### Research Interest

Daniel joined Nazarbayev University as an assistant professor in 2015. He finished his PhD in 2012 at the University of Rochester. After finishing his PhD, he spent three years as a postdoctoral fellow at the Norwegian University of Science and Technology in Trondheim, Norway. His research is primarily in nonlinear partial differential equations and harmonic analysis and applications to problems in physics and mathematical finance.

Global analytic solutions to the nonlinear Schrödinger equation

Daniel Oliveira Da Silva, Magzhan Biyar, **2020** In : .

Global well-posedness for the nonlinear wave equation in analytic Gevrey spaces

Daniel Oliveira Da Silva, Alejandro Castro Castilla, **2020** In : .

The Thirring model in spaces of analytic functions

Daniel Oliveira Da Silva, **2018** In : . 9 , p.2 , p. 153-158

A result on a Dirac-type equation in spaces of analytic functions

Daniel Oliveira Da Silva, **2017** In : . 37 , p.2 , p. 69-75

Lower Bounds on the Radius of Spatial Analyticity for the KdV Equation

Sigmund Selberg, Daniel Oliveira da Silva, **2017** In : . 18 , p.3 , p. 1009-1023

Continuity of generalized wave maps on the sphere

Daniel Oliveira da Silva, **2016** In : . 29 , p.3-4 , p. 309-320

A remark on unconditional uniqueness in the Chern-Simons-Higgs model

Sigmund Selberg, Daniel Oliveira da Silva, **2015** In : . 28 , p.3-4 , p. 333-346

On the regularity of the $2+1$ dimensional equivariant Skyrme model

Dan-Andrei Geba, Daniel Oliveira da Silva, **2013** In : . 141 , p.6 , p. 2105-2115

*Analysis (Berlin)*37 (2017), no. 2, 69–75.

2. Lower bounds on the radius of spatial analyticity for the KdV equation.

*Ann. Henri Poincaré*18 (2017), no. 3, 1009–1023. (with Sigmund Selberg)

3. Continuity of generalized wave maps on the sphere.

*Differential Integral Equations*29 (2016), no. 3-4, 309–320.

4. A remark on unconditional uniqueness in the Chern-Simons-Higgs model.

*Differential Integral Equations*28 (2015), no. 3-4, 333–346. (with Sigmund Selberg)

5. On the regularity of the 2+1 dimensional equivariant Skyrme model. *Proc. Amer. Math. Soc.* 141 (2013), no. 6, 2105–2115.

Linear Algebra with Applications, Special Topics in Mathematics I, Applied Measure Theory, Thesis Proposal, Real Analysis