The generalized k-resultant modulus set problem in finite fields

Abstract

Let Fqd be the d-dimensional vector space over the finite field Fq with q elements. Given k sets Ej⊂ Fqd for j=1,2,…, k, the generalized k-resultant modulus set, denoted by k(E1,E2, …, Ek), is defined by k(E1,E2, …, Ek)=\\| x1+ x2+·s+ xk\|∈ Fq: xj∈ Ej,\, j=1,2,…, k\, where \| y\|= y12+ ·s + yd2 for y=( y1, …, yd)∈ Fqd. We prove that if Πj=13 |Ej| C q3(d+12 -16d+2) for d=4,6 with a sufficiently large constant C>0, then |3(E1,E2,E3)| cq for some constant 0<c 1, and if Πj=14 |Ej| C q4(d+12 -16d+2) for even d 8, then |4(E1,E2,E3, E4)| cq. This generalizes the previous result in CKP16. We also show that if Πj=13 |Ej| C q3(d+12 -19d-18) for even d 8, then |3(E1,E2,E3)| cq. This result improves the previous work in CKP16 by removing >0 from the exponent.