{"total":12,"items":[{"citing_arxiv_id":"2606.30070","ref_index":250,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Financial Resilience Evaluation: From Conditional Expectations to Dynamic Convex Risk Measures","primary_cat":"q-fin.MF","submitted_at":"2026-06-29T10:02:50+00:00","verdict":"UNVERDICTED","verdict_confidence":"LOW","novelty_score":6.0,"formal_verification":"none","one_line_summary":"Defines resilience evaluation D^ρ π as the L1-limit of scaled dynamic risk measure applied to process increments, and derives its dual representation as worst-case conditional expectation of an effective drift when ρ arises from BSDEs with Lipschitz or quadratic drivers.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2606.09128","ref_index":94,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Dynamic sliding and rolling friction models for linear viscoelastic contact pairs","primary_cat":"physics.app-ph","submitted_at":"2026-06-08T07:25:36+00:00","verdict":"UNVERDICTED","verdict_confidence":"LOW","novelty_score":6.0,"formal_verification":"none","one_line_summary":"Derives viscoelasto-kinematic PDEs for sliding and rolling contact in linear viscoelastic bodies, showing preservation of hyperbolic character and related dynamics between the two processes.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2606.04195","ref_index":25,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Kernel-Robust Dynamics for Reaction-Diffusion Equations with Measure-Valued Delay","primary_cat":"math.AP","submitted_at":"2026-06-02T20:26:18+00:00","verdict":"UNVERDICTED","verdict_confidence":"LOW","novelty_score":6.0,"formal_verification":"none","one_line_summary":"Establishes well-posedness in history space, Lipschitz and weak-star robustness, and compact global attractors with upper semicontinuity for semilinear reaction-diffusion equations with measure-valued delays.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2605.22299","ref_index":29,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Data-Driven Reduced Modeling of Delayed Dynamical Systems via Spectral Submanifolds","primary_cat":"math.DS","submitted_at":"2026-05-21T10:46:33+00:00","verdict":"UNVERDICTED","verdict_confidence":"LOW","novelty_score":6.0,"formal_verification":"none","one_line_summary":"Data-driven spectral submanifold reduction produces low-dimensional delay-free ODE models for nonlinear delayed dynamical systems from measurements alone.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2605.19525","ref_index":34,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Nonautonomous systems of evolution inclusions","primary_cat":"math.AP","submitted_at":"2026-05-19T08:28:07+00:00","verdict":"UNVERDICTED","verdict_confidence":"LOW","novelty_score":5.0,"formal_verification":"none","one_line_summary":"Extends semigroup methods and measurable selection results to prove global existence for partially nonautonomous evolution inclusion systems under Hausdorff continuity and convexity conditions on couplings.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2605.18585","ref_index":29,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Constructive solutions of the heat equation with Stieltjes derivatives","primary_cat":"math.AP","submitted_at":"2026-05-18T16:02:02+00:00","verdict":"UNVERDICTED","verdict_confidence":"LOW","novelty_score":6.0,"formal_verification":"none","one_line_summary":"Constructive existence results and explicit solutions for the heat equation with Stieltjes derivatives, covering initial-boundary value problems and multivariable derivator extensions.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2604.20772","ref_index":132,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"General Relativity via differential forms -- explorations in Plebanski's Formalism for GR","primary_cat":"gr-qc","submitted_at":"2026-04-22T16:58:59+00:00","verdict":"UNVERDICTED","verdict_confidence":"LOW","novelty_score":3.0,"formal_verification":"none","one_line_summary":"Plebanski's chiral 2-form formulation of GR reveals additional structure in Einstein's equations and supplies new analytical and numerical tools.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2602.19099","ref_index":9,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Well-posedness and kernel stability for diffusion equations with mixed measure-valued memory","primary_cat":"math.AP","submitted_at":"2026-02-22T09:06:21+00:00","verdict":"ACCEPT","verdict_confidence":"MODERATE","novelty_score":7.0,"formal_verification":"none","one_line_summary":"Finite-time well-posedness, uniqueness, and kernel-stability bounds are proved for diffusion equations with arbitrary finite measure-valued memory, unifying continuous and discrete delay regimes.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2602.08906","ref_index":26,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Switching Point Optimization for Abstract Parabolic Equations","primary_cat":"math.OC","submitted_at":"2026-02-09T17:04:32+00:00","verdict":"UNVERDICTED","verdict_confidence":"LOW","novelty_score":5.0,"formal_verification":"none","one_line_summary":"The work establishes continuous Fréchet differentiability of the switching-point-to-control map for abstract semilinear parabolic equations and characterizes the convex hull of feasible switching functions via an extended formulation.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2601.13818","ref_index":102,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Two-dimensional FrBD friction models for rolling contact: extension to linear viscoelasticity","primary_cat":"physics.app-ph","submitted_at":"2026-01-20T10:24:35+00:00","verdict":null,"verdict_confidence":null,"novelty_score":null,"formal_verification":null,"one_line_summary":null,"context_count":1,"top_context_role":"background","top_context_polarity":"background","context_text":"Mech. solids 57:1-33 (2022). [100] Meral F, Royston T, Magin R. Fractional calculus in viscoelasticity: an experimental study. Com- mun. Nonlinear Sci. Numer. Simul. 15:939-945 (2010). [101] Wagner CE, Barbati AC, Engmann J, et al. Quantifying the consistency and rheology of liquid foods using fractional calculus. Food Hydrocoll. 69:242-254 (2017). [102] Pazy A. Semigroups of Linear Operators and Applications to PDEs. Springer, New York (1983). A vailable from: https://doi.org/10.1007/978-1-4612-5561-1 . [103] Tanabe H. Equations of Evolution. Pitman, London (1979). [104] Tanabe H. Functional Analytic Methods for Partial Differential Equations. CRC Press (1997). [105] Edwards CH. Advanced Calculus of Several Variables, Vol."},{"citing_arxiv_id":"2601.06811","ref_index":103,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Two-dimensional FrBD friction models for rolling contact","primary_cat":"physics.app-ph","submitted_at":"2026-01-11T08:50:45+00:00","verdict":null,"verdict_confidence":null,"novelty_score":null,"formal_verification":null,"one_line_summary":null,"context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null},{"citing_arxiv_id":"2501.18556","ref_index":43,"ref_count":1,"confidence":0.88,"is_internal_anchor":false,"paper_title":"Smoothing of operator semigroups under relatively bounded perturbations","primary_cat":"math.AP","submitted_at":"2025-01-30T18:34:17+00:00","verdict":"UNVERDICTED","verdict_confidence":"LOW","novelty_score":4.0,"formal_verification":"none","one_line_summary":"Stability of semigroup smoothing under relatively bounded perturbations yields spectral and eventually positive perturbation theorems for elliptic PDEs.","context_count":0,"top_context_role":null,"top_context_polarity":null,"context_text":null}],"limit":50,"offset":0}