Lineare zweidimensionale Räume von stetigen Funktionen mit stetigen ersten Ableitungen
Lineární závislost funkcí jedné reálné proměnné
Liouville type theorems for mappings with bounded (co)-distortion
We obtain Liouville type theorems for mappings with bounded -distorsion between Riemannian manifolds. Besides these mappings, we introduce and study a new class, which we call mappings with bounded -codistorsion.
Lipschitz and bi-Lipschitz functions.
Lipschitz classes and Poisson integrals on stratified groups
Lipschitz Classes and Restrictions of Fourier Transforms.
Lipschitz conditions on the modulus of a harmonic function.
Lipschitz differences and Lipschitz functions
Lipschitz extensions of convex-valued maps
Si dimostra che ogni funzione multivoca lipschitziana con costante di Lipschitz , definita su un sottoinsieme di uno spazio di Hilbert a valori compatti e convessi in , può essere estesa su tutto ad una funzione multivoca lipschitziana con costante minore di 7 nM. In generale, non esistono invece estensioni aventi la stessa costante di Lipschitz .
Lipschitz functions with unexpectedly large sets of nondifferentiability points.
Lipschitz mappings, contingents, and differentiability.
Lipschitz r-continuity of the approximative subdifferential of a convex function.
Lipschitz regularity and approximate differentiability of the Diperna-Lions flow
Lipschitz sums of convex functions
We give a geometric characterization of the convex subsets of a Banach space with the property that for any two convex continuous functions on this set, if their sum is Lipschitz, then the functions must be Lipschitz. We apply this result to the theory of Δ-convex functions.
Lipschitzian superposition operators on metric semigroups and abstract convex cones of mappings of finite -variation.
Littlewood's inequality for -bimeasures.
lnfinitely many solutions for fractional Schrödinger equations with perturbation via variational methods
Using variational methods, we investigate the solutions of a class of fractional Schrödinger equations with perturbation. The existence criteria of infinitely many solutions are established by symmetric mountain pass theorem, which extend the results in the related study. An example is also given to illustrate our results.
Local and global solutions of well-posed integrated Cauchy problems
We study the local well-posed integrated Cauchy problem , v(0) = 0, t ∈ [0,κ), with κ > 0, α ≥ 0, and x ∈ X, where X is a Banach space and A a closed operator on X. We extend solutions increasing the regularity in α. The global case (κ = ∞) is also treated in detail. Growth of solutions is given in both cases.
Local and global -cone porosity
Local characterizations of Darboux Baire 1 functions