- Strong limit theorems for a simple random walk on the 2-dimensional comb
- Heavy points of a d-dimensional simple random walk
- Strong approximations of threedimensional Wiener sausages AKI 1 and Yueyun HU 2
- Almost sure limit theorems for the maximum of stationary Gaussian sequences
- C2 Z2 x
- Frequently visited sets for random walks Endre Csaki # Antonia Foldes + Pal Revesz # Jay Rosen # Zhan Shi
- Publ. Math. Debrecen Manuscript (June 15, 2009)
- On Vervaat and Vervaat-error type processes for partial sums and renewals
- On the behavior of random walk around heavy points Endre Cski 1
- Random walk local time approximated by a Wiener sheet combined with an independent Brownian motion
- ON THE NUMBER OF CUTPOINTS OF THE TRANSIENT NEAREST NEIGHBOR
- On the increments of the principal value of Brownian local time
- On the local time of the asymmetric Bernoulli walk Dedicated to Professor Sndor Csrg on his sixtieth birthday
- Publ. Math. Debrecen Manuscript (June 15, 2009)
- Strong approximations of three-dimensional Wiener sausages Endre CSAKI1 and Yueyun HU2
- TRANSIENT NEAREST NEIGHBOR RANDOM WALK AND BESSEL PROCESS
- X0 = 0, X1, X2, . . . Ei := P(Xn+1 = i + 1 | Xn = i) = 1 -P(Xn+1 = i -1 | Xn = i)
- Lengths and heights of random walk Endre Cs aki 1+ and Yueyun Hu 2
- A joint functional law for the Wiener process and principal value
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- AN VINCZE (1912{1999) AND HIS CONTRIBUTION TO
- Maximal Local Time of a d-dimensional Simple Random Walk on Subsets.
- Lengths and heights of random walk Endre Csaki1 and Yueyun Hu2
- Strong limit theorems for a simple random walk on the 2-dimensional comb
- Large void zones and occupation times for coalescing random walks
- Strong approximations of three-dimensional Wiener sausages Endre CS'AKI1 and Yueyun HU2
- On Vervaat and Vervaat-error type processes for partial sums and renewals
- Pointwise and uniform asymptotics of the Vervaat error process
- Boundary Crossings and the Distribution Function of the
- On a class of additive functionals of two-dimensional Brownian motion and random walk
- On the ranked excursion heights of a Kiefer process by
- On the local time of random walk on the 2-dimensional comb
- Joint asymptotic behavior of local and occupation times of random walk in higher dimension
- On the ranked excursion heights of a Kiefer process AKI 1 and Yueyun HU 2
- Strong approximations of additive functionals of a planar Brownian motion
- Frequently visited sets for random walks Endre Csaki
- Long excursions of a random walk Endre Cs'aki*, P'al R'ev'esz* and Zhan Shi
- On the joint asymptotic behaviours of ranked heights of Brownian excursions
- On the increments of the principal value of Brownian local time
- Increment sizes of the principal value of Brownian local time
- A universal result in almost sure central limit theory Istv'an Berkes*, Endre Cs'aki
- Maximal Local Time of a d-dimensional Simple Random Walk on Subsets.
- Almost sure limit theorems for the maximum of stationary Gaussian sequences
- PATH PROPERTIES OF CAUCHY'S PRINCIPAL VALUES RELATED TO LOCAL TIME
- ISTVA'N VINCZE (1912-1999) AND HIS CONTRIBUTION TO
- On the increments of the principal value of Brownian local time
- Large void zones and occupation times for coalescing random walks
- Fields Institute Communications Volume 00, 0000
- ASYMPTOTIC INDEPENDENCE AND ADDITIVE FUNCTIONALS
- A joint functional law for the Wiener process and principal value
- Almost Sure Limit Theorems for Sums and Maxima from the Domain of Geometric Partial Attraction of Semistable Laws
- Fractional Brownian motions as "higher-order" fractional derivatives of Brownian local times
- A strong invariance principle for two-dimensional random walk in random scenery
- ON THE EXCURSIONS OF TWO-DIMENSIONAL RANDOM WALK AND WIENER PROCESS
- Fields Institute Communications Volume 00, 0000
- Favourite sites, favourite values and jumping sizes for random walk and Brownian motion
- Strong approximations of additive functionals of a planar Brownian motion
- Asymptotic properties of ranked heights in Brownian excursions
- Frequently visited sets for random walks Endre Cs'aki* Ant'onia F"oldesy P'al R'ev'esz* Jay Rosenz Zhan Shi
- Heavy points of a d-dimensional simple random walk
- Lengths and heights of random walk Endre Cs'aki1y and Yueyun Hu2
- Strong limit theorems for anisotropic random walks on Z 2 Endre Cski 1
- Z2 Z2
