Bicompact torsion classes equal functorially finite ones for hereditary algebras and semistable cases, so Demonet Conjecture implies Enomoto Conjecture.
Title resolution pending
2 Pith papers cite this work. Polarity classification is still indexing.
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Establishes a 2^{|U|}:1 correspondence between TF equivalence classes in the closed interval neighborhood D(U) of a silting cone C^∘(U) and those in K_0(proj B)_R for the τ-tilting reduced algebra B, together with an explicit polyhedral description of D(U).
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Bicompact torsion classes and conjectures on brick infinite algebras
Bicompact torsion classes equal functorially finite ones for hereditary algebras and semistable cases, so Demonet Conjecture implies Enomoto Conjecture.
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The interval neighborhoods in the real Grothendieck groups
Establishes a 2^{|U|}:1 correspondence between TF equivalence classes in the closed interval neighborhood D(U) of a silting cone C^∘(U) and those in K_0(proj B)_R for the τ-tilting reduced algebra B, together with an explicit polyhedral description of D(U).