Мақаланы E-mail арқылы жіберу The coarea formula for projections of Lipschitz maps of Carnot groups
- Авторлар: Basalaev S.G.1
-
Мекемелер:
- Faculty of Mechanics and Mathematics, Novosibirsk State University, Novosibirsk, Russia
- Шығарылым: Том 216, № 9 (2025)
- Беттер: 21-41
- Бөлім: Articles
- URL: https://journal-vniispk.ru/0368-8666/article/view/309462
- DOI: https://doi.org/10.4213/sm10158
- ID: 309462
Дәйексөз келтіру
Ашық рұқсат
Рұқсат берілді
Тек жазылушылар үшін
Аннотация
A special coarea inequality is established for the compositions of Lipschitz maps of Carnot groups with projections along horizontal vector fields. Equality is proved for maps with finite co-distortion and maps acting on the Heisenberg group.
Негізгі сөздер
Авторлар туралы
Sergey Basalaev
Faculty of Mechanics and Mathematics, Novosibirsk State University, Novosibirsk, Russia
Email: s.basalaev@g.nsu.ru
Candidate of physico-mathematical sciences, no status
Әдебиет тізімі
- H. Federer, “Curvature measures”, Trans. Amer. Math. Soc., 93:3 (1959), 418–491
- Г. Федерер, Геометрическая теория меры, Наука, М., 1987, 760 с.
- Л. К. Эванс, К. Ф. Гариепи, Теория меры и тонкие свойства функции, Научная книга (ИДМИ), Новосибирск, 2002, 216 с.
- M. Giaquinta, G. Modica, J. Souček, Cartesian currents in the calculus of variations, v. I, Ergeb. Math. Grenzgeb. (3), 37, Springer-Verlag, Berlin, 1998, xxiv+711 pp.
- Fanghua Lin, Xiaoping Yang, Geometric measure theory. An introduction, Adv. Math. (Beijing/Boston), 1, Science Press, Beijing; Int. Press, Boston, MA, 2002, x+237 pp.
- I. Chavel, Riemannian geometry. A modern introduction, Cambridge Stud. Adv. Math., 98, 2nd ed., Cambridge Univ. Press, Cambridge, 2006, xvi+471 pp.
- J. Maly, D. Swanson, W. P. Ziemer, “The co-area formula for Sobolev mappings”, Trans. Amer. Math. Soc., 355:2 (2003), 477–492
- L. Ambrosio, B. Kirchheim, “Rectifiable sets in metric and Banach spaces”, Math. Ann., 318:3 (2000), 527–555
- R. Montgomery, A tour of subriemannian geometries, their geodesics and applications, Math. Surveys Monogr., 91, Amer. Math. Soc., Providence, RI, 2002, xx+259 pp.
- С. K. Водопьянов, “О регулярности отображений, обратных к соболевским”, Матем. сб., 203:10 (2012), 3–32
- P. Pansu, Geometrie du group d'Heisenberg, Ph.D. thesis, Univ. Paris VII, 1982
- P. Pansu, “Metriques de Carnot–Caratheodory et quasiisometries des espaces symetriques de rang un”, Ann. of Math. (2), 129:1 (1989), 1–60
- J. Heinonen, “Calculus on Carnot groups”, Fall school in analysis (Jyväskylä, 1994), Rep. Univ. Jyväskylä Dep. Math. Stat., Univ. Jyväskylä, Jyväskylä, 1995, 1–31
- V. Magnani, “Note on coarea formulae in the Heisenberg group”, Publ. Mat., 48:2 (2004), 409–422
- V. Magnani, “Blow-up of regular submanifolds in Heisenberg groups and applications”, Cent. Eur. J. Math., 4:1 (2006), 82–109
- V. Magnani, “Non-horizontal submanifolds and coarea formula”, J. Anal. Math., 106 (2008), 95–127
- M. Karmanova, S. Vodop'yanov, “Geometry of Carnot–Caratheodory spaces, differentiability, coarea and area formulas”, Analysis and mathematical physics, Trends Math., Birkhäuser Verlag, Basel, 2009, 233–335
- M. Karmanova, S. Vodopyanov, “A coarea formula for smooth contact mappings of Carnot–Caratheodory spaces”, Acta Appl. Math., 128 (2013), 67–111
- R. Monti, D. Vittone, “Height estimate and slicing formulas in the Heisenberg group”, Anal. PDE, 8:6 (2015), 1421–1454
- V. Magnani, “On a general coarea inequality and applications”, Ann. Acad. Sci. Fenn. Math., 27:1 (2002), 121–140
- V. Magnani, “The coarea formula for real-valued Lipschitz maps on stratified groups”, Math. Nachr., 278:14 (2005), 1689–1705
- V. Magnani, “Area implies coarea”, Indiana Univ. Math. J., 60:1 (2011), 77–100
- F. Corni, “A reverse coarea-type inequality in Carnot groups”, Ann. Inst. Fourier (Grenoble), 72:1 (2022), 155–185
- A. Julia, S. N. Golo, D. Vittone, “Area of intrinsic graphs and coarea formula in Carnot groups”, Math Z., 301:2 (2022), 1369–1406
- G. P. Leonardi, V. Magnani, “Intersections of intrinsic submanifolds in the Heisenberg group”, J. Math. Anal. Appl., 378:1 (2011), 98–108
- A. Kozhevnikov, Roughness of level sets of differentiable maps on Heisenberg group
- С. Г. Басалаев, “Одномерные поверхности уровня $hc$-дифференцируемых отображений пространств Карно–Каратеодори”, Вестн. НГУ. Сер. матем., мех., информ., 13:4 (2013), 16–36
- A. Kozhevnikov, Proprietes metriques des ensembles de niveau des applications differentiables sur les groupes de Carnot, Ph.D. thesis, Univ. Paris Sud – Paris XI, 2015
- V. Magnani, E. Stepanov, D. Trevisan, “A rough calculus approach to level sets in the Heisenberg group”, J. Lond. Math. Soc. (2), 97:3 (2018), 495–522
- М. Б. Карманова, “Множества уровня классов отображений двуступенчатых групп Карно в неголономной интерпретации”, Сиб. матем. журн., 60:2 (2019), 391–400
- М. Б. Карманова, “Субриманова формула коплощади для классов неконтактных отображений групп Карно”, Матем. заметки, 114:6 (2023), 940–944
- L. P. Rothschild, E. M. Stein, “Hypoelliptic differential operators and nilpotent groups”, Acta Math., 137:3-4 (1976), 247–320
- G. B. Folland, E. M. Stein, Hardy spaces on homogeneous groups, Math. Notes, 28, Princeton Univ. Press, Princeton, NJ; Univ. of Tokyo Press, Tokyo, 1982, xii+285 pp.
- A. Bonfiglioli, E. Lanconelli, F. Uguzzoni, Stratified Lie groups and potential theory for their sub-Laplacians, Springer Monogr. Math., Springer, Berlin, 2007, xxvi+800 pp.
- П. К. Рашевский, “О соединимости любых двух точек вполне неголономного пространства допустимой линией”, Уч. зап. Моск. гос. пед. ин-та им. K. Либкнехта. Сер. физ.-матем. наук, 3:2 (1938), 83–94
- Wei-Liang Chow, “Über Systeme von linearen partiellen Differentialgleichungen erster Ordnung”, Math. Ann., 117 (1939), 98–105
- F. Montefalcone, “Some relations among volume, intrinsic perimeter and one-dimensional restrictions of BV functions in Carnot groups”, Ann. Sc. Norm. Super. Pisa Cl. Sci. (5), 4:1 (2005), 79–128
- С. К. Водопьянов, А. Д. Ухлов, “Аппроксимативно дифференцируемые преобразования и замена переменных на нильпотентных группах”, Сиб. матем. журн., 37:1 (1996), 70–89
- S. Eilenberg, “On $Phi$ measures”, Ann. Soc. Polon. Math., 17 (1938), 251–252
- H. Federer, “Some integralgeometric theorems”, Trans. Amer. Math. Soc., 77 (1954), 238–261
- B. Esmayli, P. Hajlasz, “The coarea inequality”, Ann. Fenn. Math., 46:2 (2021), 965–991
- С. К. Водопьянов, Н. А. Евсеев, “Изоморфизмы соболевских пространств на группах Карно и квазиизометрические отображения”, Сиб. матем. журн., 55:5 (2014), 1001–1039
Қосымша файлдар
