Results 221 to 230 of about 434,628 (281)
Enhancing image compression through a novel Structural Fidelity Weighted Ensemble (SFWE) model. [PDF]
MethodsXI PSM +5 more
europepmc +1 more source
Sol-Gel-Derived Silica/Alumina Particles for Enhancing the Mechanical Properties of Acrylate Composite Materials. [PDF]
GelsAltwair K +6 more
europepmc +1 more source
A Reproducible Benchmark for Gas Sensor Array Classification: From FE-ELM to ROCKET and TS2I-CNNs. [PDF]
Sensors (Basel)Kim CH, Choi SH, Choi S, Lee S.
europepmc +1 more source
Hydroxylated Rh Single-Atom Antennas Assembled on Carbon Nitride Toward Stable Photocatalytic Hydrogen Evolution. [PDF]
Adv Sci (Weinh)Li C +8 more
europepmc +1 more source
Some of the next articles are maybe not open access.
Related searches:
Related searches:
Boletín de la Sociedad Matemática Mexicana, 2023
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
O. E. Yaremko, K. R. Zababurin
openaire +2 more sources
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
O. E. Yaremko, K. R. Zababurin
openaire +2 more sources
Analysis, 1986
Summary: Let a probability space (\(\Omega\),\(\Sigma\),P) and sequences of r.v.'s \((X_ n(\omega))_ 1^{\infty}\), \((Y_ n(\omega))_ 1^{\infty}\), and a matrix of r.v.'s \(A=(A_{nk}(\omega))^{\infty}_{n,k=1}\) be given. We ask for the exact conditions for A which guarantee that each sequence \((X_ n(\omega))_ 1^{\infty}\), which is a.s. an element of \(
Stadtmüller, U., Trautner, Rolf
openaire +2 more sources
Summary: Let a probability space (\(\Omega\),\(\Sigma\),P) and sequences of r.v.'s \((X_ n(\omega))_ 1^{\infty}\), \((Y_ n(\omega))_ 1^{\infty}\), and a matrix of r.v.'s \(A=(A_{nk}(\omega))^{\infty}_{n,k=1}\) be given. We ask for the exact conditions for A which guarantee that each sequence \((X_ n(\omega))_ 1^{\infty}\), which is a.s. an element of \(
Stadtmüller, U., Trautner, Rolf
openaire +2 more sources
Matrix differential transformations
Applicable Analysis, 1997Differential transformations can be used in order to transform solutions of a simple differential equation into solutions of a more complicated differential equation. That way one gets explicit representations for solutions of some special differential equations.
H. Florian, J. Püngel, W. Tutschke
openaire +1 more source
Applied Mathematics and Computation, 2011
Some properties of the matricial expression of the Fourier-Wiener transform are considered. Here the referred properties are a composition formula, Parceval formula and an inversion formula which is the extension an unitary explicit integral representation of the second quantization for one integral operator of the Wiener transform.
Hayek, N. +2 more
openaire +2 more sources
Some properties of the matricial expression of the Fourier-Wiener transform are considered. Here the referred properties are a composition formula, Parceval formula and an inversion formula which is the extension an unitary explicit integral representation of the second quantization for one integral operator of the Wiener transform.
Hayek, N. +2 more
openaire +2 more sources