We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with the property $|(\varphi(X)+X)/X|<\infty$ for each $X\le A$. They form a ring containing multiplications, the so-called finitary endomorphisms and non-trivial instances. We show that inertial invertible endomorphisms form a group, provided $A$ has finite torsion-free rank. In any case, the group $IAut(A)$ they generate is commutative modulo the group $FAut(A)$ of finitary automorphisms, which is known to be locally finite. We deduce that $IAut(A)$ is locally-(center-by-finite). Also we consider the lattice dual property, that is $|X/(X\cap \varphi(X))|<\infty$ for each $X\le A$. We show that this implies the above one, provided $A$ has ...
An endomorphisms ϕ of an abelian group A is said inertial if each subgroup H of A has finite index i...
An endomorphisms ϕ of an abelian group A is said inertial if each subgroup H of A has finite index i...
An endomorphisms $\varphi$ of a group $G$ is said inertial if $\forall H\le G$ \ \ $|\varphi(H):(H\...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group A, that is endomorphisms ϕ with the property...
We describe inertial endomorphisms of an abelian group A, that is endomorphisms ϕ with the property...
An endomorphisms $\p$ of an abelian group $A$ is said inertial if each subgroup $H$ of $A$ has finit...
An endomorphisms $\p$ of an abelian group $A$ is said inertial if each subgroup $H$ of $A$ has finit...
An endomorphisms $\p$ of an abelian group $A$ is said inertial if each subgroup $H$ of $A$ has finit...
An endomorphisms ϕ of an abelian group A is said inertial if each subgroup H of A has finite index i...
An endomorphisms ϕ of an abelian group A is said inertial if each subgroup H of A has finite index i...
An endomorphisms ϕ of an abelian group A is said inertial if each subgroup H of A has finite index i...
An endomorphisms $\varphi$ of a group $G$ is said inertial if $\forall H\le G$ \ \ $|\varphi(H):(H\...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group $A$, that is endomorphisms $\varphi$ with th...
We describe inertial endomorphisms of an abelian group A, that is endomorphisms ϕ with the property...
We describe inertial endomorphisms of an abelian group A, that is endomorphisms ϕ with the property...
An endomorphisms $\p$ of an abelian group $A$ is said inertial if each subgroup $H$ of $A$ has finit...
An endomorphisms $\p$ of an abelian group $A$ is said inertial if each subgroup $H$ of $A$ has finit...
An endomorphisms $\p$ of an abelian group $A$ is said inertial if each subgroup $H$ of $A$ has finit...
An endomorphisms ϕ of an abelian group A is said inertial if each subgroup H of A has finite index i...
An endomorphisms ϕ of an abelian group A is said inertial if each subgroup H of A has finite index i...
An endomorphisms ϕ of an abelian group A is said inertial if each subgroup H of A has finite index i...
An endomorphisms $\varphi$ of a group $G$ is said inertial if $\forall H\le G$ \ \ $|\varphi(H):(H\...