AbstractBonato and Tardif [A. Bonato, C. Tardif, Mutually embeddable graphs and the tree alternative conjecture, J. Combinatorial Theory, Series B 96 (2006), 874–880] conjectured that the number of isomorphism classes of trees mutually embeddable with a given tree T is either 1 or infinite. We prove the analogue of their conjecture for rooted trees. We also make some progress towards the original conjecture for locally finite trees and state some new conjectures
As a generalization of isomorphisms of graphs, we consider path-congruences, that is maps which pres...
Abstract. We study the Fibered Isomorphism Conjecture of Far-rell and Jones for groups acting on tre...
In this paper we obtain a new polynomial time algorithm for testing isomorphism of graphs. This algo...
AbstractBonato and Tardif [A. Bonato, C. Tardif, Mutually embeddable graphs and the tree alternative...
AbstractWe prove that if a rayless tree T is mutually embeddable and non-isomorphic with another ray...
AbstractConsider two locally finite rooted trees as equivalent if each of them is a topological mino...
AbstractWe prove that if a rayless tree T is mutually embeddable and non-isomorphic with another ray...
AbstractWe prove a best possible lower bound for the number of isomorphism classes into which all ro...
AbstractIt is shown that a locally finite graph has exactly one isomorphism class of spanning unicyc...
International audienceThe number of embeddings of a partially ordered set $S$ in a partially ordered...
AbstractWe discuss an analogon to the Farrell–Jones Conjecture for homotopy algebraic K-theory. In p...
Joint work wih Claude Laflamme, Norbert Sauer and Robert Woodrow. Two structures are said to be $\e...
Joint work wih Claude Laflamme, Norbert Sauer and Robert Woodrow. Two structures are said to be $\e...
I n [ l] B. L. H a r t n e l l conjectures that the spanning trees of a graph containing n vertex-di...
We divide the class of infinite computable trees into three types. For the first and second types, 0...
As a generalization of isomorphisms of graphs, we consider path-congruences, that is maps which pres...
Abstract. We study the Fibered Isomorphism Conjecture of Far-rell and Jones for groups acting on tre...
In this paper we obtain a new polynomial time algorithm for testing isomorphism of graphs. This algo...
AbstractBonato and Tardif [A. Bonato, C. Tardif, Mutually embeddable graphs and the tree alternative...
AbstractWe prove that if a rayless tree T is mutually embeddable and non-isomorphic with another ray...
AbstractConsider two locally finite rooted trees as equivalent if each of them is a topological mino...
AbstractWe prove that if a rayless tree T is mutually embeddable and non-isomorphic with another ray...
AbstractWe prove a best possible lower bound for the number of isomorphism classes into which all ro...
AbstractIt is shown that a locally finite graph has exactly one isomorphism class of spanning unicyc...
International audienceThe number of embeddings of a partially ordered set $S$ in a partially ordered...
AbstractWe discuss an analogon to the Farrell–Jones Conjecture for homotopy algebraic K-theory. In p...
Joint work wih Claude Laflamme, Norbert Sauer and Robert Woodrow. Two structures are said to be $\e...
Joint work wih Claude Laflamme, Norbert Sauer and Robert Woodrow. Two structures are said to be $\e...
I n [ l] B. L. H a r t n e l l conjectures that the spanning trees of a graph containing n vertex-di...
We divide the class of infinite computable trees into three types. For the first and second types, 0...
As a generalization of isomorphisms of graphs, we consider path-congruences, that is maps which pres...
Abstract. We study the Fibered Isomorphism Conjecture of Far-rell and Jones for groups acting on tre...
In this paper we obtain a new polynomial time algorithm for testing isomorphism of graphs. This algo...
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