Session 7 of Course 13

The quantum amount of momentum for the substringular is denoted by the Hamiltonian expression.  No momentum exists as momentum below the Hamiltonian level of the smallest sorts.  There are many forms of quantum momentum.  This means that there are many forms of Hamiltonian expressions.  The smallest quantum of momentum for superstrings is the radial operator-based quantum of momentum.  The smallest value for a Hamiltonian expression is thus the radial operator-based value of the just mentioned  quantum of momentum.  The radial operator-based quantum of momentum equals the transversal operator-based quantum of momentum divided by two pi. Other forms of Hamiltonian values that equal the radial operator-based quantum of momentum and the transversal operator-based quantum of momentum are the radial operational quantum of momentum and the transversal operational quantum of momentum, respectively.  The difference between these is that the operator-based momentum acts as the actor of the "motion" while the operational momentum acts as the action of the momentum.  Both operator-wise and operational momentum may be used to describe the situation of one quantum of momentum -- both as a momentum of being and also as a momentum of action.  The operand-based quantum of momentum-based impedance is the holomorphism of the operator-based quantum of momentum that provides a place for momentum to occur.