Abstract
The validity of the implication of a local limit theorem is extended from an integral one. The extension eliminates the finite range assumption present in the previous works by using the cluster expansion to analyze the contribution from the tail of the potential.
Campanino, M;
Capocaccia, D;
Tirozzi, B;
[1]
Rome Univ. (Italy). Istituto di Matematica)
- L'Aquila Univ. (Italy). Istituto di Matematica
Citation Formats
Campanino, M, Capocaccia, D, Tirozzi, B, and Rome Univ. (Italy). Istituto di Matematica).
Local central limit theorem for a Gibbs random field.
Germany: N. p.,
1979.
Web.
Campanino, M, Capocaccia, D, Tirozzi, B, & Rome Univ. (Italy). Istituto di Matematica).
Local central limit theorem for a Gibbs random field.
Germany.
Campanino, M, Capocaccia, D, Tirozzi, B, and Rome Univ. (Italy). Istituto di Matematica).
1979.
"Local central limit theorem for a Gibbs random field."
Germany.
@misc{etde_6876738,
title = {Local central limit theorem for a Gibbs random field}
author = {Campanino, M, Capocaccia, D, Tirozzi, B, and Rome Univ. (Italy). Istituto di Matematica)}
abstractNote = {The validity of the implication of a local limit theorem is extended from an integral one. The extension eliminates the finite range assumption present in the previous works by using the cluster expansion to analyze the contribution from the tail of the potential.}
journal = []
volume = {70:2}
journal type = {AC}
place = {Germany}
year = {1979}
month = {Dec}
}
title = {Local central limit theorem for a Gibbs random field}
author = {Campanino, M, Capocaccia, D, Tirozzi, B, and Rome Univ. (Italy). Istituto di Matematica)}
abstractNote = {The validity of the implication of a local limit theorem is extended from an integral one. The extension eliminates the finite range assumption present in the previous works by using the cluster expansion to analyze the contribution from the tail of the potential.}
journal = []
volume = {70:2}
journal type = {AC}
place = {Germany}
year = {1979}
month = {Dec}
}