On Quasi-Universal Model Classes

## Abstract We consider the infima $ \hat E $(__f__) on homotopy classes of energy functionals __E__ defined on smooth maps __f__: __M^n^__ → __V^k^__ between compact connected Riemannian manifolds. If __M__ contains a sub‐manifold __L__ of codimension greater than the degree of __E__ then $ \hat E

Atomic surface tensions are parameterized for use with solvation models in which the electrostatic part of the calculation is based on the conductor-like screening model (COSMO) and the semiempirical molecular orbital methods AM1, PM3, and MNDO/d. The convergence of the calculated polarization free

## Abstract A class of graphs ${\cal C}$ ordered by the homomorphism relation is __universal__ if every countable partial order can be embedded in ${\cal C}$. It is known (see [1,3]) that the class $\cal C\_{k}$ of __k__‐colorable graphs, for any fixed ${k}\geq 3 $, induces a universal partial orde