Peter J. Olver
• Direct Reduction and Differential Constraints Peter J. Olver
• Radon Series Comp. Appl. Math 1, 128 c de Gruyter 2007 Differential Invariants for Lie Pseudo-groups
• Numerical Analysis Lecture Notes Peter J. Olver
• AIMS Exercise Set # 2 Peter J. Olver
• Moving Frames Peter J. Olver y
• AIMS Lecture Notes 2006 Peter J. Olver
• Moving Coframes II. Regularization and Theoretical Foundations
• Di#erential Invariant Algebras Peter J. Olver +
• Nonlinear Partial Di#erential Equations The ultimate topic to be touched on in this book is the vast and active field of nonlinear
• Evolution equations possessing infinitely many symmetries Peter J. Olver
• Local Symplectic Invariants for Curves Niky Kamran1
• InfiniteDimensional Symmetry Groups
• CORRECTIONS TO FIRST AND SECOND PRINTINGS OF Olver, P.J., Equivalence, Invariants, and Symmetry,
• Nonlocal Symmetries and Ghosts Peter J. Olver +
• AIMS Lecture Notes 2006 Peter J. Olver
• Very Basic MATLAB Peter J. Olver
• AIMS Exercise Set # 3 Peter J. Olver
• Volume 114A, number 3 PHYSICS LETTERS 10 February 1986 THE CONSTRUCTION OF SPECIAL SOLUTIONS
• Maximal Entropy for Reconstruction of Back Projection Images
• Moving Frames and Singularities of Prolonged Group Actions
• AIMS Lecture Notes 2006 Peter J. Olver
• 1 Introduction 2 2 Basic Invariant Theory 3
• Numerical Invariantization for Morphological PDE Schemes
• Contemporary Mathematics Volume 28, 1984
• J. Phyr. A Math. Gen. 24 (1991) 3Y9S-4008. Printed in the U K Quasi-exactly solvable Lie algebras of differential operators in
• Symmetry Methods for Differential Equations
• AIMS Lecture Notes 2006 Peter J. Olver
• Symmetry, Integrability and Geometry: Methods and Applications SIGMA * (200*), ***, 9 pages Pohozhaev and Morawetz Identities
• A General Framework for Linear Partial Differential Equations
• Invariant Signatures Peter J. Olver
• Numerical Analysis Lecture Notes Peter J. Olver
• Applied Linear Algebra by Peter J. Olver and Chehrzad Shakiban
• Differential Invariants for Parametrized Projective Surfaces Gloria Mari Beffa
• Differential Invariant Algebras Peter J. Olver
• Numerical Analysis Lecture Notes Peter J. Olver
• Invariant Variational Problems and Invariant Flows via Moving Frames
• Invariant Histograms Daniel Brinkman1
• JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS 89, 233-250 (1982) A Nonlinear Hamiltonian Structure for the Euler
• Moving Frames and Singularities of Prolonged Group Actions
• Boundary Value Problems in One Dimension While its roots are firmly planted in the finitedimensional world of matrices and
• Wellposedness and Blowup Solutions for an Integrable Nonlinearly Dispersive Model Wave Equation
• An Introduction to Moving Frames Peter J. Olver
• MOVING FRAMES: A BRIEF SURVEY PETER J. OLVER
• The Planar Laplace Equation The fundamental partial di#erential equations that govern the equilibrium mechanics
• Fourier Series Just before 1800, the French mathematician/physicist/engineer Jean Baptiste Joseph
• MaurerCartan Forms and the Structure of Lie PseudoGroups
• JOURNAL OF ALGEBRA 148, 68-85 (1992) Explicit Generalized Pieri Maps
• A QuasiExactly Solvable Travel Guide Peter J. Olver
• Journal of Nonlinear Mathematical Physics 20**, Volume *, Number *, 1{9 Article Ghost Symmetries
• Recent Advances in the Theory and Application of Lie Pseudo--Groups
• Normalizability of Onedimensional Quasiexactly Solvable Schrodinger Operators
• PSEUDO--GROUPS, MOVING FRAMES, AND DIFFERENTIAL INVARIANTS
• Classification of Invariant Wave Equations Rafael Hern'andez Heredero 1 and Peter J. Olver 2
• The Absolute Value of Functions Peter J. Olver y
• AIMS Lecture Notes 2006 Peter J. Olver
• Generating Differential Invariants Peter J. Olver
• Differential Invariants of Maximally Symmetric Submanifolds
• October 11, 2004 14:39 Proceedings Trim Size: 9in x 6in orbits REGULARITY OF PSEUDOGROUP ORBITS
• Differential Invariant Algebras of Lie PseudoGroups Peter J. Olver
• Variational Integrators for Hamiltonizable Nonholonomic Systems O.E. Fernandez
• Numerical Analysis Lecture Notes Peter J. Olver
• Dirac's theory of constraints in field theory and the canonical form of Hamiltonian differential operators
• Corrections to Kogan, I.A., and Olver, P.J., Invariant Euler-Lagrange equations and the invariant
• AIMS Lecture Notes 2006 Peter J. Olver
• Invariant Euler-Lagrange Equations and the Invariant Variational Bicomplex
• Gradient Flows and Geometric Active Contour Models Satyanad Kichenassamy
• Invariant Histograms Daniel Brinkman 1 Peter J. Olver 1
• Complex Analysis The term ``complex analysis'' refers to the calculus of complexvalued functions f(z)
• Affine Invariant Detection: Edge Maps, Anisotropic Diffusion, and Active Contours \Lambda
• Equivalence and the Cartan Form Peter J. Olver y
• ADVANCES IN MATHEMATICS 75, 212-245 ( 1989) Graph Theory and Classical Invariant Theory
• SIAM J. MATH. ANAL. Voi. 17, No. 4, July 1986
• Moving Frames Differential Invariants
• !"$#!%'&)(103254687 @9BADC5 EFGAH&@%I&9PQ# RTSVU5A%Q&6)CPB2 R#!%TW XY&6"&6UB`Aba
• SIAM J. MATH. ANAL. Vol. 14, No. 3, May 1983
• Moving Frames for Lie PseudoGroups
• PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
• Math. Proc. Camb. Phil. Soc. (1979), 85, 143 1 4 3 Printed in Great Britain
• Applied Linear Algebra by Peter J. Olver and Chehrzad Shakiban
• PSEUDOGROUPS, MOVING FRAMES, AND DIFFERENTIAL INVARIANTS
• Linear and Nonlinear Waves To begin exploring the vast mathematical continent that is partial differential equa-
• Transvectants, Modular Forms, and the Heisenberg Algebra Peter J. Olver y
• Fourier Analysis In addition to their inestimable importance in mathematics and its applications,
• Di#erential Invariants of Maximally Symmetric Submanifolds
• Classification of Integrable OneComponent Systems on Associative Algebras
• Moving Frames and Moving Coframes School of Mathematics
• Moving Frames for Lie PseudoGroups Peter J. Olver
• Linear and Nonlinear Evolution Equations In this chapter, we analyze some of the most important evolution equations, both
• Linear Algebra In this appendix, we collect basic results and definitions from linear algebra that are
• ADVANCES IN APPLIED MATHEMATICS 9, 226-257 (1988) The Equivalence Problem and Canonical Forms
• [1] Ablowitz, M.J., and Clarkson, P.A., Solitons, Nonlinear Evolution Equations and the Inverse Scattering Transform, L.M.S. Lecture Notes in Math., vol. 149, Cambridge
• Complex Analysis The term "complex analysis" refers to the calculus of complex-valued functions f(z)
• AIMS Lecture Notes 2006 Peter J. Olver
• Nonlinear Ordinary Di#erential Equations This chapter is concerned with initial value problems for systems of ordinary di#er
• July 13, 2007 11:38 WSPC Proceedings Trim Size: 9in x 6in otranto MOVING FRAMES AND DIFFERENTIAL INVARIANTS
• AIMS Exercise Set # 7 Peter J. Olver
• AIMS Lecture Notes 2006 Peter J. Olver
• July 13, 2007 11:38 WSPC -Proceedings Trim Size: 9in x 6in otranto MOVING FRAMES AND DIFFERENTIAL INVARIANTS
• Geometric Integration Algorithms on Homogeneous Manifolds Debra Lewis and Peter J. Olver y
• AIMS Lecture Notes 2006 Peter J. Olver
• Invariant Numerical Approximations to Differential Invariant Signatures
• Affine Invariant Detection: Edges, Active Contours, and Segments \Lambda
• Numerical Analysis Lecture Notes Peter J. Olver
• Corrections to Olver, P.J., Invariant submanifold flows, J. Phys. A 41 (2008), 344017.
• [1] Alligood, K.T., Sauer, T.D., and Yorke, J.A., Chaos. An Introduction to Dynamical Systems, Springer-Verlag, New York, 1997.
• AIMS Exercise Set # 4 Peter J. Olver
• A Survey of Moving Frames Peter J. Olver
• Generating Di#erential Invariants Peter J. Olver +
• New QuasiExactly Solvable Hamiltonians in Two Dimensions
• AIMS Exercise Set # 3 Peter J. Olver
• A Gradient Surface Evolution Approach to 3D Segmentation
• Invariant Submanifold Flows Peter J. Olver +
• Solitary Waves in the Critical Surface Tension Model Brian T.N. Gunney
• LIE ALGEBRAS OF DIFFERENTIAL OPERATORS AND PARTIAL INTEGRABILITY x
• Recursive Moving Frames Peter J. Olver
• Nonlinear Ordinary Differential Equations This chapter is concerned with initial value problems for systems of ordinary differ-
• Numerical Analysis Lecture Notes Peter J. Olver
• Maximal Entropy for Reconstruction of Back Projection Images
• Fourier Series Just before 1800, the French mathematician/physicist/engineer Jean Baptiste Joseph
• Maurer--Cartan Forms and the Structure of Lie Pseudo--Groups
• Local Symplectic Invariants for Curves Niky Kamran 1 , Peter Olver 2 and Keti Tenenblat 3
• On formal integrability of evolution equations and local geometry of surfaces
• LIE ALGEBRAS OF VECTOR FIELDS IN THE REAL PLANE
• Volume 148,number 3,4 PHYSICS LETTERS A 13 August 1990 Canonical forms and integrability of bi-Hamiltonian systems `~
• Invariant Signatures for Recognition
• The Canonical Contact Form Peter J. Olver
• VARIATIONAL C -SYMMETRIES AND
• AIMS Lecture Notes 2006 Peter J. Olver
• 96 B.7. LIE GROUPS AND DIFFERENTIAL EQUATIONS B.7 Lie Groups and Differential Equations
• AIMS Lecture Notes 2006 Peter J. Olver
• On Relative Invariants Mark Fels +
• VARIATIONAL C # -SYMMETRIES AND EULERLAGRANGE EQUATIONS
• October 11, 2004 14:39 Proceedings Trim Size: 9in x 6in orbits REGULARITY OF PSEUDOGROUP ORBITS
• Corrections to Kogan, I.A., and Olver, P.J., Invariant EulerLagrange equations and the invariant
• Classification of Invariant Wave Equations Rafael Hern'andez Heredero y
• Quantization of bi-Hamiltonian systems Department ofMathematics, Clarkson University, Potsdam, New York 1J676
• Differential Invariants of Surfaces Peter J. Olver
• Invariant Variational Problems Integrable Curve Flows
• Partial Differential Equations in ThreeDimensional Space
• On Multivariate Interpolation Peter J. Olver
• Extensions of Invariant Signatures for Object Recognition Daniel J. Hoff1
• Numerical Methods: Finite Differences As you know, the differential equations that can be solved by an explicit analytic
• Numerical Methods: Finite Elements In Chapter 5, we introduced the first, oldest, and in many ways simplest broad class
• Extensions of Invariant Signatures for Object Recognition Daniel J. Ho# 1 Peter J. Olver 1
• Dispersive Quantization Peter J. Olver
• November 15, 2011 Homework #6 Solutions
• October 6, 2011 Homework #3 Solutions
• Journals in Flux Peter J. Olver
• October 25, 2011 Homework #4 Solutions
• November 8, 2011 Homework #5 Solutions
• Invariant Histograms and Signatures for Object
• December 9, 2011 Homework #7 Solutions
• September 28, 2011 Homework #1 Solutions
• October 1, 2011 Homework #2 Solutions
• Canonical Forms for BiHamiltonian Systems Peter J. Olver
• February 15, 2012 Homework #3 Solutions
• Power Series and Special Functions A special function is a function --usually of a single variable --that arises in suffi-
• Automatic Solution of Jigsaw Puzzles Daniel J. Hoff1
• February 3, 2012 Homework #1 Solutions
• COMMITTEE ON ELECTRONIC INFORMATION AND COMMUNICATION (CEIC) Terms of reference
• Vector Calculus in Three Dimensions In this appendix, we review the fundamentals of three-dimensional vector calculus.
• Vector Calculus in Two Dimensions The purpose of this appendix is to review the basics of vector calculus in the two
• February 15, 2012 Homework #2 Solutions
• WAVE-BREAKING AND PEAKONS FOR A MODIFIED CAMASSAHOLM GUILONG GUI, YUE LIU, PETER J. OLVER, AND CHANGZHENG QU
• Table of Contents Chapter 1. What are Partial Differential Equations? . . . . . . 1