Add to ORKGLet R be any of the following rings: the smooth functions on R^2n with the Poisson bracket, the Hamiltonian vector fields on a symplectic manifold, the Lie algebra of smooth complex vector fields on C, or a variety of rings of functions (real or complex valued) over 2nd countable spaces. Then if H is any other Polish ring and φ:H →R is an algebraic isomorphism, then it is also a topological isomorphism (i.e. a homeomorphism). Moreover, many such isomorphisms between function rings induce a homeomorphism of the underlying spaces. It is also shown that there is no topology in which the ring of real analytic functions on R is a Polish ring
We study properties of the Golomb topology on polynomial rings over fields, in particular trying to ...
New results are given on the pole-shifting problem for commutative rings, and these are then applied...
New results are given on the pole-shifting problem for commutative rings, and these are then applied...
AbstractLet L be a Polish (i.e., complete separable metrizable) Lie ring. L is said to be algebraica...
We study the relations between algebraic properties of certain rings of functions and topological pr...
It is shown that a ring homomorphism on H(G), the algebra of analytic functions on a regular region ...
We study properties of the Golomb topology on polynomial rings over fields, in particular trying to ...
Different properties of rings and fields are discussed [12], [41] and [17]. We introduce ring homomo...
AbstractThe ring R of continuous functions on a compact topological space Xwith values in R or C is ...
Thesis (Ph.D.)--Boston UniversityGiven two compact Hausdorff topological spaces X and Y and the corr...
C(X) is the ring or vector lattice of real valued con tinuous functions on the Tychonoff space X, an...
Abstract. Automatic linearity results for certain ring homomorphisms be-tween two algebras, in parti...
Let C(X,E) denote the set of all continuous functions from a topological space X into a topological...
The main result of this paper is a Representation Theorem, determining when a commutative ring A is ...
Abstract. T. Mostowski showed that every (real or complex) germ of an analytic set is homeomorphic t...
We study properties of the Golomb topology on polynomial rings over fields, in particular trying to ...
New results are given on the pole-shifting problem for commutative rings, and these are then applied...
New results are given on the pole-shifting problem for commutative rings, and these are then applied...
AbstractLet L be a Polish (i.e., complete separable metrizable) Lie ring. L is said to be algebraica...
We study the relations between algebraic properties of certain rings of functions and topological pr...
It is shown that a ring homomorphism on H(G), the algebra of analytic functions on a regular region ...
We study properties of the Golomb topology on polynomial rings over fields, in particular trying to ...
Different properties of rings and fields are discussed [12], [41] and [17]. We introduce ring homomo...
AbstractThe ring R of continuous functions on a compact topological space Xwith values in R or C is ...
Thesis (Ph.D.)--Boston UniversityGiven two compact Hausdorff topological spaces X and Y and the corr...
C(X) is the ring or vector lattice of real valued con tinuous functions on the Tychonoff space X, an...
Abstract. Automatic linearity results for certain ring homomorphisms be-tween two algebras, in parti...
Let C(X,E) denote the set of all continuous functions from a topological space X into a topological...
The main result of this paper is a Representation Theorem, determining when a commutative ring A is ...
Abstract. T. Mostowski showed that every (real or complex) germ of an analytic set is homeomorphic t...
We study properties of the Golomb topology on polynomial rings over fields, in particular trying to ...
New results are given on the pole-shifting problem for commutative rings, and these are then applied...
New results are given on the pole-shifting problem for commutative rings, and these are then applied...