This site is devoted to mathematics and its applications. Created and run by Peter Saveliev.

# Double redirects

From Mathematics Is A Science

Jump to navigationJump to searchThis page lists pages that redirect to other redirect pages.
Each row contains links to the first and second redirect, as well as the target of the second redirect, which is usually the "real" target page to which the first redirect should point.
~~Crossed out~~ entries have been solved.

Showing below up to **50** results in range #**1** to #**50**.

View (previous 50 | next 50) (20 | 50 | 100 | 250 | 500)

- Acyclic rank → Acyclic ranks → Acyclic ranking
- Algebra of forms → Algebra of differential forms → Differential forms
- Algebraic operations with discrete differential forms → Algebra of discrete differential forms → Discrete forms
- Algebra of Forms → Algebra of forms → Algebra of differential forms
- Algebraic operations with forms → Algebraic operations with discrete differential forms → Algebra of discrete differential forms
- Exterior calculus of discrete forms → Algebraic operations with forms continued → Algebraic operations with forms and cohomology
- Chapter 4: Antiderivatives → Antiderivatives → Reversing differentiation: antiderivatives
- Anti-derivative → Antiderivatives → Reversing differentiation: antiderivatives
- Anti-symmetric → Antisymmetry → Multilinear algebra
- Anti-symmetry → Antisymmetry → Multilinear algebra
- Antisymmetric → Antisymmetry → Multilinear algebra
- Netflix prize → Application of discrete forms → Applications of discrete forms
- Chapter 4: Farmer's Fence Revisited → Applications of derivative: farmer's fence revisited → Applications of derivative: optimization
- Application of discrete forms → Applications of discrete forms → Ranking movies with discrete differential forms
- Bases → Basis → Basis of a vector space
- Betti number → Betti numbers → Topology
- Monochromatic images → Binary Images → Binary images
- Binary image → Binary Images → Binary images
- Border → Boundary → Topological spaces#Classification of points with respect to a subset
- Boundaries → Boundary → Topological spaces#Classification of points with respect to a subset
- Brouwer Fixed Point Theorem → Brouwer fixed point theorem → Euler and Lefschetz numbers#Fixed points
- DiffFormsChapter2 Page 1 → Calculus in a curved universe → Manifolds model a curved universe
- Calculus is topology → Calculus is the dual of topology → Topology
- Topology and calculus → Calculus is topology → Calculus is the dual of topology
- Discrete exterior derivative → Calculus of discrete differential forms → Discrete forms
- Homology of balls and spheres → Cell complexes → Cell complex
- Complexes → Cell complexes → Cell complex
- Chain rule → Chain Rule → Chain rule of differentiation
- Chain operator → Chain operators → Cell maps
- Interior → Classification of points with respect to a subset → Topological spaces
- Interior and Closure → Classification of points with respect to a subset → Topological spaces
- Frontier → Classification of points with respect to a subset → Topological spaces
- Closure → Classification of points with respect to a subset → Topological spaces
- Co-chain → Cochain → Cochains
- Cochain maps → Cochain operators → Cohomology#Homology vs. cohomology maps
- Co-chains → Cochains → Cochains on graphs
- Cochain → Cochains → Cochains on graphs
- Commutative → Commutative diagram → Maps of graphs#Commutative diagrams
- Commutative diagrams → Commutative diagram → Maps of graphs#Commutative diagrams
- Commute → Commutative diagram → Maps of graphs#Commutative diagrams
- Commutes → Commutative diagram → Maps of graphs#Commutative diagrams
- Diagram commutes → Commutative diagram → Maps of graphs#Commutative diagrams
- Compact → Compactness → Compact spaces
- Compact sets → Compactness → Compact spaces
- Compact space → Compactness → Compact spaces
- Computational Topology → Computational topology → Topology Illustrated
- Configuration space → Configuration spaces → Products#Configuration spaces
- Component → Connected component → Connectedness
- Components → Connected components → Objects in binary images
- Path connected → Connectedness → Path-connectedness