The following pages link to Lipschitz $p$-summing operators (Q3395571):
Displaying 50 items.
- A new approach on Lipschitz compact operators (Q266301) (← links)
- Nonlinear absolutely summing operators revisited (Q272179) (← links)
- Improving integrability via absolute summability: a general version of Diestel's theorem (Q291983) (← links)
- Absolutely summing Lipschitz conjugates (Q305856) (← links)
- Abstract extrapolation theorems for absolutely summing nonlinear operators (Q401399) (← links)
- Lipschitz \(p\)-integral operators and Lipschitz \(p\)-nuclear operators (Q435113) (← links)
- Some properties of Lipschitz strongly \(p\)-summing operators (Q472346) (← links)
- Lipschitz factorization through subsets of Hilbert space (Q489070) (← links)
- On the Hadamard sequence spaces \(h^p(X)\) and the \(p\)-summing operators (Q493329) (← links)
- A general Pietsch domination theorem (Q616721) (← links)
- Duality for Lipschitz \(p\)-summing operators (Q642511) (← links)
- Some techniques on nonlinear analysis and applications (Q655376) (← links)
- On summability of nonlinear mappings: a new approach (Q663257) (← links)
- The Lipschitz injective hull of Lipschitz operator ideals and applications (Q778780) (← links)
- Power-aggregation of pseudometrics and the McShane-Whitney extension theorem for Lipschitz \(p\)-concave maps (Q829589) (← links)
- A unified Pietsch domination theorem (Q847775) (← links)
- Lipschitz operator ideals and the approximation property (Q905951) (← links)
- Lipschitz \((p,r,s)\)-integral operators and Lipschitz \((p,r,s)\)-nuclear operators (Q1706529) (← links)
- Positively \(p\)-nuclear operators, positively \(p\)-integral operators and approximation properties (Q2114851) (← links)
- Nonlinear variants of a theorem of Kwapień (Q2143230) (← links)
- Lipschitz \(p\)-summing multilinear operators (Q2182596) (← links)
- Two-Lipschitz operator ideals (Q2207646) (← links)
- Lipschitz \(p\)-lattice summing operators (Q2232304) (← links)
- The duality between ideals of multilinear operators and tensor norms (Q2293239) (← links)
- Lipschitz \(p\)-compact mappings (Q2313389) (← links)
- Lipschitz compact operators (Q2338900) (← links)
- Lipschitz Grothendieck-integral operators (Q2341473) (← links)
- Galois connection between Lipschitz and linear operator ideals and minimal Lipschitz operator ideals (Q2420436) (← links)
- Sharp coincidences for absolutely summing multilinear operators (Q2442226) (← links)
- Lipschitz \((q, p)\)-summing maps from \(C(K)\)-spaces to metric spaces (Q2688201) (← links)
- Lipschitz \((q,p)\)-mixing operators (Q2845735) (← links)
- Remarks on Lipschitz 𝑝-summing operators (Q3020376) (← links)
- Computations of Lipschitz summing norms and applications (Q4997546) (← links)
- Interpolative Lipschitz ideals (Q5037769) (← links)
- Lipschitz 𝑝-summing multilinear operators correspond to Lipschitz 𝑝-summing operators (Q5049325) (← links)
- Lipschitz integral operators represented by vector measures (Q5049568) (← links)
- (Q5085890) (← links)
- Lipschitz subtype (Q5143157) (← links)
- The Segre cone of Banach spaces and multilinear mappings (Q5217491) (← links)
- New types of Lipschitz summing maps between metric spaces (Q5275857) (← links)
- POINTWISE CONSTRUCTION OF LIPSCHITZ AGGREGATION OPERATORS WITH SPECIFIC PROPERTIES (Q5297797) (← links)
- Strongly \((p,\sigma)\)-Lipschitz operators (Q6049464) (← links)
- Cohen strongly \(p\)-summing holomorphic mappings on Banach spaces (Q6104037) (← links)
- \(p\)-summing Bloch mappings on the complex unit disc (Q6124317) (← links)
- Strongly Lipschitz (ℓp ,ℓq)-factorable mappings (Q6127791) (← links)
- On summability of nonlinear operators (Q6151633) (← links)
- Operators with the Lipschitz bounded approximation property (Q6174100) (← links)
- Strongly Lipschitz up-nuclear operators (Q6491181) (← links)
- Lipschitz \((q, p, E)\)-summing operators on injective Lipschitz tensor products of spaces (Q6491215) (← links)
- The ideal of Lipschitz classical \(p\)-compact operators and its injective hull (Q6491256) (← links)
