6200 papers
This paper introduces a notion of semistability for intrinsic reductions of non-archimedean rational functions at non-classical points in the Berkovich projective line and computes the resulting loci for quadratic rational iterations via a slope formula, demonstrating that these loci exhibit precise stationarity analogous to the polynomial case.
This paper establishes that for most parameter sets, the symmetry group of Markoff-type equations acts transitively on the majority of solutions modulo for a density one set of primes, with specific applications proving near-complete transitivity results for the -classification conjecture in and for solutions arising from generalized cluster algebras.
This paper introduces the concept of marking data-informativity and develops corresponding algorithms to design valid nonblocking supervisors for unknown discrete-event systems using available behavioral data, while also addressing cases where data is insufficient through restricted informativity and informatizability frameworks.
This paper presents the fourth known primitive solution to the Diophantine equation , detailing the methodology used to discover it.
This paper proves that every sufficiently large odd integer can be expressed as the sum of one square and fourteen fifth powers of primes, while every sufficiently large even integer can be written as the sum of one square, one biquadrate, and twelve fifth powers of primes.
This paper demonstrates that any parahoric group scheme over a henselian discretely valued field becomes reductive after a finite Galois extension, allowing it to be recovered as the smoothening of Galois invariants of a reductive model, a result that extends prior work to the wildly ramified case and confirms the Grothendieck–Serre conjecture for generically trivial parahoric torsors in sufficiently good residue characteristics.
This paper establishes the Sobolev regularity of a nonlinear function of the symmetric gradient for weak solutions to -Laplacian systems with Lipschitz coefficients and Orlicz-Sobolev data, utilizing uniform higher differentiability estimates derived from approximating problems with singular perturbations.
This paper investigates the convergence properties of M.V. Berry's superoscillating approximation to the truncated Weierstrass function, providing sharp error estimates and analyzing the associated double limits.
This paper proves a conjecture by Michel and Venkatesh regarding the joinings of distinct Linnik problems through simultaneous quaternionic embeddings of imaginary quadratic fields, while also addressing a related non-equivariant conjecture by Aka, Einsiedler, and Shapira.
This paper proposes a distributionally robust framework for standard quadratic optimization under Wasserstein ambiguity, demonstrating its equivalence to a modified deterministic StQP instance while providing out-of-sample performance guarantees and empirical validation.
This paper establishes the existence of equilibria for non-Markovian mean-field games with unbounded controls and quadratic running costs using a weak formulation approach grounded in new stability results for quadratic-growth generalized McKean-Vlasov BSDEs, thereby removing previous restrictions on model parameter boundedness and time horizons.
This study demonstrates that neglecting vaccine unwillingness in epidemiological models introduces significant errors in both long-term equilibrium predictions and short-term epidemic wave simulations, with the magnitude of error depending on the disease's infectivity and the speed of vaccination programs.
This survey provides a comprehensive overview of stacked intelligent metasurfaces (SIMs), detailing their physical principles, modeling frameworks, and hardware realizations while examining their role in enabling advanced 6G functionalities like wave-domain signal processing, integrated sensing, and cell-free networks, alongside identifying key challenges for future research.
This paper extends known results on nonmatrix varieties of associative algebras from the case of infinite fields to the more general setting of unital commutative rings, specifically characterizing varieties of -algebras that do not contain the algebra of matrices.
This paper establishes the precise asymptotic variance and a Gaussian central limit theorem for the log-partition function of the Sherrington-Kirkpatrick spin glass model in the critical regime where the inverse temperature approaches the critical point at a rate of .
This paper introduces a refined combinatorial 1-cocycle with Laurent polynomial coefficients to define refined tangle equations, providing a quantitative method to analyze knot isotopies and distinguish knot diagrams based on the solvability of these equations.
This paper investigates how algebraic invariants of edge ideals change under selective graph suspensions, demonstrating that while suspensions over minimal vertex covers consistently preserve regularity and increase projective dimension by one, suspensions over maximal independent sets exhibit uniform behavior only for paths and cycles, with a specific extremal family of paths showing increases in both regularity and the -invariant.
This paper establishes a systematic framework for constructing digraph-defined external difference families by combining graph blow-up techniques with generalized vertex labellings, resulting in new combinatorial families—including the first infinite construction for specific 2-circular external difference families—and novel results on graph labellings such as -valuations for sun graphs.
This paper disproves a homological generalization of the generalized Property R conjecture by demonstrating the existence of 2-component framed links in that surger to a connected sum of homology manifolds yet are not handleslide equivalent to a split link.
This paper investigates the minimal conditions required to establish Lipschitz and uniform bounds for sequences of bounded rough Riemannian metrics, providing counterexamples to demonstrate the sharpness of these conditions while exploring their underlying geometric intuition.