Would it be more interesting to present these with the Gelfand triple instance?
Does it have “more” to say than the initial raw definition?
The concept can be used in different contexts and that’s what makes algebra being algebra.
People have different motivations and usually that’s what brings new light into a field.
Would it be more interesting to present these with the Gelfand triple instance?
Does it have “more” to say than the initial raw definition?
The concept can be used in different contexts and that’s what makes algebra being algebra.
People have different motivations and usually that’s what brings new light into a field.