{"title":"Local asymptotics for the area of random walk excursions","publisher":"London Mathematical Society","date_updated":"2022-09-14T05:01:45Z","author":[{"last_name":"Kolb","id":"48880","full_name":"Kolb, Martin","first_name":"Martin"},{"full_name":"Denisov, Denis","last_name":"Denisov","first_name":"Denis"},{"first_name":"Vitali","full_name":"Wachtel, Vitali","last_name":"Wachtel"}],"date_created":"2022-09-14T05:01:41Z","volume":91,"year":"2015","citation":{"chicago":"Kolb, Martin, Denis Denisov, and Vitali Wachtel. “Local Asymptotics for the Area of Random Walk Excursions.” <i>Journal of the London Mathematical Society</i> 91, no. 2 (2015): 495–513.","ieee":"M. Kolb, D. Denisov, and V. Wachtel, “Local asymptotics for the area of random walk excursions,” <i>Journal of the London Mathematical Society</i>, vol. 91, no. 2, pp. 495–513, 2015.","ama":"Kolb M, Denisov D, Wachtel V. Local asymptotics for the area of random walk excursions. <i>Journal of the London Mathematical Society</i>. 2015;91(2):495-513.","bibtex":"@article{Kolb_Denisov_Wachtel_2015, title={Local asymptotics for the area of random walk excursions}, volume={91}, number={2}, journal={Journal of the London Mathematical Society}, publisher={London Mathematical Society}, author={Kolb, Martin and Denisov, Denis and Wachtel, Vitali}, year={2015}, pages={495–513} }","short":"M. Kolb, D. Denisov, V. Wachtel, Journal of the London Mathematical Society 91 (2015) 495–513.","mla":"Kolb, Martin, et al. “Local Asymptotics for the Area of Random Walk Excursions.” <i>Journal of the London Mathematical Society</i>, vol. 91, no. 2, London Mathematical Society, 2015, pp. 495–513.","apa":"Kolb, M., Denisov, D., &#38; Wachtel, V. (2015). Local asymptotics for the area of random walk excursions. <i>Journal of the London Mathematical Society</i>, <i>91</i>(2), 495–513."},"page":"495-513","intvolume":"        91","publication_status":"published","issue":"2","language":[{"iso":"eng"}],"_id":"33360","user_id":"85821","department":[{"_id":"96"}],"abstract":[{"text":"We prove a local limit theorem for the area of the positive excursion of random walks with zero mean and finite variance. Our main result complements previous work of Caravenna and Chaumont; Sohier, as well as Kim and Pittel.","lang":"eng"}],"status":"public","type":"journal_article","publication":"Journal of the London Mathematical Society"}