Values for the vacuum energy of scalar fields under Dirichlet and Neumanboundary conditions on an infinite clylindrical surface are found, and theyhappen to be of opposite signs. In contrast with classical works, a completezeta function regularization scheme is here applied. These fields are regardedas interesting both by themselves and as the key to describing theelectromagnetic (e.m.) case. With their help, the figure for the e.m. Casimireffect in the presence of this surface, found by De Raad and Milton, is nowconfirmed.
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机译:发现了在无限圆柱面的Dirichlet和Neumanboundary条件下标量场的真空能值,并且它们似乎相反。与经典作品相反,此处应用了completezeta函数正则化方案。这些字段本身被认为是有趣的,并且是描述电磁(e.m.)情况的关键。在他们的帮助下, De Raad和Milton在存在该表面的情况下确定了Casimireffect。
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