A Frechet space chi with a sequence {parallel to.parallel to k}(k=1)(infinity) of generating seminorms is called tame if there exists an increasing function sigma : N -> Nsuch that for every continuous linear operator T from chi into itself, there exist N-0 and C > 0 such tha
We give a characterization of Stein manifolds M for which the space of analytic functions,O(M), is i...
Consiglio Nazionale delle Ricerche - Biblioteca Centrale - P.le Aldo Moro, 7, Rome / CNR - Consiglio...
Abstract. First, we introduce sequential convergence structures and characterize Fréchet spaces and ...
Let p {1∞}. We show that any continuous linear operator T from A1(a) to Ap(b) is tame i.e. there ...
We provide sufficient conditions for the existence of a global diffeomorphism between tame Frechet s...
The spectrum of transfer operators contains key information on statistical properties of hyperbolic ...
The thesis consists of four research papers. The first three deal with the Choquet theory of functio...
[EN] It is shown that the monomials A = (z(n))(n=0)(infinity) are a Schauder basis of the Frechet sp...
The space involved in the theory of equations of evolution (that is, the theory of semi-groups) are ...
In this short note, we give a criterion for the injectivity of tame mappings. Thi
Let E be a Fréchet space, $\| \;\|_1≤ \|\;\| ≤ \ldots $ a fundamental system of seminorms on E and U...
AbstractA technical inverse function theorem of Nash-Moser type is proved for maps between Fréchet s...
The works on linear dynamics in the last two decades show that many, even quite natural, linear dyna...
It is known that a continuous linear operator T defined on a Banach function space X(μ) (over a fin...
We survey different developments on Fr'{e}chet, (LB)-spaces and (LF)-spaces of Moscatelli type, thei...
We give a characterization of Stein manifolds M for which the space of analytic functions,O(M), is i...
Consiglio Nazionale delle Ricerche - Biblioteca Centrale - P.le Aldo Moro, 7, Rome / CNR - Consiglio...
Abstract. First, we introduce sequential convergence structures and characterize Fréchet spaces and ...
Let p {1∞}. We show that any continuous linear operator T from A1(a) to Ap(b) is tame i.e. there ...
We provide sufficient conditions for the existence of a global diffeomorphism between tame Frechet s...
The spectrum of transfer operators contains key information on statistical properties of hyperbolic ...
The thesis consists of four research papers. The first three deal with the Choquet theory of functio...
[EN] It is shown that the monomials A = (z(n))(n=0)(infinity) are a Schauder basis of the Frechet sp...
The space involved in the theory of equations of evolution (that is, the theory of semi-groups) are ...
In this short note, we give a criterion for the injectivity of tame mappings. Thi
Let E be a Fréchet space, $\| \;\|_1≤ \|\;\| ≤ \ldots $ a fundamental system of seminorms on E and U...
AbstractA technical inverse function theorem of Nash-Moser type is proved for maps between Fréchet s...
The works on linear dynamics in the last two decades show that many, even quite natural, linear dyna...
It is known that a continuous linear operator T defined on a Banach function space X(μ) (over a fin...
We survey different developments on Fr'{e}chet, (LB)-spaces and (LF)-spaces of Moscatelli type, thei...
We give a characterization of Stein manifolds M for which the space of analytic functions,O(M), is i...
Consiglio Nazionale delle Ricerche - Biblioteca Centrale - P.le Aldo Moro, 7, Rome / CNR - Consiglio...
Abstract. First, we introduce sequential convergence structures and characterize Fréchet spaces and ...