PREPRINTS and PUBLICATIONS

[21]. M. Liu, E. Peltola, H. Wu. Uniform spanning tree in topological polygons, partition functions for SLE(8), and correlations in c = −2 logarithm CFT. arXiv:2108.04421. 2021.

[20]. T. Lupu, H. Wu. A level line of the Gaussian free field with measure-valued boundary conditions. arXiv:2106.15169. 2021. 

[19]. Y. Han, M. Liu, H. Wu. Hypergeometric SLE with κ = 8: convergence of UST and LERW in topological rectangles. arxiv:2008.00403. 2020.  

[18]. J. Ding, M. Wirth, H. Wu. Crossing estimates from metric graph and discrete GFF. arXiv:2001.06447. Ann. Inst. H. Poincare Probab. Statist. to appear. 2020.

[17]. E. Peltola, H. Wu. Crossing probabilities of multiple Ising interfaces. arXiv:1808.09438. 2018 

[16]. V. Beffara, E. Peltola, H. Wu. On the uniqueness of global multiple SLEs. Ann. Probab. 49(1): 400-434, 2021.

[15]. M. Liu, H. Wu. Scaling limits of crossing probabilities in metric graph GFF.  Electron. J. Probab. 26: article no. 37, 1-46, 2021.

[14]. H. Wu. Hypergeometric SLE: conformal Markov characterization and applications. Comm. Math. Phys. 374(2): 433-484, 2020.

[13]. C. Garban, H. Wu. On the convergence of FK-Ising percolation to SLE(16/3, 16/3 − 6). J. Theor. Probab. 33: 828–865, 2020

[12]. E. Peltola, H. Wu. Global and local multiple SLEs for κ ≤ 4 and connection probabilities for level lines of GFF. Comm. Math. Phys. 366(2): 469-536, 2019.

[11]. H. Wu. Alternating arm exponents for the critical planar Ising model. Ann. Probab. 46(5): 2863-2907, 2018.

[10]. H. Wu. Polychromatic arm exponents for the critical planar FK-Ising model. J. Stat. Phys. 170(6): 1177-1196, 2018.

[9]. G. Pete, H. Wu. A conformally invariant growth process of SLE excursions. Lat. Am. J. Probab. Math. Stat. 15: 851-874, 2018.

[8]. J. Miller, H. Wu. Intersections of SLE paths: the double and cut point dimension of SLE. Probab. Theory Relat. Fields, 167:45-105, 2017.

[7]. H. Wu, D. Zhan. Boundary arm exponents for SLE. Electron. J. Probab. 22: article no. 89, 1-26, 2017.

[6]. E. Powell, H. Wu. Level lines of the Gaussian free field with general boundary data. Ann. Inst. H. Poincar ́e Probab. Statist. 53(4), 2229–2259, 2017.

[5]. M. Wang, H. Wu. Level lines of Gaussian free field I: zero-boundary GFF. Stochastic Process. Appl. 127(4):1045-1124, 2017.

[4]. S. Sheffield, S. Watson, H. Wu. Simple CLE in doubly connected domains. Ann. Inst. H. Poincar ́e Probab. Statist. 53(2): 594-615, 2017.

[3]. H. Wu. Conformal restriction: the radial case. Stochastic Process. Appl. 125(2):552-570, 2015.

[2]. W. Werner, H. Wu. On conformally invariant CLE explorations. Comm. Math. Phys. 320(3): 637-661, 2013.

[1]. W. Werner, H. Wu. From CLE(κ) to SLE(κ, ρ). Electron. J. Probab. 18: article no. 36, 1-20, 2013.

LECTURE NOTES and SURVEYS

[2]. H. Wu. Conformal restriction and Brownian motion. Probab. Surv. 12:55-103, 2015.

[1]. H. Wu. On the occupation times of Brownian excursions and Brownian loops. Lecture Notes in Math. Vol.2046:149-166, Springer, Heidelberg, 2012.