As a generalization of the theory of normal bands of groups,some characteristics and the twisted spined product structure of normal bands of unipotent monoids are given by use of SRMSun semigroups and Green relations,regular elements and restrictions in the general construction fuctions on them.

This paper proves that the maximal right quasinormal band homomorphic image of free product of right quasinormal bands in semigroup category is isomorphic to their free product in right quasinormal band category.

This paper proves that maxima1 normal band homomorphism image of tensor products oftwo semigroups exactly is the tensor product of maximal normal band homomorphism image of the twosemigroups in normal band category.

A finite semigroup is an IC abundant semigroup satisfying the left rgularity condition if and only if it is an orthodox superabundant semigroup whose idempotents form a left regular band.

In the paper, a structural theorem of left inverse semigroups is given, which generalizes the standard representations of left regular bands.

The quasi spined product of an adequate semigroups and a left regular band is introduced here, the quasi spined product structure of type σ semigroups is established.