Advances on the Conjecture of Erdos-S\'os for spiders

Abstract

- A hamiltonian graph G verifying e(G)>n(k-1)/2 %with a vertex of degree greater or equal than k contains any k-spider. - If G is a graph with average degree d > k-1, then every spider of size k is contained in G for k 10. - A 2-connected graph with average degree d > 2+3+4 contains every spider of 4 legs S1,2,3,4. We claim also that the condition of 2-connection is not needed, but the proof is very long and it is not included in this document.