This chapter describes the functions implemented for almost split sequences and
Auslander-Reiten theory in QPA.<P/>
<Section><Heading>Almost split sequences and AR-quivers</Heading>
<ManSection>
<Attr Name="AlmostSplitSequence" Arg="M" Comm=""/>
<Attr Name="AlmostSplitSequence" Arg="M, e" Comm=""/>
<Description>
Arguments: <Arg>M</Arg> - an indecomposable non-projective
module, <Arg>e</Arg> - either l = left or r = right<Br />
</Description>
<Returns>the almost split sequence ending in the
module <Arg>M</Arg> if it is indecomposable and not projective, for
the first variant. The second variant finds the almost split
sequence starting or ending in the module <Arg>M</Arg> depending
on whether the second argument <Arg>e</Arg> is l or r (l =
almost split sequence starting with <Arg>M</Arg>, or r = almost
split sequence ending in <Arg>M</Arg>), if the module is
indecomposable and not injective or not projective, respectively.
It returns fail if the module is injective (l) or projective (r).
</Returns>
<Description>
The almost split sequence is returned as a pair of maps, the
monomorphism and the epimorphism. The function assumes that the
module <Arg>M</Arg> is indecomposable, and the source of the
monomorphism (l) or the range of the epimorphism (r) is a module
that is isomorphic to <Arg>M</Arg>, not necessarily identical.
</Description>
</ManSection>
<ManSection>
<Oper Name="AlmostSplitSequenceInPerpT" Arg="T, M" Comm=""/>
<Description>
Arguments: <Arg>T</Arg> - a cotilting module, <Arg>M</Arg> - an indecomposable non-projective
module<Br />
</Description>
<Returns>the almost split sequence in <Math>^\perp T</Math> ending
in the module <Arg>M</Arg>, if the module is indecomposable and not
projective (that is, not projective object in <Math>^\perp T</Math>). It
returns fail if the module <Arg>M</Arg> is in <Math>\add T</Math> projective.
The almost split sequence is returned as a pair of maps, the
monomorphism and the epimorphism, and the range of the
epimorphism is a module that is isomorphic to the input, not
necessarily identical.
</Returns>
<Description> The function assumes that the module <Arg>M</Arg> is
indecomposable and in <Math>^\perp T</Math>, and the range of the
epimorphism is a module that is isomorphic to the input, not
necessarily identical.
</Description>
</ManSection>
<ManSection>
<Attr Name="IrreducibleMorphismsEndingIn" Arg="M" Comm=""/>
<Attr Name="IrreducibleMorphismsStartingIn" Arg="M" Comm=""/>
<Description>
Arguments: <Arg>M</Arg> - an indecomposable module<Br />
</Description>
<Returns>the collection of irreducible morphisms ending and starting
in the module <Arg>M</Arg>, respectively. The argument is assumed
to be an indecomposable module.
</Returns>
<Description>
The irreducible morphisms are returned as a list of maps. Even in
the case of only one irreducible morphism, it is returned as a
list. The function assumes that the module <Arg>M</Arg> is
indecomposable over a quiver algebra with a finite field as the
ground ring.
</Description>
</ManSection>
<ManSection>
<Oper Name="IsTauPeriodic" Arg="M, n" Comm="for a
PathAlgebraMatModule and a positive integer"/>
<Description>
Arguments: <Arg>M</Arg> -- a path algebra module
(<C>PathAlgebraMatModule</C>), <Arg>n</Arg> -- be a positive integer.
<Br /></Description>
<Returns><C>i</C>, where <C>i</C> is the smallest positive integer
less or equal <C>n</C> such that the representation <Arg>M</Arg> is isomorphic
to the <M>\tau^i(M)</M>, and false otherwise.
</Returns>
</ManSection>
<ManSection>
<Oper Name="PredecessorOfModule" Arg="M, n" Comm=""/>
<Description>
Arguments: <Arg>M</Arg> - an indecomposable non-projective module
and <Arg>n</Arg> - a positive integer.<Br />
</Description>
<Returns>the predecessors of the module <Arg>M</Arg> in the
AR-quiver of the algebra <Arg>M</Arg> is given over of distance
less or equal to <Arg>n</Arg>.
</Returns>
<Description>
It returns two lists, the first is the indecomposable modules in
the different layers and the second is the valuations for the
arrows in the AR-quiver. The different entries in the first list
are the modules at distance zero, one, two, three, and so on, until
layer <Arg>n</Arg>. The <C>m</C>-th entry in the second list is
the valuations of the irreducible morphism from indecomposable
module number <C>i</C> in layer <C>m+1</C> to indecomposable module
number <C>j</C> in layer <C>m</C> for the values of <C>i</C> and
<C>j</C> there is an irreducible morphism. Whenever <C>false</C>
occur in the output, it means that this valuation has not been
computed.
The function assumes that the module <Arg>M</Arg> is indecomposable
and that the quotient of the path algebra is given over a finite field.
</Description>
</ManSection>
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