Articles containing subject class 39A13:

MIA-04-48 » Inequalities on Time Scales: A Survey (10/2001)
JMI-04-19 » Some multi-dimensional Opial-type inequalities on time scales (06/2010)
MIA-14-07 » Some generalizations for Opial's inequality involving several functions and their derivatives of arbitrary order on arbitrary time scales (01/2011)
MIA-17-35 » Higher order dynamic inequalities on time scales (04/2014)
MIA-17-89 » Some dynamic inequalities of Hardy type on time scales (07/2014)
MIA-18-18 » Converses of Copson's inequalities on time scales (01/2015)
MIA-18-91 » Some new Opial dynamic inequalities with weighted functions on time scales (07/2015)
DEA-07-17 » Existence results for nonlinear second-order q-difference equations with q-integral boundary conditions (08/2015)
MIA-19-03 » New multiplicative higher order dynamic inequalities of Opial type (01/2016)
JMI-10-30 » Sneak-out principle on time scales (06/2016)
JMI-10-62 » Some new Hardy-type inequalities in q-analysis (09/2016)
MIA-20-26 » Classification schemes of nonoscillatory solutions for two-dimensional time scale systems (04/2017)
MIA-20-31 » Some new generalized forms of Hardy's type inequality on time scales (04/2017)
JCA-12-10 » Bohr radius for certain classes of analytic functions (04/2018)
DEA-10-11 » Nonlocal boundary value problems for (p, q)-difference equations (05/2018)
MIA-21-67 » A unified approach to Copson and Beesack type inequalities on time scales (10/2018)
DEA-11-10 » Second order two-parametric quantum boundary value problems (05/2019)
DEA-11-25 » Positive solutions for a singular coupled system of nonlinear higher-order fractional q-difference boundary value problems with two parameters (11/2019)
FDC-09-19 » Unique positive solution for nonlinear Caputo-type fractional q-difference equations with nonlocal and Stieltjes integral boundary conditions (12/2019)
JMI-14-25 » Extensions of Hölder's inequality and its applications in Ostrowski inequality (06/2020)
FDC-10-02 » Controllability and observability of time-invariant linear nabla fractional systems (06/2020)