Camelia A. Pop, Ph.D. - Publications
Affiliations: | 2012 | Graduate School - New Brunswick | Rutgers University, New Brunswick, New Brunswick, NJ, United States |
Area:
MathematicsYear | Citation | Score | |||
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2015 | Petrosyan A, Pop CA. Optimal regularity of solutions to the obstacle problem for the fractional Laplacian with drift Journal of Functional Analysis. 268: 417-472. DOI: 10.1016/J.Jfa.2014.10.009 | 0.452 | |||
2015 | Garofalo N, Petrosyan A, Pop CA, Smit Vega Garcia M. Regularity of the free boundary for the obstacle problem for the fractional Laplacian with drift Annales De L'Institut Henri Poincare (C) Non Linear Analysis. DOI: 10.1016/J.Anihpc.2016.03.001 | 0.431 | |||
2015 | Feehan PMN, Pop CA. Degenerate-elliptic operators in mathematical finance and higher-order regularity for solutions to variational equations Advances in Differential Equations. 20: 361-432. | 0.646 | |||
2015 | Feehan PMN, Pop CA. On the martingale problem for degenerate-parabolic partial differential operators with unbounded coefficients and a mimicking theorem for Itô processes Transactions of the American Mathematical Society. 367: 7565-7593. | 0.603 | |||
2015 | Feehan PMN, Pop CA. Stochastic representation of solutions to degenerate elliptic and parabolic boundary value and obstacle problems with dirichlet boundary conditions Transactions of the American Mathematical Society. 367: 981-1031. | 0.596 | |||
2014 | Feehan PMN, Pop CA. Schauder a priori estimates and regularity of solutions to boundary-degenerate elliptic linear second-order partial differential equations Journal of Differential Equations. 256: 895-956. DOI: 10.1016/j.jde.2013.08.012 | 0.64 | |||
2013 | Feehan PMN, Pop CA. A Schauder approach to degenerate-parabolic partial differential equations with unbounded coefficients Journal of Differential Equations. 254: 4401-4445. DOI: 10.1016/j.jde.2013.03.006 | 0.597 | |||
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