| Faster ground state preparation and high-precision ground energy estimation with fewer qubits Y Ge, J Tura, JI Cirac Journal of Mathematical Physics 60 (2), 2019 | 179 | 2019 |
| Rapid adiabatic preparation of injective projected entangled pair states and Gibbs states Y Ge, A Molnár, JI Cirac Physical review letters 116 (8), 080503, 2016 | 92 | 2016 |
| Area laws and efficient descriptions of quantum many-body states Y Ge, J Eisert New Journal of Physics 18 (8), 083026, 2016 | 79 | 2016 |
| Computational speedups using small quantum devices V Dunjko, Y Ge, JI Cirac Physical review letters 121 (25), 250501, 2018 | 65 | 2018 |
| Spatial search by continuous-time quantum walks on crystal lattices AM Childs, Y Ge Physical Review A 89 (5), 052337, 2014 | 51 | 2014 |
| A generalization of the injectivity condition for projected entangled pair states A Molnar, Y Ge, N Schuch, JI Cirac Journal of Mathematical Physics 59 (2), 2018 | 42 | 2018 |
| Projected entangled pair states: Fundamental analytical and numerical limitations G Scarpa, A Molnár, Y Ge, JJ García-Ripoll, N Schuch, D Pérez-García, ... Physical Review Letters 125 (21), 210504, 2020 | 40* | 2020 |
| A hybrid algorithm framework for small quantum computers with application to finding Hamiltonian cycles Y Ge, V Dunjko Journal of Mathematical Physics 61 (1), 2020 | 24 | 2020 |
| Elementary properties of cyclotomic polynomials Y Ge Mathematical Reflections 2, 2008 | 17 | 2008 |
| A note on the Carmichael Function Y Ge Mathematical Reflections 15, 232-238, 2007 | 6 | 2007 |
| Faster ground state preparation and high-precision ground energy estimation with fewer qubits (2018) Y Ge, J Tura, JI Cirac arXiv preprint arXiv:1712.03193, 0 | 5 | |
| The Method of Vieta Jumping Y Ge | 5 | |
| Quantum algorithms for quantum many-body systems and small quantum computers Y Ge Technische Universität München, 2020 | | 2020 |
| Fortgeschrittene Geometrie für Mathematikolympioniken Y Ge | | 2006 |
| Eigenschaften und Anwendungen des Lotfußpunktdreiecks Y Ge | | 2006 |
| Residue Classes with Order 1 or 2 and a Generalisation of Wilson’s Theorem Y Ge | | |
