@misc{Petrosyan_Petros_Interval, author={Petrosyan Petros}, howpublished={online}, language={English}, abstract={An interval (t, h)-coloring (h e Z + ) o f a graph G is a proper edge-coloring a o f G with colors 1 , . . . , t such that all colors are used, and the colors o f edges incident to each vertex v satisfy the condition dG (v) — 1 < S (v, a) — S (v, a) < dG (v) + h — 1, where dG (v) is the degree o f a vertex v in G, S (v, a) is the set o f colors o f edges incident to v, and S (v, a) and S (v, a ) are the smallest and largest colors o f S (v ,a ) , respectively. In this paper we investigate interval (t, h )-colorings o f bipartite graphs. In particular, we prove that: 1) if G is a bipartite graph with A (G ) = 4, then G has an interval (4 ,1)-coloring; 2) if G is a bipartite graph with A (G ) = 5 and without a vertex o f degree 3, then G has an interval (5 ,1)-coloring; 3) if G is a bipartite graph with A (G ) = 6 and it has a 2-factor, then G has an interval (6 ,1)-coloring. We also obtain some results on interval (t, h)-colorings o f biregular bipartite graphs and hypercubes.}, title={Interval Edge-Colorings with Gaps of Bipartite Graphs}, type={Conference}, }