In this paper we unify several existing regularity conditions for graphs,
including strong regularity, k-isoregularity, and the t-vertex condition.
We develop an algebraic composition/decomposition theory of regularity
conditions. Using our theoretical results we show that a family of non rank 3
graphs known to satisfy the 7-vertex condition fulfills an even stronger
condition, (3,7)-regularity (the notion is defined in the text). Derived from
this family we obtain a new infinite family of non rank 3 strongly regular
graphs satisfying the 6-vertex condition. This strengthens and generalizes
previous results by Reichard.Comment: 29 page
