The wording of the Question suggests that a program is to be written that will produce (or at least check) a proposed class schedule.
Inputs to the program appear to be a list of teachers (and their subjects), a list of time slots, and a list of classes (and their subjects/grades).
Presumably there are several "cardinality" restrictions (sometimes called "business rules") that a proper class schedule must meet. A class can only be given once (not two time slots) is the point of the Question, but also a teacher can only teach one class per time slot, etc.
How can these restrictions be indicated? Prolog predicates do not have inherent restrictions of this kind, but they can be implemented either structurally or logically (i.e. in the program's logical checking).
An example of doing things in a structural way would be adding a field to the
class predicate to represent the assigned timeslot. Some logic would be involved in how this field is assigned, to insure that value is a valid time slot.
An example of doing the relationship between classes and time slots in a logical fashion would be to define an additional predicate that models the assignment of time slots to classes (presumably something similar applies to assigning classes to teachers). You would have, as illustration, predicate
class_timeslot(Class,Timeslot). The rules of your program would enforce the uniqueness of one instance of these (dynamically asserted) facts per
Class instance, and the validity of the
Alternatively, instead of dynamic facts, the class schedule could be constructed as a list of structures similarly pairing classes and time slots. But the point is that program logic needs to implement that this pairing is a functional relationship.