Generalized blockmodeling of binary networks explained

Generalized blockmodeling of binary networks (also relational blockmodeling) is an approach of generalized blockmodeling, analysing the binary network(s).^[1]

As most network analyses deal with binary networks, this approach is also considered as the fundamental approach of blockmodeling.^[2] This is especially noted, as the set of ideal blocks, when used for interpretation of blockmodels, have binary link patterns, which precludes them to be compared with valued empirical blocks.^[3]

When analysing the binary networks, the criterion function is measuring block inconsistencies, while also reporting the possible errors.^[1] The ideal block in binary blockmodeling has only three types of conditions: "a certain cell must be (at least) 1, a certain cell must be 0 and the

over each row (or column) must be at least 1".^[1]

It is also used as a basis for developing the generalized blockmodeling of valued networks.^[1]

See also

• homogeneity blockmodeling
• binary relation
• binary matrix

Notes and References

1. Žiberna . Aleš . 2007 . Generalized Blockmodeling of Valued Networks . Social Networks . 29. 105–126. 10.1016/j.socnet.2006.04.002. 17739746 . 1312.0646 .
2. Book: Doreian . Patrick . Batagelj . Vladimir . Ferligoj . Anuška . Generalized Blackmodeling . Cambridge University Press . 2005 . 0-521-84085-6.
3. Nordlund . Carl . 2016 . A deviational approach to blockmodeling of valued networks . Social Networks . 44 . 160–178 . 10.1016/j.socnet.2015.08.004.