Approximation and interpolation by large entire cross-sections of second category sets in Rn+1 Burke, Maxim R.

Liftings for Haar measure on (0,1)K Burke, Maxim R.; Just, W.

Punctually countable coverings by means of negligible sets Burke, Maxim R.

Sets on which measurable functions are determined by their range Burke, Maxim R.; Ciesielski, K.

Simultaneous approximation and interpolation of increasing functions by increasing entire functions Burke, Maxim R.

Shelah's pcf theory and its applications Burke, Maxim R.; Magidor, M.

Various products of category densities and liftings Burke, M. R.; Macheras, N. D.; Musiał, K.; Strauss, W.

Liftings for noncomplete probability spaces Burke, Maxim R.

Continuous functions which take a somewhere dense set of values on every open set (vol 103, pg 95, 2000)--correction Burke, Maxim R.

Powers of the ideal of Lebesgue measure zero sets Burke, Maxim R.

Hechler's theorem for the null ideal Burke, Maxim R.; Kada, M.

A proof of Hechler's theorem on embedding N-1-directed sets cofinally into (omega(omega), Burke, Maxim R.

Large entire cross-sections of second category sets in Rn+1 Burke, Maxim R.

Models in which every nonmeager set is nonmeager in a nowhere dense Cantor set Burke, Maxim R.; Miller, A. W.

Bounded sets in topological vector spaces Burke, Maxim R.; Todorcevic, S.

Sets of range uniqueness for classes of continuous functions Burke, Maxim R.; Ciesielski, K.

Category product densities and liftings Burke, Maxim R.; Macheras, N. D.; Musial, K.; Strauss, W.

Liftings and the property of Baire in locally compact groups Burke, Maxim R.

Linear liftings for noncomplete probability spaces Burke, Maxim R.; Shelah, S.

Characterizing uniform continuity with closure operations Burke, Maxim R.

Borel measurability of separately continuous functions, II Burke, Maxim R.

Continuous functions which take a somewhere dense set of values on every open set Burke, Maxim R.

A note on measurability and almost continuity Burke, Maxim R.; Fremlin, D. H.

Weakly dense subsets of the measure algebra Burke, Maxim R.