Let R be a Krull domain, complete with respect to a non-zero ideal. Let K be the quotient field of R. We prove that every finite split embedding problem is solvable over every function field in one variable over K. If dimR> 1, then every finite split embedding problem over K is solvable
Let Γ be a set of rational-valued functions on a fixed finite do-main; such a set is called a finite...
A variety V of residuated lattices has the finite embeddability property (shortly FEP) if every fini...
We show that the decision problem of determining whether a given (abstract simplicial) k-complex has...
We prove that every finite split embedding problem is solvable over the field K((X1,..., Xn)) of for...
embedding problems over complete domains By Elad Paran We prove that every finite split embedding pr...
We give a condition on a family of solutions of quotients of an embedding problem which implies the ...
We give an elementary self-contained proof of the following result, which Pop proved with methods of...
Given a Hilbertian field k and a finite set S of Krull valuations of k, we show that every finite sp...
We give a condition on a family of solutions of quotients of an embedding problem which implies the ...
Separably closed fields, Henselian fields, PAC fields, PRC fields, and PpC fields enjoy a common fea...
AbstractIn this paper, we will present new developments in the study of the links between the cardin...
We study the computational complexity of exact minimisation of separable rational-valued discrete fu...
We show that the decision problem of determining whether a given (abstract simplicial) k-complex has...
Assuming only basic algebra and Galois theory, this book develops the method of 'algebraic patching'...
We extend the method of algebraic patching due to Haran-Jarden-Völklein from complete absolute valu...
Let Γ be a set of rational-valued functions on a fixed finite do-main; such a set is called a finite...
A variety V of residuated lattices has the finite embeddability property (shortly FEP) if every fini...
We show that the decision problem of determining whether a given (abstract simplicial) k-complex has...
We prove that every finite split embedding problem is solvable over the field K((X1,..., Xn)) of for...
embedding problems over complete domains By Elad Paran We prove that every finite split embedding pr...
We give a condition on a family of solutions of quotients of an embedding problem which implies the ...
We give an elementary self-contained proof of the following result, which Pop proved with methods of...
Given a Hilbertian field k and a finite set S of Krull valuations of k, we show that every finite sp...
We give a condition on a family of solutions of quotients of an embedding problem which implies the ...
Separably closed fields, Henselian fields, PAC fields, PRC fields, and PpC fields enjoy a common fea...
AbstractIn this paper, we will present new developments in the study of the links between the cardin...
We study the computational complexity of exact minimisation of separable rational-valued discrete fu...
We show that the decision problem of determining whether a given (abstract simplicial) k-complex has...
Assuming only basic algebra and Galois theory, this book develops the method of 'algebraic patching'...
We extend the method of algebraic patching due to Haran-Jarden-Völklein from complete absolute valu...
Let Γ be a set of rational-valued functions on a fixed finite do-main; such a set is called a finite...
A variety V of residuated lattices has the finite embeddability property (shortly FEP) if every fini...
We show that the decision problem of determining whether a given (abstract simplicial) k-complex has...