Search results for "Implicit function theorem"

showing 4 items of 4 documents

Hoffman's Error Bound, Local Controllability, and Sensitivity Analysis

2000

Our aim is to present sufficient conditions ensuring Hoffman's error bound for lower semicontinuous nonconvex inequality systems and to analyze its impact on the local controllability, implicit function theorem for (non-Lipschitz) multivalued mappings, generalized equations (variational inequalities), and sensitivity analysis and on other problems like Lipschitzian properties of polyhedral multivalued mappings as well as weak sharp minima or linear conditioning. We show how the information about our sufficient conditions can be used to provide a computable constant such that Hoffman's error bound holds. We also show that this error bound is nothing but the classical Farkas lemma for linear …

Discrete mathematicsMaxima and minimaControllabilityLinear inequalityControl and OptimizationApplied MathematicsErgodicityVariational inequalityApplied mathematicsConstant (mathematics)Farkas' lemmaImplicit function theoremMathematicsSIAM Journal on Control and Optimization
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Periodic and quasi-periodic orbits of the dissipative standard map

2011

We present analytical and numerical investigations of the dynamics of the dissipative standard map. We first study the existence of periodic orbits by using a constructive version of the implicit function theorem; then, we introduce a parametric representation, which provides the interval of the drift parameter ensuring the existence of a periodic orbit with a given period. The determination of quasi--periodic attractors is efficiently obtained using the parametric representation combined with a Newton's procedure, aimed to reduce the error of the approximate solution provided by the parametric representation. These methods allow us to relate the drift parameter of the periodic orbits to th…

Dissipative standard mapApplied MathematicsMathematical analysisArnold's tonguesPeriodic sequenceStandard mapParameter spaceImplicit function theoremAttractorDissipative systemDiscrete Mathematics and CombinatoricsPeriodic orbitsArnold's tongues; Dissipative standard map; Periodic orbits; Discrete Mathematics and Combinatorics; Applied MathematicsInvariant (mathematics)Dissipative standard map; Periodic orbits; Arnold's tonguesSettore MAT/07 - Fisica MatematicaParametric statisticsMathematics
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On the existence of invariant curves of twist mappings of an annulus

1983

Mathematical analysisHolomorphic functionInvariant (mathematics)TwistImplicit function theoremIteration processRotation numberMathematics
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Regular k-Surfaces

2012

Roughly speaking, a regular surface in \(\mathbb{R}^3\) is a two-dimensional set of points, in the sense that it can be locally described by two parameters (the local coordinates) and with the property that it is smooth enough (that is, there are no vertices, edges, or self-intersections) to guarantee the existence of a tangent plane to the surface at each point.

Set (abstract data type)PhysicsSurface (mathematics)CombinatoricsLocal coordinatesTangent spacePoint (geometry)Tangent vectorSense (electronics)Implicit function theorem
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