Strange enough, the current definitions of
)abbrev category OASGP OrderedAbelianSemiGroup
++ Ordered sets which are also abelian semigroups, such that the addition
++ preserves the ordering.
++ \spad{ x < y => x+z < y+z}
OrderedAbelianSemiGroup(): Category == Join(OrderedSet, AbelianMonoid)
)abbrev category OAMON OrderedAbelianMonoid
++ Ordered sets which are also abelian monoids, such that the addition
++ preserves the ordering.
OrderedAbelianMonoid(): Category ==
Join(OrderedAbelianSemiGroup, AbelianMonoid)
The definition of
OrderedAbelianSemiGroup(): Category == Join(OrderedSet, AbelianSemiGroup)
Martin ... --Tim Daly, Sun, 30 Oct 2005 11:04:12 -0600 reply This is a very deep change and I'm going to have to devote
a fair bit of time to testing the system before this one
gets released into the wild.
Tim Furthermore, we should have:
PositiveInteger: Join(OrderedAbelianSemiGroup,Monoid) with
instead of:
PositiveInteger: Join(AbelianSemiGroup,OrderedSet,Monoid)
as Waldek noticed... Martin Fixed in OpenAxiom |
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last edited 15 years ago by japp |