| Abstract: | Let X be a quasi‐Banach space, Y be a γ‐Banach space  and T be a bounded linear operator from X into Y . In this paper, we prove that the first outer entropy number of T lies between  and  ; more precisely,  , and the constant  is sharp. Moreover, we show that there exist a Banach space X 0, a γ‐Banach space Y 0 and a bounded linear operator  such that  for all positive integers k . Finally, the paper also provides two‐sided estimates for entropy numbers of embeddings between finite dimensional symmetric γ‐Banach spaces. |
