Holomorphic functions and integral representations in several complex variables
Book
Formal Antecedent
Foundations and Logic
Citation
Range, R. Michael. (1986). Holomorphic functions and integral representations in several complex variables. Springer.
Why this reference is included
Range’s Holomorphic functions and integral representations in several complex variables (1986), published by Springer, sits in the program’s reference corpus as a standing technical source. Cited across Book II (Categorical Holomorphy), Part 9, Chapter Hartogs Extension in H_τ; Book II (Categorical Holomorphy), Part 11, Chapter Why τ³ Has No Dimensional Ladder — the central framing is “Classical several complex variables (SCV) answers a related question via the Hartogs extension theorem : a holomorphic function defined on the complement of a compact subset of a…”.
Cited in
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Book II — Categorical Holomorphy Part 9Chapter Hartogs Extension in H_τ
Classical several complex variables (SCV) answers a related question via the Hartogs extension theorem : a holomorphic function defined on the complement of a compact subset of a domain in ℂ^n (n ≥ 2) extends uniquely to the full domain
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Book II — Categorical Holomorphy Part 11Chapter Why τ³ Has No Dimensional Ladder
We survey the ladder rung by rung, following the standard development of Krantz , Range , and Hörmander