//--> //--> //-->
Toggle navigation
Logout
Change account settings
EN
DE
ES
FR
A-Z
Beta
About EconBiz
News
Thesaurus (STW)
Research Skills
Help
EN
DE
ES
FR
My account
Logout
Change account settings
Login
Publications
Events
Your search terms
Search
Retain my current filters
~person:"Valdés, J.F."
Search options
All Fields
Title
Exact title
Subject
Author
Institution
ISBN/ISSN
Published in...
Publisher
Open Access only
Advanced
Search history
My EconBiz
Favorites
Loans
Reservations
Fines
You are here:
Home
Search: subject:"Edwards–Anderson model"
Narrow search
Delete all filters
| 1 applied filter
Year of publication
From:
To:
Subject
All
Edwards–Anderson model
3
Spin-glass
3
Lattice theory
2
Local frustration
1
Online availability
All
Undetermined
3
Type of publication
All
Article
3
Language
All
Undetermined
3
Author
All
Valdés, J.F.
Lebrecht, W.
3
Vogel, E.E.
2
Bachmann, F.
1
Berg, Bernd A
1
Billoire, Alain
1
Fierro, B.
1
Fischer, Janine
1
Hartmann, Alexander K.
1
Janke, Wolfhard
1
Saravia, G.
1
more ...
less ...
Published in...
All
Physica A: Statistical Mechanics and its Applications
3
Source
All
RePEc
3
Showing
1
-
3
of
3
Sort
relevance
articles prioritized
date (newest first)
date (oldest first)
1
±J Ising model on Dürer lattices
Lebrecht, W.
;
Valdés, J.F.
- In:
Physica A: Statistical Mechanics and its Applications
422
(
2015
)
C
,
pp. 89-100
lattices over which a generalized
Edwards–Anderson
model
(±J Ising model) is defined. A local frustration analysis is performed …
Persistent link: https://www.econbiz.de/10011194062
Saved in:
2
±J Ising model on mixed Archimedean lattices: (33,42), (32,4,3,4), (3,122), (4,6,12)
Lebrecht, W.
;
Valdés, J.F.
- In:
Physica A: Statistical Mechanics and its Applications
392
(
2013
)
19
,
pp. 4549-4570
Archimedean lattices over which a generalized
Edwards–Anderson
model
(±J Ising model) is defined. A local frustration analysis is …
Persistent link: https://www.econbiz.de/10011061285
Saved in:
3
±J Ising model on homogeneous Archimedean lattices
Valdés, J.F.
;
Lebrecht, W.
;
Vogel, E.E.
- In:
Physica A: Statistical Mechanics and its Applications
391
(
2012
)
8
,
pp. 2585-2599
Archimedean lattices over which a generalized
Edwards–Anderson
model
(±J Ising model) is defined. A local frustration analysis is …
Persistent link: https://www.econbiz.de/10011063402
Saved in:
Results per page
10
25
50
100
250
A service of the
zbw
×
Loading...
//-->