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Contact (mathematics)
Ian R. Porteous 9 October 1930 - 30 January 2011
Evolutes of Curves in the Lorentz-Minkowski Plane
The Illinois Mathematics Teacher
Some Remarks on Duality in S3
A Convex, Smooth and Invertible Contact Model for Trajectory Optimization
Mathematics 1
Geometric Differentiation: for the Intelligence of Curves and Surfaces: Second Edition I
Differential Geometry from a Singularity Theory Viewpoint
A Brief Introduction to Singularity Theory (A. Remizov, 2010)
In Particular, Line and Sphere Complexes – with Applications to the Theory of Partial Differential Equations
Frictional Contact on Smooth Elastic Solids
Contact Singularities in Nonstandard Slow-Fast Dynamical Systems
View Both Marks to Assess Orientation; Simply Look for the 6 O’Clock Mark As You Would with a Prism-Ballasted Lens
Consider an Ellipse Rolling/Sliding on a Plane (See Figure 1)
The Contact Structure on the Link of a Cusp Singularity 3
On the Smoothness of Value Functions and the Existence of Optimal Strategies in Diffusion Models
On Singularities of Discontinuous Vector Fields
Mathematics 1
Top View
On Computing Thom Polynomials
Analytically Differentiable Dynamics for Multi-Body Systems with Frictional Contact
Lie Sphere Geometry and Dupin Hypersurfaces Thomas E
Complex Singularities and Contact Topology Vol
Active Galactic Nuclei: the Shape of Material Around Black Holes and the Witch of Agnesi Function
Rigid Contact Lens Fitting
THE GENERAL WEB of ALGEBRAIC SURFACES of ORDER N and the INVOLUTION DEFINED by IT*
Geometry and Singularities of Spatial and Spherical
CONTACT OPTICS 156 PHYSIOLOGICAL OPTICS: Contents
Evolutes of Fronts in the Euclidean Plane
90 SINGULARITIES of the HESSIAN* 1. Introduction. It Has
Symplectic 4-Manifolds Containing Singular Rational Curves with (2, 3)-Cusp
ME 115(B): Solution to Problem Set #5
A Note on Synthesizing Geodesic Based Contact Curves
Contact with Circles and Euclidean Invariants of Smooth Surfaces in R3
ICES REPORT 14-09 Isogeometric Contact: a Review
(Aka Milnor Fillable) Contact Structure Ξcan On
Evolute and Involute
Homogeneous and H-Contact Unit Tangent Sphere Bundles
Fluid Mechanics, Topology, Cusp Singularities, and Related Matters
Arxiv:1805.08548V2 [Math.AG] 25 Feb 2019
Arxiv:1702.06371V1 [Math.GT]
MATHEMATICAL CURVES in the HIGH SCHOOL CLASSROOM Magdalena Zook John Carroll University,
[email protected]
Classification of Surfaces in Three-Sphere in Lie Sphere Geometry
Package Insert and Fitting Guide Is Intended for the Eye Care Professional, but Should Be Made Available to Patients Upon Request
The Ribaucour Transformation in Lie Sphere Geometry
SINGULARITIES PROCEEDINGS of SYMPOSIA in PURE MATHEMATICS Volume 40, Part 2
Pose and Motion from Contact
In Memoriam Ian R. Porteous 9 October 1930 - 30 January 2011
Evolutes of Plane Curves and Null Curves in Minkowski $3 $-Space
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