Results 91 to 100 of about 237,988 (290)
Anti-periodic solutions for a class of Cohen–Grossberg neural networks
Computers & Mathematics with Applications, 2009 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Euclidean Wilson loops and Minimal Area Surfaces in Minkowski AdS3
, 2015 The AdS/CFT correspondence relates Wilson loops in N=4 SYM theory to minimal area surfaces in AdS5xS5 space. If the Wilson loop is Euclidean and confined to a plane (t,x) then the dual surface is Euclidean and lives in Minkowski AdS3.
Irrgang, Andrew, Kruczenski, Martin
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FEBS Open Bio, EarlyView.ZFAS1 is a lncRNA promoting cell proliferation and migration, exhibiting high expression in various cancers. It is conserved, widely expressed, and produces multiple splice variants with unclear roles. We identified several splice variants in hepatocyte models, and found that inhibiting or suppressing regulators of the unfolded protein response (PERK ...
Sébastien Soubeyrand +2 more
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MathematicsThis work is dedicated to exploring the globally exponential stability of anti-periodic solutions in inertial CGNNs that incorporate time delays. This is based on a strategic variable substitution to transform the complex system into a first-order ...
Jiaxin Cheng, Weide Liu
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Dapagliflozin prevents methylglyoxal‐induced retinal cell death in ARPE‐19 cells
FEBS Open Bio, EarlyView.Diabetic macular oedema is a diabetes complication of the eye, which may lead to permanent blindness. ARPE‐19 are human retinal cells used to study retinal diseases and potential therapeutics. Methylglyoxal is a compound increased in uncontrolled diabetes due to elevated blood glucose.
Naina Trivedi +7 more
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Anti-periodic solutions for evolution equations associated with maximal monotone mappings
Applied Mathematics Letters, 2011 The authors consider the existence of anti-periodic solutions for differential inclusions in a real Hilbert space \(H\). The first result concerns the problem \[ x^{\prime }(t)\in -Ax(t)+f(t)\text{ a.e. on }\mathbb{R}, \] \[ x(t)=-x(t+T)\text{ for }t\in \mathbb{R}.
Chen, Yuqing +2 more
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Solvable cubic resonant systems
, 2019 Weakly nonlinear analysis of resonant PDEs in recent literature has generated a number of resonant systems for slow evolution of the normal mode amplitudes that possess remarkable properties.
Biasi, Anxo, Bizon, Piotr, Evnin, Oleg
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Anchorage‐independent and faster growth in clonal population from UV‐irradiated NER‐deficient cells
FEBS Open Bio, EarlyView.UV‐irradiated cells expressing a DDB2 mutant protein unable to interact with PCNA (DDB2PCNA‐) form clones able to grow without anchorage. Different experimental approaches reveal heterogeneity in cell cycle regulation and drug response within these clones, emphasizing the crucial role of the DDB2‐PCNA interaction in preventing cellular transformation ...
Paola Perucca +6 more
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Advances in Mathematical PhysicsThis research work provides a comprehensive investigation of the M-fractional paraxial wave equation (M-fPWE) in describing complex optical phenomena in telecommunication systems and nonlinear media, focusing on the dynamical analysis of optical soliton ...
Md. Mamunur Roshid +4 more
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Anti-periodic solutions to a class of non-monotone evolution equations
Discrete & Continuous Dynamical Systems - A, 1999 The authors follow the ideas of H. Okochi on noncoercitive evolution equations with antiperiodic boundary conditions. The existence of solutions to the problem \[ au_t(t,x) +Au(t,x) -b u(t,x) +f(x, u(t,x))\ni h(t,x), \quad t\in[0,T], x\in\Omega, \] \[ u(0,x)=-u(T,x), \] with \(h\in L^2(0,T; L_2(\Omega))\) is considered.
Aizicovici, Sergiu, Reich, Simeon
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