Geometric characterization and classification of marked subspaces

## Abstract A marked graph is obtained from a graph by giving each point either a positive or a negative sign. Beineke and Harary raised the problem of characterzing consistent marked graphs in which the product of the signs of the points is positive for every cycle. In this paper a characterizatio

## Abstract It is shown that for any locally compact abelian group 𝔾 and 1 ≤ __p__ ≤ 2, the Fourier type __p__ norm with respect to 𝔾 of a bounded linear operator __T__ between Banach spaces, denoted by ‖__T__ |ℱ𝒯^𝔾^~__p__~‖, satisfies ‖__T__ |ℱ𝒯^𝔾^~__p__~‖ ≤ ‖__T__ |ℱ𝒯^𝔸^~__p__~‖, where 𝔸 is the d

Let \(R(, \mathscr{N}, \ldots\) be the space of bounded non-degenerate representations \(\pi: \alpha \rightarrow, 1\), where \(\alpha\) is a nuclear \(C^{*}\)-algebra and, 1 an injective von Neumann algebra with separable predual. We prove that \(R(\mathscr{\mathscr { C } , , 1 )}\) ) is an homogene