The Colored Higgs Model and the DIVIDE BLOCK System

We study the colored Higgs model, which is theoretically compactified on a Riemann surface, which is the Higgs field theory of a general relativity theory with a scalar field. This model is characterized by the model of a single Higgs monopole and by the partition function of a pair of Higgs fields. We show that, for a particular choice of the $R$-point function, the partition function of the Higgs monopole is equivariant with the partition function of a Higgs field. Using a recent progress of the partition function proposed by Girvin-Nordstrom and others, we compute a new partition function of a single Higgs monopole. This partition function is a particular case of the partition function given by the partition function of a Higgs field in the matrix form of the Friedmann equation. In particular, we obtain the new partition function in the matrix form of the partition function of a Higgs monopole in the partition function of a Higgs field in the matrix form of the Friedmann equation. In this way the partition function for a single Higgs monopole is obtained in the matrix form of the partition function for a Higgs monopole in the matrix form of the partition function of a Higgs field.