Daniel VandenHeuvel's repositories
NaturalNeighbours.jl
Natural neighbour interpolation methods for scattered data interpolation and derivative generation of planar point sets.
ProfileLikelihood.jl
Methods for profile likelihood analysis.
InfiniteRandomArrays.jl
Infinite random arrays in Julia.
Symbolics.jl
Symbolic programming for the next generation of numerical software
TriangulArt.jl
Artify images using Delaunay Triangulation
Delaunator.jl
Delaunator in Julia
MovingBoundaryProblems1D.jl
Implementation of the finite volume method for moving boundary problems in 1D.
About.jl
Mirror of https://code.tecosaur.net/tec/About.jl
Agents.jl
Agent-based modeling framework in Julia
ArrayLayouts.jl
A Julia package for describing array layouts and more general fast linear algebra
BandedMatrices.jl
A Julia package for representing banded matrices
CheckDoc.jl
Documentation linting
ClassicalOrthogonalPolynomials.jl
A Julia package for classical orthogonal polynomials and expansions
Comodo.jl
A Julia package for computational (bio)mechanics and computational design
ContinuumArrays.jl
A package for representing quasi arrays with continuous indices
DispatchDoctor.jl
The dispatch doctor prescribes type stability
ExactPredicates.jl
Fast and exact geometrical predicates in the Euclidean plane
Ferrite.jl
Finite element toolbox for Julia
General
The official registry of general Julia packages
InfiniteArrays.jl
A Julia package for representing infinite-dimensional arrays
InfiniteLinearAlgebra.jl
A Julia repository for linear algebra with infinite matrices
LazyArrays.jl
Lazy arrays and linear algebra in Julia
LazyBandedMatrices.jl
A Julia package for lazy banded matrices
Makie.jl
Interactive data visualizations and plotting in Julia
Meshes.jl
Computational geometry and meshing algorithms in Julia
MultivariateOrthogonalPolynomials.jl
Supports approximating functions and solving differential equations on various higher dimensional domains such as disks and triangles
PiecewiseOrthogonalPolynomials.jl
A Julia package for piecewise spectral methods such as p-FEM
SemiclassicalOrthogonalPolynomials.jl
A Julia repository for semiclassical orthogonal polynomials