Results 11 to 20 of about 579 (230)
Stanley’s conjecture for critical ideals [PDF]
Studia Scientiarum Mathematicarum Hungarica, 2011 Let S = K[x1,…,xn] be a polynomial ring in n variables over a field K. Stanley’s conjecture holds for the modules I and S/I, when I ⊂ S is a critical monomial ideal. We calculate the Stanley depth of S/I when I is a canonical critical monomial ideal.
Haider, Azeem, Khan, Sardar Mohib Ali
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Lazer–McKenna conjecture: The critical case
Journal of Functional Analysis, 2007 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Wei, Juncheng, Yan, Shusen
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The Bernstein conjecture, minimal cones and critical dimensions [PDF]
Classical and Quantum Gravity, 2009 Minimal surfaces and domain walls play important roles in various contexts of spacetime physics as well as material science. In this paper, we first review the Bernstein conjecture, which asserts that a plane is the only globally well defined solution of the minimal surface equation which is a single valued graph over a hyperplane in flat spaces, and ...
Gibbons, Gary W. +2 more
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The threshold conjecture for the energy critical hyperbolic Yang–Mills equation [PDF]
Annals of Mathematics, 2021 This article represents the fourth and final part of a four-paper sequence whose aim is to prove the Threshold Conjecture as well as the more general Dichotomy Theorem for the energy critical $4+1$ dimensional hyperbolic Yang--Mills equation. The Threshold Theorem asserts that topologically trivial solutions with energy below twice the ground state ...
Oh, Sung-Jin, Tataru, Daniel
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The Core Ingram Conjecture for non-recurrent critical points [PDF]
Fundamenta Mathematicae, 2018 We study inverse limit spaces of tent maps, and the Ingram Conjecture, which states that the inverse limit spaces of tent maps with different slopes are non-homeomorphic. When the tent map is restricted to its core, so there is no ray compactifying on the inverse limit space, this result is referred to as the Core Ingram Conjecture.
Bruin, Henk, Cinc, Jernej, Anusic, Ana
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Purity of critical cohomology and Kac’s conjecture [PDF]
Mathematical Research Letters, 2018 15 pages. v6: further minor improvements, Lemma 4.4 is cleared up.
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Remarks on the critical graph conjecture
Discrete Mathematics, 1979 AbstractThe vertex-critical graph conjecture (critical graph conjecture respectively) states that every vertex-critical (critical) graph has an odd number of vertices. In this note we prove that if G is a critical graph of even order, then G has at least three vertices of less-than-maximum valency.
Broere, I., Mynhardt, C.M.
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On the Lazer-McKenna Conjecture Involving Critical and Super-critical Exponents [PDF]
Methods and Applications of Analysis, 2008 We prove the Lazer-McKenna conjecture for an elliptic problem of Ambrosetti-Prodi type with critical and supercritical nonlinearities by constructing solutions concentrating on higher dimensional manifolds, under some partially symmetric assumption on the domain.
Dancer, E. N., Yan, Shusen
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Pediatric Blood &Cancer, EarlyView.ABSTRACT Introduction Adolescent siblings of children with cancer are at elevated risk for psychosocial problems. Unfortunately, various barriers such as limited family time and resources, conflicting schedules, and psychosocial staffing constraints at cancer centers hinder sibling access to support.
Christina M. Amaro +10 more
wiley +1 more source
Pediatric Blood &Cancer, EarlyView.ABSTRACT Background Parents of children treated for acute lymphoblastic leukemia (ALL) often experience significant caregiver burden and disruption to their well‐being. While parent quality of life (QoL) during treatment is well characterized, little is known about outcomes during early survivorship.
Sara Dal Pra +3 more
wiley +1 more source