Frobenius-Perron Theory of Endofunctors

“…Note that Theorem 0.1 is a "weighted" version of [CG,Proposition 6.5(1,2)]. By Lemma 2.1(2), we obtain the Frobenius-Perron dimension of the bounded derived category of finite dimensional representations of acyclic quivers of A D E type.…”

“…Note that (E2.8.1)-(E2.8.2) are in fact the transpose of the usual Hom and Ext-matrices. By [CG,Lemma 3.7] (by considering the opposite category), Lemma 2.10 holds for the transpose matrices of (E2.8.1)-(E2.8.2) too.…”

“…Definition 1.5. [CG,Definition 2.7] (1) Let A be an abelian category. The Frobenius-Perron dimension of A is defined to be fpd…”

“…Lemma 1.6. [CG,Lemma 6.1] Let n be a positive integer. Suppose that B has a σ-decomposition {B λ } λ∈Λ .…”

“…Question 2.2. [CG,Question 7.11] Let X be a weighted projective line. What is the exact value of fpd n D b (coh(X)), for n ≥ 1, in terms of other invariants of X?…”

Frobenius-Perron theory for projective schemes

“…Note that Theorem 0.1 is a "weighted" version of [CG,Proposition 6.5(1,2)]. By Lemma 2.1(2), we obtain the Frobenius-Perron dimension of the bounded derived category of finite dimensional representations of acyclic quivers of A D E type.…”

“…Note that (E2.8.1)-(E2.8.2) are in fact the transpose of the usual Hom and Ext-matrices. By [CG,Lemma 3.7] (by considering the opposite category), Lemma 2.10 holds for the transpose matrices of (E2.8.1)-(E2.8.2) too.…”

“…Definition 1.5. [CG,Definition 2.7] (1) Let A be an abelian category. The Frobenius-Perron dimension of A is defined to be fpd…”

“…Lemma 1.6. [CG,Lemma 6.1] Let n be a positive integer. Suppose that B has a σ-decomposition {B λ } λ∈Λ .…”

“…Question 2.2. [CG,Question 7.11] Let X be a weighted projective line. What is the exact value of fpd n D b (coh(X)), for n ≥ 1, in terms of other invariants of X?…”

Frobenius-Perron theory for projective schemes