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- A New Method of Extension of Local Maps of Banach Spaces. Applications and Examples
- Mollifiers. from R. Showalter's Book on Pdes. (I) Mollifiers Are C
- Test Functions, Mollifiers and Convolution
- Arxiv:1703.06299V1 [Math.FA]
- 1 Distributions
- Filters, Mollifiers and the Computation of the Gibbs Phenomenon
- Pseudo-Differential Operators
- 209: Honors Analysis in Rn Differentiation and Function Spaces
- Convolution Based Smooth Approximations to the Absolute Value Function with Application to Non-Smooth Regularization
- On a Regularization Scheme for Linear Operators in Distribution Spaces with an Application to the Spherical Radon Transform∗
- Remarks on the Prehistory of Sobolev Spaces
- The Topological Degree and Applications
- The Minimization of Discontinuous Functions: Mollifier Subgradients
- Geodesic Completeness for Sobolev Hs-Metrics on the Diffeomorphisms Group of the Circle
- Bv Functions, Caccioppoli Sets and Divergence Theorem Over Wiener Spaces*
- Chapter 1: Preliminaries
- MAT218A NOTES December 10, 2017
- Lecture Notes Functional Analysis (2014/15)
- A Mollifier Approach to the Deconvolution of Probability Densities
- Efficient Quadrature Rules for Finite Element Discretizations of Nonlocal
- Arxiv:1506.08118V2 [Math.AP]
- A Finite Dimensional Realization of the Mollifier Method for Compact Operator Equations
- Second-Order Mollified Derivatives and Optimization
- 1 Lp-Spaces, Local Integrability
- Mollified Finite Element Approximants of Arbitrary Order and Smoothness
- Sobolev Spaces of Vector-Valued Functions
- Heat Kernel and Analysis on Manifolds
- Mollified Derivatives and Second-Order Optimality Conditions
- Discrete Mollification and Automatic Numerical Differentiation D
- A Concise Introduction to Colombeau Generalized Functions and Their
- Sobolev Spaces and Applications
- Dirac Delta Function 1 Dirac Delta Function
- Means As Improper Integrals
- Chapter 3: Sobolev Spaces
- APPROXIMATION of SETS of FINITE FRACTIONAL PERIMETER by SMOOTH SETS and COMPARISON of LOCAL and GLOBAL S-MINIMAL SURFACES Conten
- Spaces of Functions
- A Consistent Relaxation of Optimal Design Problems for Coupling Shape and Topological Derivatives Samuel Amstutz, Charles Dapogny, Àlex Ferrer
- The Mollification Method and the Numerical Solution of the Inverse Heat Conduction Problem by Finite Differences
- Mollification Formulas and Implicit Smoothing
- Arxiv:1809.08575V5 [Math.FA] 29 Oct 2019 P Rcinlsblvsae,Fatoa Acls Fract Calculus, Fractional Spaces, Divergence
- Optimal Filter and Mollifier for Piecewise Smooth Spectral Data