Ozcan Yazici scite author profile

Ozcan Yazici

4Publications

2Citation Statements Received

36Citation Statements Given

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Middle East Technical University, Texas A&M University at Qatar

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Finite type points on subsets of Cn

Yazici

2020

Journal of Mathematical Analysis and Applications

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In [4], D'Angelo introduced the notion of points of finite type for a real hypersurface M ⊂ C n and showed that the set of points of finite type in M is open. Later, Lamel-Mir [8] considered a natural extension of D'Angelo's definition for an arbitrary set M ⊂ C n . Building on D'Angelo's work, we prove the openness of the set of points of finite type for any subset M ⊂ C n .2010 Mathematics Subject Classification. 32F18, 32T25, 32V35.

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Extension of plurisubharmonic functions in the Lelong class

Yazici¹

2014

Illinois J. Math.

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Let X be an algebraic subvariety of C n and X be its closure in P n . In their paper [2] Coman-Guedj-Zeriahi proved that any plurisubharmonic function with logarithmic growth on X extends to a plurisubharmonic function with logarithmic growth on C n when the germs (X, a) in P n are irreducible for all a ∈ X \ X. In this paper we consider X for which the germ (X, a) is reducible for some a ∈ X \ X and we give a necessary and sufficient condition for X so that any plurisubharmonic function with logarithmic growth on X extends to a plurisubharmonic function with logarithmic growth on C n . Proof of the Theorem 1.2We need some lemmas to prove Theorem 1.2.Lemma 2.1. Let X be as in Theorem 1.2 and let a ∈ X \ X. If two irreducible components X i and X j of the germ (X, a) are not linked then (X, a) =X i ∪X j whereX i andX j are germs of subvarieties of X at a such thatX i ∩X j ∩C n = ∅.

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Upper level sets of Lelong numbers on $$\mathbb P^2$$ and cubic curves

Kişisel

Yazici

2021

Math. Z.

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Local Boundedness of Catlin q-Type

Yazici

2022

Mediterr. J. Math.

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Ozcan Yazici

Finite type points on subsets of Cn

Extension of plurisubharmonic functions in the Lelong class

Upper level sets of Lelong numbers on $$\mathbb P^2$$ and cubic curves

Local Boundedness of Catlin q-Type

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