Pinned distance sets, k-simplices, Wolff’s exponent in finite fields and sum-product estimates

Abstract: Abstract. An analog of the Falconer distance problem in vector spaces over finite fields asks for the threshold α > 0 such that |∆(E)| q whenever |E| q α , where E ⊂ F d q , the d-dimensional vector space over a finite field with q elements (not necessarily prime). Here x ∈ E} for a pin y ∈ E has been studied in the Euclidean setting. Peres and Schlag ([25]) showed that if the Hausdorff dimension of a set E is greater than d+1 2 then the Lebesgue measure of ∆y(E) is positive for almost every pin y. In this pap… Show more

“…We actually can prove a stronger form of this theorem. More precisely, the author ( [14]) gave a graph-theoretic proof of the following result (see also [3,13] for analogous results in the finite field setting). …”

Product graphs, sum-product graphs and sum-product estimates over finite rings

“…We actually can prove a stronger form of this theorem. More precisely, the author ( [14]) gave a graph-theoretic proof of the following result (see also [3,13] for analogous results in the finite field setting). …”

Product graphs, sum-product graphs and sum-product estimates over finite rings

“…For more details on this result and for other results on the distance graph of F d q , see [1], [3], [6] and [7].…”

Long Paths in the Distance Graph Over Large Subsets of Vector Spaces Over Finite Fields

“…, see also [64,201,205]. Several more interesting results in this direction have been given by Hegyvári [121,122] and Vinh [198,201,205,206].…”

“…Furthermore, Schoen & Shkredov [167] have successfully used a "cubic" generalization of the energy. We also have had to leave out such exciting areas of additive combinatorics in finite fields as • the Erdős distance problem [83,94,117,130,132,144,145] as well as its modification in some other settings (distinct volumes, configurations, and so on defined by arbitrary sets in F n q ) and metrics [14,64,142,195,200,202,203,205]; • the Kakeya problem and other related problems about the directions defined by arbitrary sets in vector spaces over a finite field, see [84-86, 88, 128, 131, 151]; • estimating the size of the sets in a finite field that avoid arithmetic or geometric progressions, sum sets and similar linear and non-linear relations; in particular these results include finite field analogues of the Roth and Szemerédi theorems, see [1,6,8,12,77,81,112,113,153,154,158,181]; • estimating the size of the sets in vector spaces over a finite field that define only some restrictive geometric configurations such as integral distances, acute angles, and pairwise orthogonal systems, see [75,133,134,183,194,204]; • distribution of the values of determinants and permanents of matrices with entries from general sets, see [74,196,197]; and several others.…”

Additive Combinatorics over Finite Fields: New Results and Applications