The following pages link to A NEW TYPE OF CESÀRO MEAN (Q3468049):
Displaying 28 items.
- Applications of Cesàro submethod to trigonometric approximation of signals (functions) belonging to class \(\mathrm{lip}(\alpha, p)\) in \(L_p\)-norm (Q670603) (← links)
- Inclusion results on statistical cluster points (Q1677536) (← links)
- \(C_{\lambda}\)-semiconservative FK-spaces (Q1937949) (← links)
- Approximation by some subsequences of matrix means (Q2113613) (← links)
- Approximation of signals via different summability means with effects of Gibbs phenomenon (Q2230438) (← links)
- Approximation of signals (functions) by trigonometric polynomials in \(L_p\)-norm (Q2260311) (← links)
- A generalization of deferred Cesàro means and some of their applications (Q2260674) (← links)
- On \((C,1)\) means of sequences (Q2428982) (← links)
- Approximation of Functions of Class $$\mathrm {Lip} (\alpha , { p})$$ in $$L_{p}$$-Norm (Q2801901) (← links)
- On the degree of approximation of continuous functions by a specific transform of partial sums of their Fourier series (Q3385445) (← links)
- (Q4583537) (← links)
- (Q4614353) (← links)
- (Q4680254) (← links)
- (Q4970473) (← links)
- On the trigonometric approximation of functions in weighted Lorentz spaces using Cesáro submethod (Q4985295) (← links)
- ON DISCRETE WEIGHTED STATISTICAL CONVERGENCE (Q5011301) (← links)
- Approximation of signals (functions) of Lip(α, p), (p > 1)-class by trigonometric polynomials (Q5031126) (← links)
- On approximation of a weighted Lipschitz class functions by means tn(f; x), Nβ n (f; x) and R β n(f, x) of Fourier series (Q5054079) (← links)
- (Q5063404) (← links)
- (Q5119366) (← links)
- (Q5215120) (← links)
- (Q5222906) (← links)
- (Q5379653) (← links)
- A Tauberian theorem for discrete weighted mean methods (Q5444082) (← links)
- On summability of sequences of sets by Cesàro submethod (Q6101403) (← links)
- APPLICATIONS OF CESARO SUBMETHOD TO ` APPROXIMATION OF FUNCTIONS IN WEIGHTED ORLICZ SPACES (Q6171127) (← links)
- Approximation by Nörlund type means in the grand Lebesgue spaces with variable exponent (Q6540244) (← links)
- Trigonometric approximation by deferred Voronoi-Nörlund and by deferred Riesz means in the weighted space \(L_w^p\) (Q6579348) (← links)
