Whitney-type theorems on extension of functions on Carnot groups

We generalize the classical Whitney theorem which describes the restrictions of functions of various smoothness to closed sets of a Carnot group. The main results of the article are announced in [1].     

On certain extension theorems in the mixed Borel setting

Given two sequences and of positive numbers, we give necessary and sufficient conditions under which the inclusions

     

Kernel theorems in the setting of mixed nonquasi-analytic classes

Let Ω₁⊂Rr and Ω₂⊂Rs be nonempty and open. We introduce the Beurling-Roumieu spaces D(ω₁,ω₂}(Ω₁×Ω₂), D(M,M^′}(Ω₁×Ω₂) and obtain tensor product representations of them. This leads for instance to kernel theorems of the following type: every continuous linear map from the Beurling space D(ω₁)(Ω₁) (respectively D(M)(Ω₁)) into the strong dual of the Roumieu space D{ω₂}(Ω₂) (respectively D{M^′}(Ω₂)) can be represented by a continuous linear functional on D(ω₁,ω₂}(Ω₁×Ω₂) (respectively D(M,M^′}(Ω₁×Ω₂)).     

Whitney numbers of matroid extensions and co-extensions

Crapo found that single-element extensions of matroid are equivalent to modular cuts. This paper will study the single-element extension and co-extension of a matroid and establish the upper semi-continuity for the signless coefficients of Whitney polynomials and Whitney numbers on both extensions via its extension lattice, a lattice of all non-empty modular cuts.     

On the distribution of Beurling integers

Asymptotic behaviour of the counting function of Beurling integers is deduced from Chebyshev upper bound and Mertens formula for Beurling primes. The proof based on some properties of corresponding zeta-function on the right of its abscissa of convergence.     

An interpolation problem in the Denjoy–Carleman classes

Inspired by some iterative algorithms useful for proving the real analyticity (or the Gevrey regularity) of a solution of a linear partial differential equation with real-analytic coefficients, we consider the following question. Given a smooth function defined on and given an increasing divergent sequence of positive integers such that the derivative of order of f has a growth of the type , when can we deduce that f is a function in the Denjoy–Carleman class ? We provide a positive result and show that a suitable condition on the gaps between the terms of the sequence is needed.     

Stability Zones in Whitney's Extension Problem for Ultradifferentiable Functions

We establish a connection between the growth rate of weight functions generating nonquasianalytic classes of ultradifferentiable functions of Beurling and Roumieu type and the validity of an analog of Whitney's extension theorem for these classes.     

Finite Interpolation with Minimum Uniform Norm in

Given a finite sequence a{a₁, …, a_N} in a domain Ω ⁿ, and complex scalars v{v₁, …, v_N}, consider the classical extremal problem of finding the smallest uniform norm of a holomorphic function verifying f(a_j)=v_j for all j. We show that the modulus of the solutions to this problem must approach its least upper bound along a subset of the boundary of the domain large enough so that its A(Ω)-hull contains a subset of the original a large enough to force the same minimum norm. Furthermore, all the solutions must agree on a variety which contains the hull (in an appropriate, weaker, sense) of a measure supported on the maximum modulus set. An example is given to show that the inclusions can be strict.     

A Sufficient Condition for the C H -Rectifiability of Lipschitz Curves

Let γ:[a,b]→R ^1+k be Lipschitz and H≥2 be an integer number. Then a sufficient condition, expressed in terms of further accessory Lipschitz maps, for the C ^H -rectifiability of γ([a,b]) is provided.      

Resolvent estimates and decomposable extensions of generalized Cesàro operators

We determine the spectrum of generalized Cesàro operators with essentially rational symbols acting on various spaces of analytic functions, including Hardy spaces, weighted Bergman and Dirichlet spaces. Then we show that in all cases these operators are subdecomposable.     

Bases in the Spaces of C∞ -Functions on Cantor-Type Sets

We construct a topological basis in the space of Whitney functions given on the Cantor-type set.     

Théorème de division avec des conditions au bord

Let be an open subset of ⁿ and be a subalgebra of the algebra of analytic functions on . We suppose that satisfies some weak conditions of noetherianity such that we can construct a finite stratification for each ideal of . We also suppose that satifies global £ojasiewicz's inequalities. We prove the following: Let andf C on flat on ; if for eacha the Taylor's serie off ata, T _a f, is in the ideal generated byT _a f ₁,...,T _a f _p in the ring of formal power series, then there exist ₁,..., _p ,C on flat on such that . This result extends the classic Hormander's theorem of division (for a polynomial) or the £ojasiewicz-Malgrange theorem in the local analytic case.Reherches menées dans le cadre du Programme d'Appui à la Recherche Scientifique (PARS MI 33)