The monoidal category structure on quadratic R-modules #
The monoidal structure is simply the structure on the underlying modules, where the tensor product
of two modules is equipped with the form constructed via QuadraticForm.tmul
.
As with the monoidal structure on ModuleCat
,
the universe level of the modules must be at least the universe level of the ring,
so that we have a monoidal unit.
For now, we simplify by insisting both universe levels are the same.
Implementation notes #
This file essentially mirrors Mathlib/Algebra/Category/AlgebraCat/Monoidal.lean
.
Auxiliary definition used to build QuadraticModuleCat.instMonoidalCategory
.
Equations
- QuadraticModuleCat.instMonoidalCategory.tensorObj X Y = QuadraticModuleCat.of (QuadraticForm.tmul X.form Y.form)
Instances For
Auxiliary definition used to build QuadraticModuleCat.instMonoidalCategory
.
We want this up front so that we can re-use it to define whiskerLeft
and whiskerRight
.
Equations
- QuadraticModuleCat.instMonoidalCategory.tensorHom f g = { toIsometry := QuadraticForm.Isometry.tmul f.toIsometry g.toIsometry }
Instances For
Equations
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Equations
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forget₂ (QuadraticModuleCat R) (ModuleCat R)
as a monoidal functor.
Equations
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Instances For
Equations
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