Abstract
The Grothendieck constant of a graph G = ( V , E ) is the least constant K such that for every matrix A : V × V → R , max f : V → S | V | − 1 ∑ u , v ∈ E A ( u , v ) ⋅ 〈 f ( u ) , f ( v ) 〉 ≤ K max ϵ : V → − 1 , + 1 ∑ u , v ∈ E A ( u , v ) ⋅ ϵ ( u ) ϵ ( v ) . The investigation of this parameter, introduced in N. Alon, K. Makarychev, Y. Makarychev, A. Naor, Quadratic forms on graphs, in: Proc. of the 37th \ACM\ STOC, \ACM\ Press, Baltimore, 2005, pp. 486–493 (Also: Invent. Math. 163 (2006) 499–522), is motivated by the algorithmic problem of maximizing the quadratic form ∑ u , v ∈ E A ( u , v ) ϵ ( u ) ϵ ( v ) over all ϵ : V → − 1 , 1 , which arises in the study of correlation clustering and in the investigation of the spin glass model. In the present note we show that for the random graph G ( n , p ) the value of this parameter is, almost surely, Θ ( log ( n p ) ) . This settles a problem raised in N. Alon, K. Makarychev, Y. Makarychev, A. Naor, Quadratic forms on graphs, in: Proc. of the 37th \ACM\ STOC, \ACM\ Press, Baltimore, 2005, pp. 486–493 (Also: Invent. Math. 163 (2006) 499–522). We also obtain a similar estimate for regular graphs in which the absolute value of each nontrivial eigenvalue is small.
Users
Please
log in to take part in the discussion (add own reviews or comments).