Add to ORKGWe consider non-relativistic systems in quantum mechanics interacting through the Coulomb potential, and discuss the existence of bound states which are stable against spontaneous dissociation into smaller atoms or ions. We review the studies that have been made of specific mass configurations and also the properties of the domain of stability in the space of masses or inverse masses. These rigorous results are supplemented by numerical investigations using accurate variational methods. A section is devoted to systems of three arbitrary charges and another to molecules in a world with two space-dimensions
24 pags., 5 figs. -- This article belongs to the Topical Collection “Critical Stability of Quantum ...
We consider three one-dimensional quantum, charged and spinless particles interacting through delta ...
The stability of four-body systems (m(a)(+)m(b)(+)m(1)(-)m(2)(-)) in three (3D) and two dimensions (...
We consider non-relativistic systems in quantum mechanics interacting through the Coulomb potential,...
We discuss the stability of three- and four-particle system interacting by pure Coulomb interactions...
Quantum Monte-Carlo methods are well suited to study the stability of few-body systems. Their capabi...
The stability of systems consisting of a negative charge -q1 and two positive charges q2 and q3 is d...
We present results on the stability of quantum systems consisting of a negative charge $-q_1$ with m...
We discuss the binding of three unit charges qi=±1,∓1,∓1, with various constituent masses mi. It is ...
We present results on the stability of quantum systems consisting of a negative charge $-q_1$ with m...
We study few-body bound states of charged particles subject to attractive zero-range/short-range plu...
In this article, we study the quantum mechanics of N electrons and M nuclei interacting by Coulomb f...
The fourth international and interdisciplinary workshop Critical stability of few-body quantum syste...
ThéorieA brief review is presented of the stability domain of three- and four-charge ground-states w...
International audienceIn this work we provide for a description of the low-energy physics of interac...
24 pags., 5 figs. -- This article belongs to the Topical Collection “Critical Stability of Quantum ...
We consider three one-dimensional quantum, charged and spinless particles interacting through delta ...
The stability of four-body systems (m(a)(+)m(b)(+)m(1)(-)m(2)(-)) in three (3D) and two dimensions (...
We consider non-relativistic systems in quantum mechanics interacting through the Coulomb potential,...
We discuss the stability of three- and four-particle system interacting by pure Coulomb interactions...
Quantum Monte-Carlo methods are well suited to study the stability of few-body systems. Their capabi...
The stability of systems consisting of a negative charge -q1 and two positive charges q2 and q3 is d...
We present results on the stability of quantum systems consisting of a negative charge $-q_1$ with m...
We discuss the binding of three unit charges qi=±1,∓1,∓1, with various constituent masses mi. It is ...
We present results on the stability of quantum systems consisting of a negative charge $-q_1$ with m...
We study few-body bound states of charged particles subject to attractive zero-range/short-range plu...
In this article, we study the quantum mechanics of N electrons and M nuclei interacting by Coulomb f...
The fourth international and interdisciplinary workshop Critical stability of few-body quantum syste...
ThéorieA brief review is presented of the stability domain of three- and four-charge ground-states w...
International audienceIn this work we provide for a description of the low-energy physics of interac...
24 pags., 5 figs. -- This article belongs to the Topical Collection “Critical Stability of Quantum ...
We consider three one-dimensional quantum, charged and spinless particles interacting through delta ...
The stability of four-body systems (m(a)(+)m(b)(+)m(1)(-)m(2)(-)) in three (3D) and two dimensions (...