Publications

V. BLOMER, G. HARCOS, Twisted L-functions over number fields and Hilbert's eleventh problem, Geom. Funct. Anal., to appear [pdf]

V. BLOMER, G. HARCOS, L-functions, automorphic forms, and arithmetic, In: Symmetries in Algebra and Number Theory (I. Kersten, R. Meyer eds.), 11–25., Universitätsverlag Göttingen, 2009. [pdf]

V. BLOMER, G. HARCOS, The spectral decomposition of shifted convolution sums, Duke Math. J. 144 (2008), 321-339. [pdf]

V. BLOMER, G. HARCOS, Hybrid bounds for twisted L-functions, J. Reine Angew. Math. 621 (2008), 53-79. [pdf]

T. BERGER, G. HARCOS, ℓ-adic representations associated to modular forms over imaginary quadratic fields, Int. Math. Res. Not. 2007, no. 23, Art. ID rnm113, 16 pp. [pdf]

V. BLOMER, G. HARCOS, P. MICHEL, Bounds for modular L-functions in the level aspect, Ann. Sci. École Norm. Sup. 40 (2007), 697-740. [pdf]

V. BLOMER, G. HARCOS, P. MICHEL, A Burgess-like subconvex bound for twisted L-functions (with Appendix 2 by Z. MAO), Forum Math. 19 (2007), 61-105. [pdf]; Addendum [pdf]

G. HARCOS, P. MICHEL, The subconvexity problem for Rankin-Selberg L-functions and equidistribution of Heegner points. II, Invent. Math. 163 (2006), 581-655. [pdf]

G. HARCOS, New bounds for automorphic L-functions, Ph. D. thesis, Princeton University, 2003 [pdf]

G. HARCOS, An additive problem in the Fourier coefficients of Maass forms, Math. Ann. 326 (2003), 347-365. [pdf]

G. HARCOS, Uniform approximate functional equation for principal L-functions, Int. Math. Res. Not. 2002, no. 18, 923-932. [pdf]; Erratum, ibid. 2004, no. 13, 659-660.[pdf]

I. BÁRÁNY, G. HARCOS, J. PACH, G. TARDOS, Covering lattice points by subspaces, Period. Math. Hung. 43 (2001), 93-103. [pdf]

P. ERDŐS, G. HARCOS, J. PACH, Popular distances in 3-space, Discrete Math. 200 (1999), 95-99. [pdf]

G. HARCOS, On sums of four smooth squares, J. Number Theory 77 (1999), 145-154. [pdf]

G. HARCOS, I. Z. RUZSA, A problem on zero subsums in abelian groups, Period. Math. Hung. 35 (1997), 31-34. [pdf]

G. HARCOS, Waring's problem with small prime factors, Acta Arith. 80 (1997), 165-185. [pdf]

G. HARCOS, On power sums of complex numbers whose sum is 0, Acta Math. Hung. 66 (1995), 51-60. [pdf]

G. HARCOS, Milyen távolságokra eshet egy valós szám az összes racionális számtól? [What are the possible distances between a real number and all the rationals?], Undergraduate thesis, Eötvös Loránd University, 1996 (Hungarian) [pdf]; English summary [pdf]

G. HARCOS, Lovagok és lókötők a gödeli szigeteken [Knights and knaves on the gödelian islands], Középiskolai Mat. Lapok 42 (1992), 337-342. (Hungarian) [pdf]

G. HARCOS, Mely valós számok esnek a legtávolabbra az összes racionális számtól? [Which real numbers have the largest possible distance from all the rationals?], Középiskolai Mat. Lapok 42 (1992), 97-105. (Hungarian) [pdf]