Definition 30.4.1 (Disk Algebra).label Let $D = B_{\complex}(0, 1)$, then the disk algebra $A(D) = H(D; \complex) \cap C(\ol D; \complex)$ is the space of holomorphic functions on $D$ that extend to $\ol D$, equipped with the uniform norm.
Definition 30.4.1 (Disk Algebra).label Let $D = B_{\complex}(0, 1)$, then the disk algebra $A(D) = H(D; \complex) \cap C(\ol D; \complex)$ is the space of holomorphic functions on $D$ that extend to $\ol D$, equipped with the uniform norm.
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