A Note on Projective Monomial Surfaces

## Abstract We show that all graphs with a simple extension property are projective. As a consequence of this result we settle in the affirmative a conjecture of Larose and Tardif and characterize all homogeneous graphs which are projective. © 2004 Wiley Periodicals, Inc. J Graph Theory 47: 81–86,

We discuss algebraic C-monomials of Deligne. Deligne used the theory of Hodge Cycles to show that algebraic C-monomials generate Kummer extensions of certain cyclotomic fields. Das, using a double complex of Anderson and Deligne's results, showed that certain powers of algebraic C-monomials and cert

In this note we give an example of a strictly convex, reflexive, smooth Banach space which has a Chebyshev subspace \(M\), such that the projection onto \(M\) is linear and has norm equal to 2 . Moreover, we give necessary and sufficient conditions on a space so that every projection has norm less t

## Abstract In this paper, we shall show that an irreducible triangulation of a closed surface __F__^2^ has at most __cg__ vertices, where __g__ stands for a genus of __F__^2^ and __c__ a constant. © 1995, John Wiley & Sons, Inc.

A graph is (rn, k)-colorable if its vertices can be colored with rn colors in such a way that each vertex is adjacent to at most k vertices of the same color as itself. In a recent paper Cowen. Cowen, and Woodall proved that, for each compact surface S, there exists an integer k = k(S) such that eve