Results 151 to 160 of about 11,899 (198)
Instability of pulses in gradient reaction-diffusion systems: a symplectic approach. [PDF]
Philos Trans A Math Phys Eng Sci, 2018 Beck M +5 more
europepmc +1 more source
On periodic geophysical water flows with discontinuous vorticity in the equatorial f-plane approximation. [PDF]
Philos Trans A Math Phys Eng Sci, 2018 Martin CI.
europepmc +1 more source
Couple of the variational iteration method and fractional-order Legendre functions method for fractional differential equations. [PDF]
ScientificWorldJournal, 2014 Yin F, Song J, Leng H, Lu F.
europepmc +1 more source
Elastic Stability of Concentric Tube Robots: A Stability Measure and Design Test. [PDF]
IEEE Trans Robot, 2016 Gilbert HB, Hendrick RJ, Webster RJ.
europepmc +1 more source
Fractional solutions of Bessel equation with N-method. [PDF]
ScientificWorldJournal, 2013 Bas E, Yilmazer R, Panakhov E.
europepmc +1 more source
On the Stability of Rotating Drops. [PDF]
J Res Natl Inst Stand Technol, 2015 Nurse AK, Coriell SR, McFadden GB.
europepmc +1 more source
Pulse dynamics in reaction-diffusion equations with strong spatially localized impurities. [PDF]
Philos Trans A Math Phys Eng Sci, 2018 Doelman A, van Heijster P, Shen J.
europepmc +1 more source
Some of the next articles are maybe not open access.
Related searches:
Related searches:
Sturm-liouville operators with singular potentials
Mathematical Notes, 1999zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Savchuk, A. M., Shkalikov, A. A.
openaire +3 more sources
Transactions of the Moscow Mathematical Society, 2014
Summary: Let \( (a,b)\subset \mathbb{R}\) be a finite or infinite interval, let \( p_0(x)\), \( q_0(x)\), and \( p_1(x)\), \( x\in (a,b)\), be real-valued measurable functions such that \( p_0,p^{-1}_0\), \( p^2_1p^{-1}_0\), and \( q^2_0p^{-1}_0\) are locally Lebesgue integrable (i.e., lie in the space \( L^1_{\operatorname {loc}}(a,b)\)), and let~\( w(
openaire +2 more sources
Summary: Let \( (a,b)\subset \mathbb{R}\) be a finite or infinite interval, let \( p_0(x)\), \( q_0(x)\), and \( p_1(x)\), \( x\in (a,b)\), be real-valued measurable functions such that \( p_0,p^{-1}_0\), \( p^2_1p^{-1}_0\), and \( q^2_0p^{-1}_0\) are locally Lebesgue integrable (i.e., lie in the space \( L^1_{\operatorname {loc}}(a,b)\)), and let~\( w(
openaire +2 more sources