[45]Z. Tao and X. Guo, CM points, class numbers, and the Mahler measures of
$x^3 +y^3 +1-kxy$, Math. Comp. 94 (2025), 425-446.
[44]X. Guo, Q. Ji, H. Liu and H. Qin, The Mahler measure of $x+1/x+y+1/y+4\pm 4\sqrt{2}$ and Beilinson's conjecture, International Journal of Number Theory
Vol. 20, No. 1 (2024) 185¨C197.
[43] Y. Lu, T. Wei and X. Guo, An improvement on the parity of Schur's partition function, J. Math. Anal. Appl., Volume 528, Issue 2, 15 December 2023, 127530.
[42]X. Guo, X. Li, Z. Tao and T. Wei, The eigenvectors-eigenvalues identity and Sun's conjectures on determinants and permanents, Linear and Multilinear Algebra 72 (2024), No 7, 1071-1077. DOI:10.1080/03081087.2023.2172380.
[41]T. Wei and X. Guo, Solvable lattice sums and quadratic Dirichlet $L$-values, Acta Arithmetica 203 (2022), 227-238.
[40]Z. Tao and X. Guo, On determinants involving tangent functions, Linear and Multilinear Algebra 71 (2023), No 13, 2212-2221. https://doi.org/10.1080/03081087.2022.2094865.
[39]X. Guo, Determinants of trigonometric functions and class numbers, Linear Algebra and its Applications 653 (2022), 33-43.
[38]H. Zheng, X. Guo and H. Qin, The Mahler measure of $ (x+1/x)(y+1/y) (z+1/z)+\sqrt{k}$, Electronic Research Archive 28 (2020), 103-125.
[37]X. Guo and Y. Peng, Non-vanishing theta values of characters with special prime conductors, Journal of Mathematical Analysis and Applications 487 (2020) 123971, 1-10.
[36]X. Guo, Y. Peng and H. Qin, Three-variable Mahler measures and special values of L-Functions of Modular forms, Ramanujan Journal 54 (2021),147-175.
[35]W. Cheng and X. Guo, Some congruences connecting quadratic class numbers with continued fractions, Acta Arithmetica 191. 4 (2019), 309-340.
[34]Weidong Cheng and Xuejun Guo, On the 2-adic behavior of the number of domino tilings on a torus,Contributions to Discrete Mathematics 14 (2019), No 1, 55-70.
[33]Weidong Cheng and Xuejun Guo, The non-congruent numbers via Monsky's formula, International Journal of Number Theory 15 (2019), No 4, 677-711.
[32]Weidong Cheng and Xuejun Guo, Some new families of non-congruent numbers, Journal of Number Theory, Volume 196, March 2019, Pages 291-305.
[31]Xuejun Guo and Hourong Qin, The extended Bloch groups of biquadratic and dihedral number fields, Journal of Pure and Applied Algebra, Volume 222, Issue 12, December 2018, Pages 3968-3981.
[30]X. Cheng and X. Guo, On the 2-primary part of tame kernels of real quadra tic fields, Acta Mathematica Sinica, English Series
July 2016, Volume 32, Issue 7, pp 807-812.
[29] Xuejun Guo, Yuzhen Peng,Hourong Qin, On the representation numbers of ternary quadratic forms
and modular forms of weight 3/2,
J. Number Theory (140),2014,235-266.
[28]Xiaoyun Cheng, Xuejun Guo, On K_2(E_Z)for the Elliptic Curves y^2-y=x^3-x, Journal of Nanjing University Mathematical Biquarterly,Vol.30, No.2, 2013, 177-181.
[27] X. Cheng, X. Guo and H. Qin, The densities for 3-ranks of tame kernels of cyclic cubic number fields, Sci China Math, 2014(Jan 01), 57: 43-47, doi: 10.1007/s11425-013-4622-0.
[26]X. Guo and H. Qin, The tame kernels of number fields, Fifth Internationa
l Congress of Chinese Mathematicians (2012), AMS and International Press£¬
293-304.
[25]X. Guo and H. Qin, Governing fields of the $K_2\O_{\mathbb{Q}(\sqrt{dp})}(2)$ as p varies, Number Theory and Related Area ALM27, 41-50.
[24] Y. Peng and X. Guo, The K_1 group of tiled orders , Communications in Algebra, 41:10 (2013 Oct 05),
3739-3744.
[23] X. Guo and H. Qin, The 8-rank of tame kernels of quadratic number fields,
Acta Arith. 152 (2012), 407-424.
[22] X. Guo and H. Qin, Imaginary quadratic fields with Ono number 3,
Communications in Algebra, 1532-4125, Volume 38 (1), 2010, 230-232
[21] X. Guo, An adelic approach to intertwiners, preprint.
[20] X. Guo, On the 4-rank of tame kernels of quadratic number fields, Acta Arith. 136 (2), 2009, 135-149.
[19] X. Guo and A. O. Kuku, Higher class groups of locally triangular orders over
number fields, Algebra Colloquium 16 : 1 (2009), 79-84.
[18] X. Guo, Even dimensional higher class groups of orders,
Math. Z. (2009) 261:617-624.
[17] X. Guo, The 3-ranks of tame kernels of cubic cyclic number fields, Acta Arith. 129 (2007), 389-395.
[16] X. Guo and H. Qin, The 3-adic regulators and wild kernels, Journal of algebra 312 (2007), No 1, 418-425.
[15] X. Guo and A. Kuku, Wild kernels for higher K-theory of division and
semi-simple algebras, Contributions to Algebra and Geometry 47 (2006), No. 1, 1-14 .
[14] X. Guo, The torsion elements in K2 of some local fields, Acta Arithmetica 127 (2007),
97-102
[13] X. Guo and H. Qin, Uniqueness of Moore¡¯s higher reciprocity law
at the prime 2 for real number fields, J. K-theory 01 (2008), 185-192.
[12] X. Guo, A remark on K2 of the rings of integers of totally
real number fields, Communications in Algebra 35 (2007), Issue 9 , 2889 - 2893.
[11] X. Guo, A. O. Kuku and H. Qin, On K2 of division algebras, Communications
in Algebra 33 (2005) No. 4£¬ 1073--1081.
[10] X. Guo and A. O. Kuku, Higher class groups of generalized Eichler orders, Communications
in Algebra 33 (2005) No. 3, 709-718.
[9] X. Guo and H. Qin, An embedding theorem for Eichler orders, Journal of
Number Theory 107 (2004), No 2, 207-214.
[8] X. Guo and H. Qin, A remark on the positivity for K2, Journal of Algebra 270
(2003), No. 2, 369-373.
[6] G. Song, X. Guo and P. Du, K1 groups of semi- perfect rings, Advances in
Mathematics (China) 32 (2003) No.2, 195-200.
[7] X. Guo, H. Qin and G. Song, Computing the tame kernel of Q(\zets_8),
Communications in Algebra 31 (2003) No. 2, 1-12.
[5] X. Guo and G. Song, A remark on computing the tame kernel of quadratic
imaginary fields, Acta Mathematica Sinica 18 (2002) no. 3, 513--516.
[4] X. Guo and L. Li, K1 group of finite-dimensional path algebra, Acta
Mathematica Sinica 17 (2001) No 2, 273-276.
[3] X. Guo and G. Song, Diagonalization of idempotent matrices over APT rings,
Mathematics Research and Expositions 21 (2001) No 1, 21-26.
[2] G. Song and X. Guo, Diagonability of idempotent matrices over non-commutative
rings, Linear Algebra and its Application 297 (1999) 1-7.
[1] X. Guo and G. Song, FPF rings and the Aut-Pic property, Math Study 31 (1998)
No 4, 394-399.