Can Li

Identifiers

• name variant Can Li 0.60 · backfill

Papers (17)

1. Verifiable Geometry Problem Solving: Solver-Driven Autoformalization and Theorem Proposing cs.AI · 2026 · author #1
2. DisjunctiveNet: Neural Symbolic Learning via Differentiable Convexified Optimization Layers cs.LG · 2026 · author #2
3. DeformMaster: An Interactive Physics-Neural World Model for Deformable Objects from Videos cs.CV · 2026 · author #1
4. Solving Max-Cut to Global Optimality via Feasibility-Preserving Graph Neural Networks cs.LG · 2026 · author #5
5. Non-Parametric Structural Priors for Geometry Theorem Prediction cs.AI · 2026 · author #3
6. Harnessing Intrinsic Noise in Memristor Hopfield Neural Networks for Combinatorial Optimization cs.ET · 2019 · author #5
7. Long short-term memory networks in memristor crossbars cs.ET · 2018 · author #1
8. Memristor Crossbars with 4.5 Terabits-per-Inch-Square Density and Two Nanometer Dimension cond-mat.mes-hall · 2018 · author #2
9. Time-resolved quantum spin transport through an Aharonov-Casher ring cond-mat.mes-hall · 2018 · author #1
10. The effect of hydroxyl on dye-sensitized solar cells assembled with TiO2 nanorods physics.app-ph · 2017 · author #4
11. Local discontinuous Galerkin methods for the time tempered fractional diffusion equation math.NA · 2017 · author #3
12. On the stability of exact ABCs for the reaction-subdiffusion equation on unbounded domain math.AP · 2015 · author #1
13. Well-posedness and numerical algorithm for the tempered fractional ordinary differential equations math.CA · 2015 · author #1
14. Stacking-dependent energetics and electronic structure of ultrathin polymorphic V$_2$VI$_3$ topological insulator nanofilms cond-mat.mtrl-sci · 2014 · author #1
15. High order schemes for the tempered fractional diffusion equations physics.comp-ph · 2014 · author #1
16. Second order WSGD operators II: A new family of difference schemes for space fractional advection diffusion equation math.NA · 2013 · author #1
17. A weighted finite difference method for the fractional diffusion equation based on the Riemann-Liouville derivative math.NA · 2011 · author #2

Mentions

• 2606.27926 #1 · arxiv_oai · confidence 0.70 Can Li
• 2603.04852 #3 · arxiv_oai · confidence 0.70 Can Li
• 1510.08761 #1 · backfill · confidence 0.70 Can Li
• 1704.07995 #3 · arxiv_oai · confidence 0.70 Can Li
• 1402.0064 #1 · arxiv_oai · confidence 0.70 Can Li
• 1310.7671 #1 · arxiv_oai · confidence 0.70 Can Li
• 1109.2345 #2 · arxiv_oai · confidence 0.70 Can Li
• 1501.00376 #1 · backfill · confidence 0.70 Can Li
• 2605.30456 #2 · arxiv_oai · confidence 0.70 Can Li
• 1408.5188 #1 · backfill · confidence 0.70 Can Li
• 1402.0064 #1 · backfill · confidence 0.70 Can Li
• 1310.7671 #1 · backfill · confidence 0.70 Can Li
• 1109.2345 #2 · backfill · confidence 0.70 Can Li
• 2605.09586 #1 · arxiv_oai · confidence 0.70 Can Li

Frequent Coauthors

• J. Joshua Yang 3 shared papers
• Qiangfei Xia 3 shared papers
• Weihua Deng 3 shared papers
• Hao Jiang 2 shared papers
• Hua Huang 2 shared papers
• John Paul Strachan 2 shared papers
• Junbo Zhao 2 shared papers
• Ting Zhang 2 shared papers
• Aloysius Soon 1 shared papers
• Andrea Lodi 1 shared papers
• Aron Walsh 1 shared papers
• Binghai Yan 1 shared papers
• Catherine Stampfl 1 shared papers
• Chendi Qian 1 shared papers
• Chenglong Jia 1 shared papers
• Christopher Morris 1 shared papers
• Daniel Belkin 1 shared papers
• Dongxing Yu 1 shared papers
• Erc\'ilia Sousa 1 shared papers
• Fengfqun Zhao 1 shared papers