On Necessary and Sufficient Conditions for the Cook-Criterion

Evolutionary suicide is an evolutionary process where a viable population adapts in such a way that it can no longer persist. It has already been found that a discontinuous transition to extinction is a necessary condition for suicide. Here we present necessary and sufficient conditions, concerning

It ii3 dww?l thue in th6 t.xl.96 of c?wged beama of fini& ai-C.wad/orfi\* 430tromagnetio wave-gui4Sing atru&tbrea, t?~ condition v so/n ~2 a nec+xwq but not a eum?lt cCwww5n for gsnercctiora of Cmhv l-ad&&n. DiTpeding upon tluTwdu@wn , 8i.w ancE geometry of th6 beama, and dimlteione of t?w. waue-gtc

We seek metrics conformal to the standard ones on S" having prescribed Gaussian curvature in case n = 2 (the Nirenberg Problem), or prescribed scalar curvature for n t 3 (the Kazdan-Warner problem). There are well-known Kazdan-Warner and Bourguignon-Ezin necessary conditions for a function R(x) to b

It is shown that any symmetric matrix can be considered as the short circuit admittance matrix of a graph consisting of the union of a complete graph and arbitrary tree form. The necessary and sufficient conditions that a real matrix of order v-1 be the short circuit admittance matrix of a v-vertex