[14] JianYa Liu, Haiwei Sun and Yangbo Ye, Double square moments and subconvexity bounds for Rankin-Selberg L-functions of holomorphic cusp forms, Sci. China Math. 63 (2020): 823-844.
[13] Haiwei Sun and Yangbo Ye, Further improvement on bounds for L-functions related to GL(3), Int. J. Number Theory 15 (7) (2019), 1487–1517.
[12] Haiwei Sun and Yangbo Ye, Double first moment for L(1/2,Sym^2f x g) applying Petersson's formula twice, J. Number Theory 202 (2019), 141–159.
[11] Mark Mckee, Haiwei Sun and Yangbo Ye, Improved subconvexity bounds for GL(2)*GL(3) and GL(3) L-functions by weighted stationary phase, Trans. Amer. Math. Soc., 370(5) (2018), 3745-3769.
[10] Mark Mckee, Haiwei Sun and Yangbo Ye, Weighted stationary phase of higher orders, Frontiers of Mathematics in China (3) 12 (2017), 675-702.
[9] Guanghua Ji and Haiwei Sun, Moments of L-functions attached to the twist of modular form by Dirichlet character, Chin. Ann. Math. (2) 35 B (2015), 237-252.
[8] Zhixin Liu and Haiwei Sun, Diophantine approximation with one prime and three squares of primes, The Ramanujan Journal (3 ) 30 (2013), 327-340.
[7] Zhixin Liu and Haiwei Sun, Diopantine approximation with four squares of primes and powers of 2, Chin. Ann. Math., Series A, (5) 34 A (2013), 599-608.
[6] Guangshi Lv and Haiwei Sun, The ternary Goldbach–Vinogradov theorem with almost equal primes from the Beatty sequence, The Ramanujan Journal (2) 30 (2013), 153-161.
[5] Haiwei Sun, The vales of additive forms at prime arguments, Studia Sci. Math. Hungarica. (4) 48 (2011), 421–444.
[4] Guangshi Lv and Haiwei Sun, Prime in quadratic progressions on average, Acta Math. Sin. (Engl. Ser.) (6) 27 (2011) , 1187–1194.
[3] Haiwei Sun and Guangshi Lv, On fractional power moments of L-functions associated with certain cusp forms, Acta Appl Math , 109 (2010), 653–667.
[2] Guangshi Lv and Haiwei Sun, On a generalization of Hua's theorem with five squares of primes, Acta Math. Hungar. (3) 122 (2009), 273–282.
[1] Guangshi Lv and Haiwei Sun, Integers represented as the sum of one prime, two squares of primes and powers of 2. Proc. Amer. Math. Soc. (4) 137 (2009), 185–1191.
