Results 81 to 90 of about 1,531 (218)
On delta $m$-subharmonic functions
Let \(\Omega\subset \mathbb C^n\) be a bounded \(m\)-hyperconvex domain, i.e, a domain for which there exists a bounded \(m\)-subharmonic exhaustion function, and assume \(1\leq m\leq n\). Let \(\mathcal E_{0,m}\) be the class of bounded \(m\)-subharmonic functions \(u\) in \(\Omega\) with zero boundary values and with bounded total \(m\)-Hessian mass \
openaire +3 more sources
Integral mean of Green’s potentials and their conjugate
The best possible estimates for Lebesgue integral means $m_q(r,F); (1le q
Vasyl'kiv, Ya. V., Kravec, M. Ya.
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Hessian measures in the class of m-convex (m - cv) functions
The theory of m-convex (m − cv) functions is a new direction in the real geometry. In this work, by using the connection m − cv functions with strongly m-subharmonic (shm) functions and using well-known and rich properties of shm functions, we show a ...
M.B. Ismoilov, R.A. Sharipov
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Key Findings: An assimilation methodology is established for the Tomorrow.io microwave sounder (TMS) flying on CubeSats in sun‐synchronous and inclined orbits, and in all cloud scenes. The TMS has a significant impact on weather forecast lead times up to 3 days in the Tropics in a research‐quality numerical weather prediction setting, and yields water ...
Jonathan J. Guerrette +3 more
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Convex and subharmonic functions.
The principle content of this thesis could be divided roughly into three parts: a) to establish some of the more imprtant theorems of the convex and subharmonic functions; b) to give a solution fof the Dirichlet Problem for the circle which, as we will ...
Tomiuk, Daniel.
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Nonlinear Dynamics Modeling and Subharmonic Resonances Analysis of a Laminated Composite Plate
The nonlinear subharmonic resonance of an orthotropic rectangular laminated composite plate is studied. Based on the theory of high-order shear laminates, von Karman's geometric relation for the large deformation of plates, and Hamilton's principle, the ...
Ting Ma, Xiao Juan Song, Shu Feng Lu
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Entire and subharmonic functions
The papers in this collection, written by participants of the Research Seminar on the Theory of Functions at Kharkov University, primarily address the theory of entire and subharmonic functions. Founded in 1953 by B. Ya. Levin and still functioning today,
Levin, B Ya
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It proposed a dual core realization method based on DSP + FPGA synchronous rotating coordinate subharmonic compensation algorithm, processed functions of the fundamental coordinate algorithm, main control and protection in DSP, while the computational ...
YIN Lujun, LI Yu, YAN Liangzhan
doaj
Some estimates of special classes of integrals
We study the integrals fb a f(t) exp(i| ln rt|σ) dt and obtain asymptotic formula for these functions of non‐regular growth. This is a peculiar kind of the theory asymptotic expansions.
T. I. Malyutina
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Minimal subharmonic functions and related integral representations
A Choquet-type integral representation result for non-negative subharmonic functions of a one-dimensional regular diffusion is established. The representation allows in particular an integral equation for strictly positive subharmonic functions that is ...
Çetin, Umut
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