The following pages link to Michael Dymond (Q312264):
Displaying 21 items.
- \(\sigma\)-porosity of the set of strict contractions in a space of non-expansive mappings (Q312265) (← links)
- Differentiability inside sets with Minkowski dimension one (Q333269) (← links)
- Mapping \(n\) grid points onto a square forces an arbitrarily large Lipschitz constant (Q724264) (← links)
- Typical differentiability within an exceptionally small set (Q776923) (← links)
- Rank-one theorem and subgraphs of BV functions in Carnot groups (Q1634590) (← links)
- On interval based generalizations of absolute continuity for functions on \(\mathbb{R}^{n}\) (Q1704526) (← links)
- Porosity results for sets of strict contractions on geodesic metric spaces (Q1705676) (← links)
- An \(L^2\)-identity and pinned distance problem (Q1734000) (← links)
- The Besicovitch-Federer projection theorem is false in every infinite-dimensional Banach space (Q2014283) (← links)
- \(C^{1, \omega }\) extension formulas for $1$-jets on Hilbert spaces (Q2048635) (← links)
- On the existence of fixed points for typical nonexpansive mappings on spaces with positive curvature (Q2240537) (← links)
- Avoiding \(\sigma\)-porous sets in Hilbert spaces (Q2338693) (← links)
- Infinite-dimensional Carnot groups and Gâteaux differentiability (Q2659483) (← links)
- Highly irregular separated nets (Q2698434) (← links)
- On the structure of universal differentiability sets (Q4602506) (← links)
- A dichotomy of sets via typical differentiability (Q5135411) (← links)
- Porosity phenomena of non-expansive, Banach space mappings (Q6109878) (← links)
- Divergence of separated nets with respect to displacement equivalence (Q6183201) (← links)
- Highly irregular separated nets (Q6315589) (← links)
- On extremal nonexpansive mappings (Q6743399) (← links)
- Extending bilipschitz mappings between separated nets (Q6751038) (← links)