Congruences concerning Legendre polynomials II

Abstract

Let p>3 be a prime, and let m be an integer with p m. In the paper we solve some conjectures of Z.W. Sun concerning Σk=0p-12kk3/mkp2, Σk=0p-12kk4k2k/mk p and Σk=0p-12kk24k2k/mk p2. In particular, we show that Σk=0p-122kk3 0 p2 for p 3,5,6 7. Let Pn(x) be the Legendre polynomials. In the paper we also show that P[ p4](t) -(-6p)Σx=0p-1 (x3-3/2(3t+5)x-9t-7p) p and determine Pp-12( 2), Pp-12(3 24), Pp-12( -3),Pp-12( 32), Pp-12( -63), Pp-12( 3 78) p, where t is a rational p-integer, [x] is the greatest integer not exceeding x and ( ap) is the Legendre symbol. As consequences we determine P[ p4](t) p in the cases t=-5/3,-7/9,-65/63 and confirm many conjectures of Z.W. Sun.