Introduces p-Bohr radii of order N for Banach space valued holomorphic functions and proves positivity equivalent to p-uniform C-convexity of order N when p≥2, with results for L^q spaces and operator-valued inequalities.
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The paper establishes sharp improved and refined operator-valued versions of Bohr's inequality on the unit disk together with their multidimensional analogues on complete circular domains in C^n.
Derives Bohr radii for operator-valued polyanalytic functions of the form sum conjugate(z)^l f_l(z) where the leading term is subordinate to operator-valued convex or starlike biholomorphic functions.
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Bohr and Rogosinski inequalities for operator valued holomorphic functions
Introduces p-Bohr radii of order N for Banach space valued holomorphic functions and proves positivity equivalent to p-uniform C-convexity of order N when p≥2, with results for L^q spaces and operator-valued inequalities.
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Operator valued analogues of multidimensional Bohr's inequality
The paper establishes sharp improved and refined operator-valued versions of Bohr's inequality on the unit disk together with their multidimensional analogues on complete circular domains in C^n.
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Bohr operator on opertor valued polyanalytic functions on simply connected domains
Derives Bohr radii for operator-valued polyanalytic functions of the form sum conjugate(z)^l f_l(z) where the leading term is subordinate to operator-valued convex or starlike biholomorphic functions.