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The GL-l.u.st.\ constant and asymmetry of the Kalton-Peck twisted sum in finite dimensions
classification
🧮 math.FA
keywords
constantgl-lasymmetryconstantskalton-pecktwistedboundedconcrete
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We prove that the Kalton-Peck twisted sum $Z_2^n$ of $n$-dimensional Hilbert spaces has GL-l.u.st.\ constant of order $\log n$ and bounded GL constant. This is the first concrete example which shows different explicit orders of growth in the GL and GL-l.u.st.\ constants. We discuss also the asymmetry constants of $Z_2^n$.
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