English

Strong $(r,p)$ Cover for Hypergraphs

Discrete Mathematics 2015-07-19 v1 Combinatorics

Abstract

We introduce the notion of the { \it strong (r,p)(r,p) cover} number χc(G,k,r,p)\chi^c(G,k,r,p) for kk-uniform hypergraphs G(V,E)G(V,E), where χc(G,k,r,p)\chi^c(G,k,r,p) denotes the minimum number of rr-colorings of vertices in VV such that each hyperedge in EE contains at least min(p,k)min(p,k) vertices of distinct colors in at least one of the χc(G,k,r,p)\chi^c(G,k,r,p) rr-colorings. We derive the exact values of χc(Knk,k,r,p)\chi^c(K_n^k,k,r,p) for small values of nn, kk, rr and pp, where KnkK_n^k denotes the complete kk-uniform hypergraph of nn vertices. We study the variation of χc(G,k,r,p)\chi^c(G,k,r,p) with respect to changes in kk, rr, pp and nn; we show that χc(G,k,r,p)\chi^c(G,k,r,p) is at least (i) χc(G,k,r1,p1)\chi^c(G,k,r-1,p-1), and, (ii) χc(G,k1,r,p1)\chi^c(G',k-1,r,p-1), where GG' is any (n1)(n-1)-vertex induced sub-hypergraph of GG. We establish a general upper bound for χc(Knk,k,r,p)\chi^c(K_n^k,k,r,p) for complete kk-uniform hypergraphs using a divide-and-conquer strategy for arbitrary values of kk, rr and pp. We also relate χc(G,k,r,p)\chi^c(G,k,r,p) to the number E|E| of hyperedges, and the maximum {\it hyperedge degree (dependency)} d(G)d(G), as follows. We show that χc(G,k,r,p)x\chi^c(G,k,r,p)\leq x for integer x>0x>0, if E12(rk(t1)k(rt1))x|E|\leq \frac{1}{2}({\frac{r^k}{(t-1)^k \binom{r}{t-1}}})^x , for any kk-uniform hypergraph. We prove that a { \it strong (r,p)(r,p) cover} of size xx can be computed in randomized polynomial time if d(G)1e(rk(p1)k(rp1))x1d(G)\leq \frac{1}{e}({\frac{r^k}{(p-1)^k \binom{r}{p-1}}})^x-1.

Cite

@article{arxiv.1507.03160,
  title  = {Strong $(r,p)$ Cover for Hypergraphs},
  author = {Tapas Kumar Mishra and Sudebkumar Prasant Pal},
  journal= {arXiv preprint arXiv:1507.03160},
  year   = {2015}
}
R2 v1 2026-06-22T10:10:07.308Z